2216 lines
47 KiB
Plaintext
2216 lines
47 KiB
Plaintext
PHYSICAL REVIEW A
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VOLUME 45, NUMBER 1
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ARTICLES
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1 JANUARY 1992
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Coherence and spectral filtering in neutron interferometry
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H. Kaiser, R. Clothier, * and S. A. Werner Physics Department and Research Reactor Faciit'ty, University ofMissouri Col—urnbia, Columbia, Missouri 65211
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H. Rauch and H. Wolwitsch
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Atominstitut der Osterreichischen Universitaten, A-1020 Vienna, Austria (Received 24 June 1991)
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The coherence length of a neutron wave packet depends on the spectral width of the distribution of wave vectors that make up the packet. The coherent overlap of the wave packets traversing the two beam paths in a perfect-silicon-crystal neutron interferometer (NI) is altered by placing a material with a neutron-nuclear optical potential in one of the beam paths in the NI. If the optical potential is positive, it causes a delay of the wave packet and a loss of fringe visibility. By use of an analyzer crystal, we narrow the spectral distribution after the mixing and interference has occurred in the last crystal slab of the NI. This increases the coherence length and restores some of the fringe visibility.
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PACS number(s): 03.65.Bz, 42.50.—p
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I. INTRODUCTION
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In a recent paper, we described an experiment in which
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the fringe visibility in a neutron interferometry experi-
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ment is restored by means of a neutron-phase-echo effect
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[I]. In this paper, we describe a related experiment,
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where the beam coherence can apparently be improved
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by the use of an analyzer crystal placed immediately in front of the detector. A preliminary discussion of this ex-
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periment has already been published [2].
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The superposition principle is perhaps the most important assumption of quantum mechanics. It allows us to
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construct a localized neutron wave packet by a Fourier
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sum of plane waves, having a (complex) spectrum a(k):
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%(r, t)= Ja(k)e
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" dk .
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The phases of the component waves are correlated by
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a(k), so that they add constructively only in some localized region of space time. Consider a neutron wave pack-
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et 0; incident on a perfect-Si-crystal neutron interferom-
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eter (NI), as shown in Fig. I [3,4]. The first crystal blade
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of the NI splits the amplitude of 4; into two parts, 4',
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and 4'2, which separate and traverse paths I and II, re-
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spectively. Both beams pass through a polished, homo-
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geneous aluminum slab, which can be rotated through
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" small angles a about a vertical axis. This slab, called the
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"phase rotator, induces a variable phase difference
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P (a) between 4, and %2, given by
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P
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(a)=N
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b
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1d
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sin 01 sina
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cos 01 —sin
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o.
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X, b, where k is the neutron wavelength,
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and d are, re-
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spectively, the atom density, nuclear scattering length,
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45
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and thickness of the phase rotator, and 81 is the Bragg angle of the interferometer. The beam %2 also passes through a plane-parallel slab of some material, perpendic-
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ular to the beam, with atom density N, neutron-nuclear
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SLIT 'Pl
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He OEfECTQR
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S.3 cm
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SKEW-SYMMETRIC
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~UIIIO4 4lE %RtaalER
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FIG. 1. Schematic diagram of a perfect Si crystal skew-
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symmetric neutron interferometer. The beam from the mono-
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chromator,
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of nominal wavelength
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A,
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=2.35
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0
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A,
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passes
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through
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a
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8X6 mm slit immediately in front of the NI. The circles
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represent the coherence length of the wave packets resulting
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from one neutron entering the NI and traversing the two beam
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paths. The beam on path II passes through one or two bismuth
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slabs, which spatially delay the wave packet due to the positive
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optical potential of Bi. The packets recombine, interfere, and
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are detected by one of the 'He detectors. The C3 beam is
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detected after reflection by a Si analyzer crystal. The interfer-
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ence contrast is measured by rotating the aluminum phase
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shifter in steps a about a vertical axis.
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31
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1992 The American Physical Society
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32
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KAISER, CLOTHIER, WERNER, RAUCH, AND WOLWITSCH
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45
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" scattering length b, and thickness D. This slab, which we
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call the "sample, induces a phase shift
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y (D)=kbl=-
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2mNbD k
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= —NbD A,
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and a spatial delay
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bl=—DV,
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2E
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(4)
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in 4'2, where E is the neutron's kinetic energy and the op-
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tical potential is
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V, =2M Nblm,
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(5)
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where m is the neutron mass. We assume for now that
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the sample does not attenuate the beam. The two waves recombine in the last perfect crystal blade of the NI, and form two exit waves, which are linear combinations of 4',
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and %'2. If the optical path lengths of beams I and II are
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nearly equal, the two packets overlap and coherently interfere, giving rise to interference effects.
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As discussed in our recent paper (Ref. [1]), and elsewhere [5], one can show that if a detector is placed in an exit beam, the time-averaged intensity it will measure is
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f I(D, a)=A
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~a(k)~ dk
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f +B ~a(k)~ cos[$0+Pp(a)+gz(D)]dk,
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mentally, we find CC3(0)=50%%uo. It is the relative con-
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trast, Cz(D)= C—(D) IC (0), that is of interest in these ex-
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periments. The relative contrast can be calculated from the magnitude of the complex mutual coherence function
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I (D, a) [6]:
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C(D) ~r(D, a)j
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c(o) ~r(0, 0)~
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(8)
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+, where
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I (D, a) = ()II")(0))p2(b,l ) }
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1
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2 ([yo+yp(a)+r&(D))
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(9)
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&2n.
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Or, if the displacement b l is in the longitudinal direction
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(parallel to k), we can replace ~a(k)~ by the wavelength
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spectrum g(A, ) to calculate I (D, a), namely
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— f r(D )
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1
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+ (g) (40+4P( )+rS (D))dg
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&2m.
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(10)
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For this experiment ys &&Pp, so that the phase rotator has a negligible effect on the contrast. Thus, for a Gaussian distribution ~a(k) ~, the relative contrast falls off as a function of the sample thickness D according to the for-
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mula
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—(XbDa) ) /2
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(6)
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where ()()0 is some constant, initial phase (under ideal con-
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ditions, $0=0). We explicitly note the dependence of the
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time-averaged counting rate I(D, a) on the thickness of the sample D and the angle a of the phase rotator, since
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these are the parameters that are varied in the experi-
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ment. The parameters A and B are constants that de-
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pend on which exit beam, C2 or C3, is being considered,
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and also on how well the interferometer is working. In
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the C3 beam, we usually find B&3=(0.5) AC3, and in the
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C2 beam,
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c3= Bcq,
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Bbuc&t —=A(o0q.=1(72).A7C)2A. C3T. o
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conserve
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neutrons,
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The first integral term in Eq. (6) is a constant. The
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second term, however, oscillates as we vary Pp(a). For
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example, if the spectral distribution ~(2(k)~ is a Gaussian of standard deviation o k, then Eq. (6) yields an intensity
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I(D, a) = A +B cos[Po+Pp(a)+gz(D)]e —( NbDo )2g2
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(7)
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where o &=2mo k/k is the width of the spectral distribu-
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tion in terms of wavelength.
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As we vary Pp(a), we trace out a sinusoidal intensity
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pattern I(D, a), called an interferogram. The contrast
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(fringe visibility) of the interferogram is defined to be the amplitude of the oscillation divided by the mean value of the pattern. As Eq. (7) shows, the contrast C(D) diminishes as the sample thickness D increases; its maximum
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value C(0) occurs when D =0, that is, when there is no
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sample in the beam. In principle, the maximum contrast
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Cc3(0) in the C3 beam may vary from 0% to 100%, de-
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pending on how well the interferometer performs; experi-
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Such relative contrast curves were first measured for neu-
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I tron interferometry by Kaiser, Werner, and George [7].
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Note that Eq. (6) for the intensity (D, a) depends only on the magnitude ~o(k) of the spectrum a(k) [8]. There
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~
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are therefore two interpretations as to why the relative
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contrast decreases with increasing sample thickness; both
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are equally valid and experimentally indistinguishable [9,10]. First, we know that a wave packet spreads as it propagates, with the faster wavelength components tend-
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ing toward the leading end of the packet, and the slower components toward the trailing end. The sample delays the packet on path II with respect to the packet on path
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I, so that when they reach the recombination region, the packets are spatially displaced by a distance b l(D), given by Eq. (4). Faster components within one packet then
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overlap with slower components within the other. The result is that the interference amplitude "washes out" when summed over the packet, which reduces the con-
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trast of the interferogram [11]. If the two packets are dis-
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placed by a distance greater than the coherence length,
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then the contrast disappears.
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If one views the neutron beam as consisting of an incoherent superposition of plane waves, then a second
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conceptual interpretation can be applied. Each plane-
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wave k component gives rise to its own intensity pattern
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I(k, D, a); the overall intensity I(D, a) is the integral of I(k, D, a) over the intensity distribution g(k). On pass-
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ing through the sample, each component experiences a
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different phase shift yz(k, D). The overall intensity is thus a sum of sinusoidal patterns of differing phases,
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which leads to a reduction in the interference amplitude. The beam is said to become "dephased" as the sample
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thickness increases, and the interferogram contrast even-
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45
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COHERENCE AND SPECTRAL FILTERING IN NEUTRON. . .
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33
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tually approaches zero.
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In this experiment, we wish to measure changes in in-
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terferogram contrast due to the coherence properties of a
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neutron beam. However, there are other effects that also
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reduce the contrast. These must be understood and
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corrected for if we wish to isolate the dephasing effects.
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First, we have to take into account the beam attenuation
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due to the sample, which we have not discussed so far. If
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an
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of
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attenuating sample is placed
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the wave 4» is attenuated by
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in
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a
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beam factor
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IeIx,pt(he—agm),pldiutuedeto
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the absorption and scattering cross sections of the materi-
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al. As discussed in our phase-echo paper (Ref. [1]), this
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attenuation leads to a loss in contrast with increasing
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sample thickness,
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„a, C(D)
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e
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C(0)
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+e ~a„
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(12)
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where a, and a&& are the fractional beam intensities on paths I and II, respectively (at+a&&=1). Thus, if we
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„, measure a contrast C in our experiment, and wish to
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deduce what the contrast C would be without the
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„, sample's attenuation, we merely multiply C by an at-
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f, tenuation correction factor « ..
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Cmeasf a«
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(13)
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where
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f,«=e (at+e a») .
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(14)
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This gives us a way to measure the contrast C corrected for the effects of attenuation. The intensity fractions a&
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and a» and attenuation parameters g were measured ex-
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perimentally, and from this information we calculated the
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f, attenuation correction factors « for each sample used.
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The effect of attenuation on the contrast is different for C2 and C3, and therefore the C2 and C3 data must be corrected separately. The details and results of this
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correction process are given in an appendix in Ref. [1].
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In addition to attenuation, there are other nonideal
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effects that reduce the interferogram contrast, such as imperfections in the machining of the crystal, vibrations
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and rotations, thermal gradients, and gravitational warp-
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ing of the crystal. These effects are also discussed in Ref. [1]. In light of these effects, it is not surprising that we cannot attain 100% contrast with our interferometer.
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We must content ourselves with a maximum contrast C, of order 50% in the C3 beam.
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II. THEORY OF CRYSTAL-ANALYZED
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COHERENCE MEASUREMENTS
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A. Gaussian spectrum
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Consider a longitudinal coherence neutron interferometry experiment, as shown in Fig. 1. We place a NI in the neutron beam, and it diffracts neutrons with a distribution of wavelengths gp(A. ). Let us assume for now that the spectrum is Gaussian, with standard deviation
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0.
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When we place samples of varying thickness D in beam II
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inside the interferometer, the relative contrast is given by Eq. (11},with o & =crz. When the sample thickness D becomes large enough, the beam becomes dephased, and the
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contrast falls essentially to zero. Consider now placing an analyzer crystal in the C3
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exit beam produced by the arrangement described above.
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This crystal has a mosaic width gz, and reflects out of
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the exit beam a distribution of wavelengths Gaussian in
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shape and of spectral width o &. The setup for such an ex-
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periment in the antiparallel configuration is shown in Fig. 2. The width of the reflected spectrum may be considerably less than that of the overall exit C3 beam cr&. It
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would seem to follow that the contrast in the analyzed
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beam could be much higher than in the overall beam.
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It is a straightforward matter to calculate the spectral
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width
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o. &
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that
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is reflected
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out of the exit beam
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by an
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analyzer crystal of mosaic width gz. By a geometric ar-
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gument [11],it can be shown that the analyzer accepts a
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Gaussian window W(A, ) of wavelengths
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=e W(A, )
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— — (A, A,o) /2(cr~ )
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of width 0&,
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cos(8I ) cos(8„)
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8„) A ~o1~ sin(8I —
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8„ where 01 is the interferometer Bragg angle. The analyzer
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Bragg angle
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is positive for the parallel scattering
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„, configuration, and negative for the antiparallel
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configuration. We are free to use crystals with different mosaic widths g and can reflect neutrons off of various
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Bragg planes within a given crystal. In other words, an
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analyzer window W(k} can be created with almost any
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width o & that we wish.
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The spectrum g(A, ) reflected by the analyzer is the
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product of the analyzer window W(A, ) and the incident
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spectrum gp(A ):
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Skl'newte-Sryfm..
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Samp le
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Oi rect
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CZ B'earn,
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C'&
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Sl i t'
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Oet.
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S'earn
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CAonnAtCfinirpagyalusyrtrzaaaeltr,lileonl, g~ &0
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EnTchleor smuarel
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SHetoarpn
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Analyzed
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v„ a„& CD &Seam,
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Casse t te
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FIG. 2. Setup for analyzing the C3 exit beam with an
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analyzer crystal in the antiparallel configuration. The nominal-
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=1. ly monochromatic beam (AA, /A, 2%) is produced by Bragg
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reflection from a pyrolytic graphite monochromator (20~ =41 ). The Bragg angle of the (220} reflection in the silicon NI is 0 =37.7'.
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— ', 34
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KAISER, CLOTHIER, WERNER, RAUCH, AND WOLWITSCH
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45
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}= g(A, )=g (A, }W(A,
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e
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)„ 2&2m o
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(18)
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But what about the analyzed beam? We cannot measure the spectrum in the analyzed beam unless we were to
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add a second analyzer arm and crystal, which would be
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where
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the width
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o. &
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is
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given
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by
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dif5cult. For lack of a better option, we decided to model
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the analyzed spectrum with a single Gaussian. We fit the
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0
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~
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((
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0)2+(
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A)2)1/2
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(19) incident spectrum go(A, ) to a single Gaussian to determine a spectral width o&, and from this calculated the
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The form of this equation insures that a& & o &. Figure 3
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shows the analyzed
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spectral
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width
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o. &
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versus
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the analyzer
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g„. Bragg angle 8~, calculated for several values of the mosa-
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ic width
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Now, consider what this means in terms of our contrast measurements. The overall or "direct" C3 beam
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has a spectral width 0&, as we vary the sample thickness
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D, its relative contrast C~;,(D) is given by Eq. (11), with
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0&=o &. However, if we place an analyzer crystal in the C3 beam, we reflect out only a fraction oz/cr), of the
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analyzed spectral widths cr) using Eq. (19). We feel justified in doing this because the spectruID is restricted
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by the mosaic analyzer crystal. If the analyzer has a
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Gaussian mosaic distribution, and if the window W(A, ) has a narrow width e)"„,then the reflected spectrum g(A, ) will also be nearly Gaussian. This is not precisely correct, but the approximation is nevertheless a very good one for this experiment, as we shall see.
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C. Phase difFerence between the C2 and analyzed C3 beams
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overall spectral width, and find that the analyzed relative
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contrast C„(D}falls off at a slower rate:
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It is a well-known fact that the interferogram patterns in the C2 and C3 exit beams differ in phase by 180', that
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—(NbD0' )2/2
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1s,
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(20)
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IC3 A( 3+B cos(hP)
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Beyond a given sample thickness, the contrast in the direct C3 beam is nearly zero, indicating that the beam is
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), IC2= AC2+B cos(b, (t)+n
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(21)
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apparently incoherent. Yet, with the analyzer, we pick out of the "incoherent" beam a certain portion of the neutrons that still yields contrast. The analyzer crystal
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thus restores the contrast by reducing the wavelength spectrum of the beam after the interference has taken place. In terms of wave packets, we say that the analyzer
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increases the coherence length bx by narrowing the
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momentum spread hp.
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where hg=go+PI, (a)+gz(D}. This is necessary so that
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the neutron current is conserved. As the phase b,P changes, the intensity is swapped back and forth between the two exit beams. In the analyzed beam, however, we find that the phase difference between the C2 beam interferogram and the analyzed C3 beam interferogram is not
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necessarily 180' due to the non-Gaussian nature of the
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wavelength spectrum.
|
|
|
|
8. ESects of a non-Gaussian spectrum
|
|
|
|
To see why this is so, consider a non-Gaussian spectrum modeled by the sum of two equivalent Gaussians:
|
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|
|
The discussion in the preceding section assumed, for convenience, that the spectrum was Gaussian. This is nearly, but not exactly, the case in our experiment, as we shall see. From Eq. (10), we see that this affects the behavior of the contrast curves. However, if the incident spectrum go(A, ) is measured, Eq. (10) can be used to predict the shape of the contrast curve Cz;, (D).
|
|
0.015
|
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|
—()j.—k, () /2u&
|
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|
— — (A. k2) /2m&
|
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|
(22)
|
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|
|
&2ncr„
|
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|
|
Although this is an oversimplification, the physics of the
|
|
following derivation is the same for this spectrum as for
|
|
the real spectrum of our experiment. If this spectrum is
|
|
]- placed in Eq. (10), the resulting intensity oscillates with
|
|
increasing D as
|
|
I(D) = A +B cos[go+Pz(a) Nb, DA,
|
|
|
|
O
|
|
~ Q)
|
|
R
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|
0.010 0.005
|
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O
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C
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|
&C
|
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|
0.000—45 -30 —15 0 15 30 45 60
|
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|
Analyzer Angle e„(deg)
|
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|
|
8„ FIG. 3. Spectral width crz of the analyzed beam vs the
|
|
analyzer Bragg angle for several values of the mosaic width
|
|
g „(inrad).
|
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|
X
|
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|
|
cos(NbDEA,
|
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|
—(NbDcr )e
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|
) /2
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|
(23)
|
|
|
|
where bk, =(A, , —Az)/2, and A, =(A)+A&}/2. The
|
|
difference between this expression and Eq. (7) is the term
|
|
|
|
cos(Nb, Db, A, }, which is a slowly oscillating amplitude
|
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|
|
envelope. The other cosine term is rapidly oscillating. In a phase rotator scan, we measure the phase of the rapidly oscillating curve. The relative contrast of this intensity
|
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|
|
pattern is
|
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|
|
C„(D)=)cos(NbDbA, )(e —( NbDo )2/2
|
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|
(24)
|
|
|
|
Figure 4 shows a representative intensity pattern generated from Eq. (23). At the point labeled Q, the oscillation pattern goes through a node; the amplitude envelope
|
|
cos(NBDbA, )=0, so that NbDbl. =m/2 (modulus 2m).
|
|
|
|
COHERENCE AND SPECTRAL FILTERING IN NEUTRON. . .
|
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|
35
|
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|
270
|
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|
N
|
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180
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|
C
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|
'~
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|
8- 90—
|
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|
oA
|
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|
I
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|
8O- 0
|
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|
~'
|
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|
I
|
|
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|
I
|
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|
~
|
|
|
|
I
|
|
|
|
I
|
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|
l
|
|
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|
I
|
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|
|
I
|
|
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|
I
|
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|
I
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|
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|
C
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|
Q)
|
|
C
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|
Node,
|
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|
r
|
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|
Contrast
|
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J
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~'
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|
Minimum,
|
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|
|
180 Shift
|
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|
|
01 D2
|
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|
Dg
|
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|
|
Sample Thickness D (or b. uni t s )
|
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|
I
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|
|
I
|
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|
|
I
|
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|
|
I
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I
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|
FIG. 6. The phase difference between the C2 beam and ana-
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2
|
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4
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6
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8
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10
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12 lyzed C3 beam, based on Fig. 5.
|
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|
|
Sample Thickness D (arb. units)
|
|
|
|
FIG. 4. A representative neutron intensity oscillation pat-
|
|
tern, from Eq. (23).
|
|
|
|
In this derivation, we have simplified matters by as-
|
|
surning that the spectrum could be modeled by the sum
|
|
of two equivalent Gaussian peaks. This actually turns
|
|
|
|
out to be quite a good approximation for the spectrum
|
|
|
|
so- At point P, slightly to the left of Q, NbDEA, =n l2 5,
|
|
|
|
used in this experiment. Even if this were not the case, we would still expect the phase of the pattern to shift by
|
|
|
|
that the intensity at P is
|
|
|
|
180' when the contrast curve goes through a minimum.
|
|
|
|
I(DP)= A+B sin(5) cos[Po+Pp(a) —NbDX]
|
|
Xe —(NbDo )2l2
|
|
|
|
This should happen in both the C2 beam and the overall (direct) C3 beam.
|
|
Consider what happens, however, if we analyze the C3 (25) beam, and compare it to the overall C2 beam. We com-
|
|
|
|
At point R slightly to the right of Q, NbDEA, =n /2+5,
|
|
so that the intensity at R is
|
|
I(DR ) = A +B[ —sin(5)] cos[$0+Pp(a) NbDX]—
|
|
|
|
pare these two beams because they were monitored sirnul-
|
|
taneously in the experiment. The relative contrast in the analyzed C3 beam should fall off more slowly than in the C2 beam, as shown in Fig. 5. When no sample is in the
|
|
|
|
Xe —(,NbDcr&) l2
|
|
= A +B sin(5) cos[$0+ P~(a)
|
|
Xe —(NbDcr~) l2
|
|
|
|
]- + (26)
|
|
NbD A, n
|
|
|
|
The phase of the function at points I' and R differs by m.
|
|
Thus, when the oscillation goes through a node, or the contrast goes through a minimum, we expect the phase of the intensity pattern to shift of 180'.
|
|
|
|
interferometer, the two beams are 180' out of phase. At
|
|
some thickness D, the C2 beam (and the direct C3 beam)
|
|
goes through a contrast rninirnum, and its phase is shifted by 180'. At this point, however, the analyzed C3 beam has not reached a contrast minimum, so its phase is not
|
|
shifted. Thus, for a range of sample thicknesses between
|
|
D& and D3, the C2 and analyzed C3 beams are in phase with each other. At some greater thickness D3, one of the beams reaches another contrast minimum, and experiences another 180' phase shift, so that the two beams are again 180' out of phase. Figure 6 shows the difference
|
|
|
|
in phase between the C2 and analyzed C3 beams, based
|
|
|
|
100
|
|
|
|
Beam
|
|
|
|
on the curves in Fig. 5.
|
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|
|
80
|
|
|
|
Although this effect makes sense in a mathematical
|
|
|
|
60
|
|
|
|
way, it runs contrary to our normal experience in neutron
|
|
|
|
180'
|
|
|
|
interferometry. For a certain range of sample
|
|
|
|
40
|
|
|
|
Phose Shift
|
|
|
|
thicknesses, the C2 and analyzed C3 beams are in phase.
|
|
|
|
20
|
|
|
|
That is, if the counts go up in the C2 detector as we ro-
|
|
|
|
00
|
|
100
|
|
80 0 60 CL 40
|
|
|
|
tate the phase shifter, they will also go up in the analyzed C3 beam. This seems to contradict the conservation of
|
|
neutrons, but it does not, because the counts in the
|
|
ouerall (direct) C3 beam must go down. The mean phase of the neutrons in the analyzed C3 beam is different than in the C3 beam as a whole.
|
|
|
|
20
|
|
|
|
D)
|
|
|
|
D2
|
|
|
|
D~
|
|
|
|
Sample Thickness D (orb. units)
|
|
|
|
III. EXPERIMENT
|
|
A. Apparatus
|
|
|
|
FIG. 5. Representative relative contrast curves in the C2
|
|
|
|
To begin the experiment, we had to select some
|
|
|
|
beam and in the analyzed C3 beam.
|
|
|
|
analyzer crystals to work with and decide which Bragg
|
|
|
|
36
|
|
|
|
KAISER, CLOTHIER, ORNER, RAUCH, AND W'OLWITSCH
|
|
|
|
reflections to use. We had at our disposal two silicon
|
|
crystals, one nearly perfect [68=0.02' full width at half
|
|
maximum (FWHM), rI„=00.0015 rad], and the other a
|
|
|
|
pressed silicon crystal with a relatively broad mosaic
|
|
|
|
rl„=0. width [b,8=0.47' (FWHM),
|
|
|
|
0035 rad]. We la-
|
|
|
|
" beled these crystals "NP" and "PR, for "nearly perfect"
|
|
|
|
" and "pressed silicon. We decided to work with three
|
|
|
|
different analyzer configurations. We used the PR
|
|
|
|
analyzer in both the (111) parallel and (111) antiparallel
|
|
|
|
configurations, and used the NP analyzer in the (111)an-
|
|
|
|
8„= tiparallel configuration. With A, =2.35 A, the Bragg an-
|
|
|
|
gle of these reflections is
|
|
|
|
+22.0', where the plus sign
|
|
|
|
is for the parallel configuration, and the minus sign is for
|
|
|
|
the antiparallel. The interferometer Bragg angle for the
|
|
(220) reflection was 8t=37.7'. From this, we calculated
|
|
|
|
the analyzed spectral widths 0& expected from the crys-
|
|
tals in each configuration; the values are given in Table I.
|
|
|
|
We next had to have a suitable set of phase shifting
|
|
|
|
samples. We chose to make the samples out of bismuth,
|
|
|
|
m, bbe=cau8s.e533
|
|
|
|
Bi
|
|
fm,
|
|
|
|
has a an atom
|
|
|
|
large, density
|
|
|
|
positive scattering
|
|
N =2.82 X 10
|
|
|
|
length
|
|
and a
|
|
|
|
relatively low absorption
|
|
o, = 9. 156 b). Initially,
|
|
|
|
cross
|
|
five
|
|
|
|
section (o, =0.0388 b
|
|
slab-shaped samples
|
|
|
|
and
|
|
of
|
|
|
|
bismuth and titanium were machined, polished, and
|
|
|
|
etched, and then epoxied onto aluminum mounting
|
|
|
|
brackets. The samples were made so that their nominal
|
|
|
|
thicknesses were multiples of 4 mm (4, 8, 12, 16, and 20
|
|
|
|
mm). The exact thicknesses of the samples are given in
|
|
Table III. In addition, we made a sixth sample that was
|
|
|
|
thinner than the others (2.1 rnm thick). Since this sample
|
|
'." was about half as thick as sample 1, it was dubbed "sam-
|
|
ple —, This sample was used in combination with larger
|
|
|
|
samples to give finer increments in thickness. For exam-
|
|
|
|
ple, bismuth
|
|
|
|
samples
|
|
|
|
1 and
|
|
|
|
'
|
|
—,
|
|
|
|
could
|
|
|
|
be
|
|
|
|
used
|
|
|
|
simultaneous-
|
|
|
|
'." ly to place 6.10 mm of Bi in the beam; we called such a
|
|
combination "bismuth sample 1—, The thin samples in
|
|
|
|
" " set
|
|
|
|
'
|
|
—,
|
|
|
|
could
|
|
|
|
also
|
|
|
|
be
|
|
|
|
combined
|
|
|
|
with
|
|
|
|
the other samples
|
|
|
|
to
|
|
|
|
create "sample 2—',, sample 3—',, and so on. This
|
|
|
|
effectively doubled the number of data points that we
|
|
|
|
could obtain.
|
|
|
|
The basic setup for the experiment is shown schemati-
|
|
|
|
-7 cally in Fig. 2. A slit, 8 mm wide by 6 mm high, was
|
|
|
|
mounted
|
|
|
|
cm in front of the interferometer to restrict
|
|
|
|
the beam size. When no sample was in the beam, this
|
|
|
|
— produced a counting rate of 1030 counts/min with — -46%%uo contrast in the C3 exit beam, and a rate of 3430 — counts/min with 16%%uo contrast in the C2 detector.
|
|
The samples were affixed by means of their mounting brackets to an aluminum bar, which held the samples at the right height and position to intercept the beam. The bar was attached to a translation table, so that the samples could be driven in and out of beam II by a
|
|
computer-controlled stepping motor. The analyzer crystal was mounted on a goniometer,
|
|
whose tilt and rotation were controlled by stepping mo-
|
|
tors. This assembly, called the analyzer table, was
|
|
mounted -60 cm downstream from the interferometer
|
|
on a movable arm, as indicated in Fig. 2. The analyzer
|
|
was placed in the C3 beam, and its height and translation were optimized so that it was centered in the beam.
|
|
The neutrons were detected by —'-,in. -diameter, cylindri-
|
|
cal, 20-atm He detectors, which are essentially black to thermal neutrons. The C2 detector was mounted verti-
|
|
cally -20 cm past the NI. It was surrounded by a casing
|
|
made of 84C powder suspended in epoxy, which absorbed any background neutrons. The beam was allowed to
|
|
enter only through an opening, —, in. wide and 1 in. high,
|
|
defined by a cadmium tube several inches long. The C3 detector was mounted on a rotatable arm attached to the
|
|
analyzer table. Its position was also controlled by a step-
|
|
ping motor, so that it could be driven into the analyzed beam direction. At this distance (60 cm), the beam was too broad to be accepted by a —'-, in. -wide vertical detector. For that reason, the C3 "detector" actually consisted of
|
|
three 3He detectors (all of which fed into the same elec-
|
|
tronic counting chain), mounted horizontally in a
|
|
neutron-shielding 84C-epoxy cassette with a 1X1 in.
|
|
collimated opening. This arrangement also had the ad-
|
|
vantage of making the detection probability constant in the horizontal plane. The wavelength of a neutron ray
|
|
reflected by the monochromator depends on the reflection angle, and therefore varies in the horizontal
|
|
plane. To detect all parts of the spectrum equally, the C3
|
|
detectors were mounted horizontally, so that all com-
|
|
ponents saw the same detector thickness. The vast majority of neutrons entering the inteferome-
|
|
ter fall outside the Darwin acceptance width and are not diffracted. This so-called "direct beam" also has a divergence to it, and would spill into the C3 detector and
|
|
|
|
TABLE I. Spectral widths expected in the direct and ana-
|
|
lyzed beams.
|
|
|
|
Beam
|
|
|
|
g „(rad)
|
|
|
|
Direct
|
|
Analyzed,
|
|
PR crystal, (111) parallel
|
|
Analyzed,
|
|
PR crystal, (111) antipar.
|
|
Analyzed, NP crystal,
|
|
(111) antipar.
|
|
|
|
0.0035 0.0035 0.000 15
|
|
|
|
0.0120 0.0106 0.0070 0.000 30
|
|
|
|
1.20% 1.06% 0.70% 0.03%
|
|
|
|
TABLE II. Mean signal and background counting rates per
|
|
minute, and mean counting time per point.
|
|
|
|
Beam
|
|
|
|
Signal (min ')
|
|
|
|
Background (min ')
|
|
|
|
Time per point (min)
|
|
|
|
C2, all configs. Direct C3
|
|
C3, PR analyzer (111) parallel
|
|
C3, PR analyzer (111) antipar.
|
|
C3, NP analyzer (111) antipar.
|
|
|
|
3430 1030 400
|
|
|
|
207. 5+0.7 49. 1+1.2 37.621.1
|
|
|
|
(same as C3)
|
|
5 12
|
|
|
|
230
|
|
|
|
58.2+0.4
|
|
|
|
20
|
|
|
|
32
|
|
|
|
61.2+1.1
|
|
|
|
40
|
|
|
|
45
|
|
|
|
COHERENCE AND SPECTRAL FILTERING IN NEUTRON. . .
|
|
|
|
37
|
|
|
|
overwhelm the relatively weak C3 beam. To prevent this from happening, the direct beam was blocked with a B4C-epoxy block directly after the NI.
|
|
B. Data collection and analysis
|
|
Even when there is no sample in the beam, a neutron interferometer operates at contrast Co that is less than
|
|
100%. The coherence loss due to the dephasing effect
|
|
manifests itself in a relative drop in contrast from this
|
|
starting value Co to a new value C(D) when a sample was placed in the beam. It was therefore important to
|
|
measure the "sample-out" contrast Co as well as the
|
|
"sample-in" contrast C(D) for each data set. The basic procedure is described in detail in Ref. [1],
|
|
and consists of taking simultaneous "sample-out" and "sample-in" interferograms. A sample is rn.ounted on the translation bar, but driven to a position where it does not intercept the beam; we call this the "sample-out" posi-
|
|
tion. With the phase rotator set to a certain position a, ,
|
|
we collect data until our monitor counter reaches a fixed preset number corresponding to a (nearly) constant detection time per point. This is the "sample-out" data. The
|
|
sample is then driven into the beam on leg II of the inter-
|
|
ferometer, and we collect data again for a period approximately four times longer than the sample-out collection time. This is the "sample-in" data. The sample is then driven back out of the beam, the phase shifter is moved to a new position az, and the counting process is repeated. After 30 or so data points, the result is a pair of interferograms, one with sample-out, and one with sample-in.
|
|
It is important to take these interferograms simultane-
|
|
ously, because the absolute contrast Co drifts a small amount with time due to environmental factors. Over the course of a day, the sample-out contrast Co might
|
|
vary +3% or so; however, the relative loss of contrast
|
|
due to dephasing will not drift, as long as the sample-in and sample-out curves have the same "starting" contrast
|
|
|
|
1.0-
|
|
|
|
—2 —Gauss Fit
|
|
--- 1 —Gouss Fit
|
|
|
|
0.6-
|
|
O
|
|
04
|
|
0.2-
|
|
|
|
0.0
|
|
|
|
I
|
|
|
|
I
|
|
|
|
2.32
|
|
|
|
2.34
|
|
|
|
2.36
|
|
|
|
2.38
|
|
|
|
Wavelength 'A (A)
|
|
|
|
FIG. 7. The measured wavelength spectrum g(A, ) for the ex-
|
|
periment. The single-Gaussian fit parameters to the data are
|
|
A.0=2.3456 A, cr&=0.0120 A, a =0.974. The double-Gaussian
|
|
fit parameters to the data are A, 1=2.3366 A og1=0.00798 A,
|
|
al =0.606; A2=2. 3524 A, og2=0. 00800 A, aq =0.793.
|
|
|
|
Typical Sample —Out Data
|
|
|
|
Analyzed C3
|
|
3000
|
|
|
|
NC
|
|
|
|
c E 20PO)
|
|
|
|
1000-
|
|
|
|
0
|
|
|
|
p—1.0
|
|
|
|
.
|
|
|
|
I
|
|
-0.5
|
|
|
|
.
|
|
|
|
I
|
|
0.0
|
|
|
|
.
|
|
|
|
I
|
|
0,5
|
|
|
|
1.0
|
|
|
|
n (deg. )
|
|
|
|
Direct C2
|
|
25000
|
|
20000—
|
|
15000'
|
|
1000—0 1.0 -0.5 0.0 0.5 1.0
|
|
a (deg. )
|
|
|
|
Sample —In Data
|
|
|
|
Analyzed C3
|
|
6000 . D=2mrn
|
|
4000—
|
|
|
|
Direct C2
|
|
50000 . D=2mrn 40000-
|
|
|
|
2000—
|
|
|
|
30000-
|
|
|
|
p
|
|
|
|
.I .I .I
|
|
|
|
c
|
|
|
|
. D=4mrn
|
|
|
|
4000-
|
|
|
|
2000-
|
|
|
|
T
|
|
|
|
p
|
|
|
|
~
|
|
|
|
I
|
|
|
|
~
|
|
|
|
I
|
|
|
|
~
|
|
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I
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4000- D = 6mrn
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0 2000'
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|
p
|
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|
.I
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~
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I
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~
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I
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4000- D=8mm
|
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I
|
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~
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I
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~
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I
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C
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~ D=4mm
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E 40000-
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0 30000-
|
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~
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I
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~
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I
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~
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I
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. D=6mm
|
|
40000-
|
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|
C
|
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30000-
|
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I
|
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|
~
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I
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40000- D =8rnm
|
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|
2000-
|
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30000-
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|
-0. p—1.0 ~
|
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I
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~
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I
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~
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I
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5 0.0 0.5
|
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1.0
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|
a (deg )
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20000—1.0 -0.5 0.0 0.5 1.0 n (deg )
|
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|
(b)
|
|
Sample —In Data, continued
|
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|
|
Analyzed C3
|
|
6000
|
|
4000- D=10mrn
|
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|
Direct C2
|
|
50000
|
|
40000- D=10rnm
|
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2000-
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30000-
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4000- D=12mm
|
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2000-
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40000- D=12rnm
|
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30000-
|
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|
' D=14mm
|
|
E 2000-
|
|
4000- D=16mrn
|
|
C
|
|
2000O
|
|
4ppp D 1 8 m m
|
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2000-
|
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|
C
|
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D=14rnm
|
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30000-
|
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~
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I
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~
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I
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40000-
|
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30000O
|
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|
rn
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30000-
|
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. 4000-
|
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D=20mm
|
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D = 20mrn
|
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2000-
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30000-
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|
-05 00 10 05 10 p—
|
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.
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I
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~
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I
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~
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I
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~
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a (deg )
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20000—1.0 —0.5 0.0 0.5 1.0
|
|
n (deg )
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|
FIG. 8. Interferograms in the C2 and analyzed C3 beams vs
|
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phase rotator angle cx (see Fig. 1) normalized to the same count-
|
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|
|
ing time per point (10 min) for the PR analyzer crystal in the
|
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|
|
(111)antiparallel configuration, with various sample thicknesses
|
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|
|
D.
|
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|
|
38
|
|
Bi Sample No.
|
|
1
|
|
2 1
|
|
1 —' 2 22
|
|
32 4 41 5
|
|
|
|
KAISER, CLOTHIER, WERNER, RAUCH, AND WOLW'ITSCH
|
|
|
|
TABLE III. Relative contrast results in the direct C3 beam.
|
|
|
|
D (mm)
|
|
2.09 4.01 6.10 7.99 10.08 12.26 14.35 16.15 18.24 20.08
|
|
|
|
61 (A)
|
|
—44.2 ——18248..97 ——211638..08 ——235093..21 ——338451..42 —424.3
|
|
|
|
4f (rad) —118 ——232475 ——455721 — —689142 ——1901324 —1135
|
|
|
|
Cout
|
|
46. 3+0.5 46. 9+0.5 43. 5+0.5 48.0+0.5 47. 8+0.5 45.2+0.5
|
|
45.0%0.5
|
|
41.5%0.5 46.6+0.5 48.4+0.5
|
|
|
|
C;„(%)
|
|
40. 8+0.4 26. 8+0.4 7.7+0.4
|
|
1.3+0.4 4.2%0.4 3.6+0.4 1.8+0.4 0.7+0.3 1.3+0.3 1.4+0.3
|
|
|
|
45
|
|
C„(%)
|
|
88. 1+1.3 57.3+1.0 17.8+0.9 2. 2+0.8 8.7+0.8 8.0+0.8 3.9+0.9 1.8+0.8 2. 8+0.7 2.9+0.6
|
|
|
|
Cp. To insure that this is the case, we have to take the due to the sample, as discussed in Sec. I. The fit program
|
|
|
|
two data sets at the same time.
|
|
|
|
also computed a statistical error for each fit parameter.
|
|
|
|
Collecting two such interferograms for a given sample
|
|
" constituted one data "run. The process was repeated for '" all Bi samples individually (including the paired "—, sam-
|
|
|
|
Using standard statistical methods, we calculated error
|
|
bars for our results. If the sample-out contrast is Cp+0'0,
|
|
and the sample-in contrast is C;„+or;„th,en the relative
|
|
|
|
ples). The counting time per point depended on the contrast Cz koz is given by
|
|
|
|
analyzer crystal and configuration being used; see Table
|
|
|
|
II. In selecting out a small portion (crzicrz) of the wave-
|
|
length spectrum, we also selected out only a fraction of
|
|
|
|
Cln
|
|
Cz C0
|
|
|
|
(27)
|
|
|
|
the available neutron intensity, which led to long count- where
|
|
|
|
ing times and greater statistical error. The counting times listed below are average values; for high contrast
|
|
|
|
0'p
|
|
|
|
' 2 1/2
|
|
|
|
runs with thin samples, we used shorter counting times;
|
|
|
|
Cp
|
|
|
|
C;„
|
|
|
|
(28)
|
|
|
|
with thicker samples we increased the counting time to
|
|
|
|
more accurately measure the expected small contrast.
|
|
|
|
The direct beam scans took about 6 h apiece; the PR analyzer scans lasted about 13 h; and the NP analyzer
|
|
|
|
C. Results
|
|
|
|
scans required over 36 h to complete.
|
|
|
|
Since the contrast results depend on the shape of g(A, ),
|
|
|
|
„, After completion, each interferogram was fit to a
|
|
cosine function by a nonlinear least-squares-fit routine. We used the fit parameters to calculate the contrast C
|
|
|
|
we first need to know the spectrum to be able to predict the outcome of the experiment. The measurement tech-
|
|
nique is described in Ref. Il], and consists of using a
|
|
|
|
of the interferogram (see Ref. [I]). This was done sepa- (nearly) perfect silicon crystal to do a 8-28 scan in the C3
|
|
|
|
rately for the data in both detector channels C2 and C3 beam, and converting this to a wavelength spectrum.
|
|
|
|
for both the sample-out and sample-in conditions. The The resulting spectrum, arbitrarily normalized to 1, is
|
|
|
|
sample-in contrast had to be corrected for attenuation shown in Fig. 7, along with the one- and two-Gaussian
|
|
|
|
TABLE IV. Relative contrast results in the analyzed C3 beam, PR analyzer crystal, (111)antiparal-
|
|
lel configuration.
|
|
|
|
Bi Sample No.
|
|
1
|
|
2 1 1I
|
|
2
|
|
2-
|
|
3
|
|
3-
|
|
4 41
|
|
5
|
|
|
|
D (mm)
|
|
2.09 4.01 6.10 7.99 10.08 12.26 14.35 16.15 18.24 20.08
|
|
|
|
„, C, (%%uo)
|
|
47. 9+0.8
|
|
49.9+0.8 50. 1+0.8
|
|
51.3+0.8 50.9+0.8
|
|
51.2+70.8 51.8+0.8 50.7+0.8 53.0+0.8
|
|
49.6+0.8
|
|
|
|
C;„(%)
|
|
47. 8+0.6 38.8+0.6 31.6+0.5 21.9+0.5 15.6+0.4 9.9+0.4 6. 3+0.4 3.9+0.4 3.8+0.4
|
|
1.4+0.3
|
|
|
|
Cg (%%uo)
|
|
99.8+2.0 77. 8+1.7 61.1+1.5 42. 6+1.1 30.6+1.0 19.2+0.9 12.2+0.8 7.7+0.7 7.0+0.7 2. 8+0.6
|
|
|
|
COHERENCE AND SPECTRAL FILTERING IN NEUTRON. . .
|
|
|
|
39
|
|
|
|
TABLE V. Relative contrast results in the analyzed C3 beam, PR analyzer crystal, (111) parallel
|
|
configuration.
|
|
|
|
Bi Sample No.
|
|
1
|
|
2 1
|
|
11
|
|
2
|
|
2-
|
|
3
|
|
3-
|
|
4 42
|
|
5
|
|
|
|
2.09 4.01 6.10 7.99 10.08 12.26 14.35 16.15 10.24 20.08
|
|
|
|
„, C, (%)
|
|
48. 2+0.7 49. 5+0.7 48. 3+0.7
|
|
49.0%0.7
|
|
48.620.7
|
|
49.7%0.7
|
|
48.0+0.7 46. 8+0.7 47.4+0.7
|
|
49. 3%0.7
|
|
|
|
C;„(%)
|
|
44. 3+0.5 33.6+0.5 22. 2+0.4 7.4+0.4 1.0+0.3 2.9+0.3 1.8+0.3 0. 5+0.3 0. 5+0.3 1.0+0.3
|
|
|
|
Cg (%)
|
|
91.8+1.7 67.9+1.4 45.9+1~ 1 15. 1+0.8 2.0+0.7 5.9+0.7 3.8+0.6 1.1+0.7 1.1+0.6 1.9+0.6
|
|
|
|
fits to the data. Note that the two-Gaussian fit gives two
|
|
|
|
peaks that are nearly equivalent in width and amplitude;
|
|
thus, our approximation in Sec. IIC was a fairly good
|
|
|
|
one.
|
|
|
|
We then began our data collection, beginning with the
|
|
|
|
contrast scans in the direct C3 beam. The analyzer crys-
|
|
|
|
tal was rotated to a position perpendicular to the beam,
|
|
|
|
so that there would be no Bragg re6ection and minimal
|
|
|
|
absorption. The detector cassette was moved into the
|
|
|
|
direct C3 beam and its position was optimized with a
|
|
|
|
rocking curve. We then took a series of contrast scans
|
|
|
|
using different sample thicknesses. The relative contrast
|
|
results of these scans are given in Table III.
|
|
|
|
We next mounted the pressed silicon (PR) analyzer
|
|
|
|
crystal in the C3 beam, and rotated it and the detector
|
|
|
|
(8„= arm
|
|
|
|
u—nti2l 2.
|
|
|
|
we
|
|
0').
|
|
|
|
found the (111) antiparallel The positions of the analyzer
|
|
|
|
reflection and detec-
|
|
|
|
tor were optimized with a series of rocking curves. Once
|
|
|
|
maximized, the analyzer and detector remained fixed.
|
|
|
|
We then took a second set of contrast scans with different
|
|
|
|
bismuth samples. The contrast results of these scans are
|
|
|
|
given in Table IV.
|
|
|
|
Plots of the PR antiparallel interferograms are shown
|
|
|
|
in Fig. 8, along with the fits to the data. The sample-out
|
|
|
|
curves did not vary much from run to run, so only one
|
|
|
|
representative set is shown. The plots show that the con-
|
|
|
|
trast does fall off more slowly in the analyzed beam than
|
|
|
|
in the direct beam as anticipated. The relative contrast
|
|
|
|
curve in the C2 beam is identical to that in the direct C3
|
|
|
|
beam because both have the same spectral width cr&.
|
|
|
|
Comparing the graphs, we see that the overall C2 con-
|
|
|
|
trast decayed quickly, reaching (nearly) zero by a sample
|
|
thickness of D =8 rnm; the analyzed C3 beam, on the
|
|
|
|
= other hand, had visible contrast up to a thickness of
|
|
D 14 mm or so.
|
|
|
|
We next rotated the PR analyzer and detector arm into
|
|
the (111)parallel direction (8„=+220.'), and optimized
|
|
|
|
their positions with a series of rocking curves. This ar-
|
|
|
|
rangernent was used to take the third set of contrast scans
|
|
|
|
for various sample thicknesses D. The contrast results of
|
|
|
|
the PR (111)parallel scans are given in Table V. For the
|
|
|
|
fourth and final data set, we replace the PR analyzer with
|
|
|
|
the nearly perfect (NP) silicon crystal. The analyzer and
|
|
|
|
(8„= detector positions
|
|
configuration
|
|
|
|
we—re2o2p. 0tim'),izaendd
|
|
|
|
in the (111)antiparallel another set of contrast
|
|
|
|
scans using various sample thicknesses was performed
|
|
|
|
with this arrangement. The contrast results calculated
|
|
|
|
for the NP (111) antiparallel runs are given in Table VI.
|
|
|
|
Due to the long collection time, there were fewer data
|
|
|
|
runs taken in this configuration.
|
|
|
|
The relative contrast results of all four data sets are shown in Fig. 9. Also shown are the curves predicted by
|
|
|
|
our model using Eq. (10) and the fit parameters listed in
|
|
|
|
the caption to Fig. 7. As Fig. 9 shows, there was an in-
|
|
|
|
crease in contrast in the analyzed beam compared to the
|
|
|
|
direct beam. The contrast in the direct C3 beam fell
|
|
|
|
C„=2. rather rapidly to a minimum of
|
|
|
|
2% at D =8 mm,
|
|
|
|
improved a bit, fell to another minimum at D =16 mm,
|
|
|
|
TABLE VI. Relative contrast results in the analyzed C3 beam, NP analyzer crystal, (111)antiparal-
|
|
lel configuration.
|
|
|
|
Bi Sample No.
|
|
|
|
D (mm)
|
|
|
|
„, C, (%)
|
|
|
|
C;„(%)
|
|
|
|
Cg (%)
|
|
|
|
4.01 2.77 12.26 16.15 20.08
|
|
|
|
37.2+1.4 41.7+1.4 43. 1+1.5
|
|
42. 2+1.8 39.1+1.6
|
|
|
|
36. 1+1.3 41.2+1.3 38.7+1.4 36.3+1.3 37.3+1.3
|
|
|
|
97. 1+5.1 99.0+4.8 89.6+4.4 86.0+4.8 95.225.2
|
|
|
|
KAISER, CLOTHIER, VfERNER, RAUCH, AND WOL%'ITSCH
|
|
|
|
TABLE VII. Phase difference between the direct C2 and analyzed C3 interferograms for the PR (111)antiparallel analyzer contrast runs.
|
|
|
|
Bi Sample No.
|
|
|
|
bc~ (deg)
|
|
|
|
0c~ (deg)
|
|
|
|
4C2 PC3 (deg)
|
|
|
|
2
|
|
|
|
2.09
|
|
|
|
19+0.5
|
|
|
|
202+0.6
|
|
|
|
177+0.8
|
|
|
|
1
|
|
|
|
4.01
|
|
|
|
216+0.7
|
|
|
|
39+0.8
|
|
|
|
177+1.1
|
|
|
|
1 —'
|
|
|
|
6.10
|
|
|
|
110+15.
|
|
|
|
306+0.9
|
|
|
|
164+1.7
|
|
|
|
2
|
|
|
|
7.99
|
|
|
|
186+9.8
|
|
|
|
182+1.1
|
|
|
|
4+9.8
|
|
|
|
21
|
|
|
|
10.08
|
|
|
|
141+2.8
|
|
|
|
148+1.5
|
|
|
|
7+3.2
|
|
|
|
3
|
|
|
|
12.26
|
|
|
|
174+3.2
|
|
|
|
183+2.4
|
|
|
|
—9+4.0
|
|
|
|
3-
|
|
|
|
14.35
|
|
|
|
207+9.8
|
|
|
|
192+3.5
|
|
|
|
15+10
|
|
|
|
4
|
|
|
|
16.15
|
|
|
|
40+17
|
|
|
|
294+5.7
|
|
|
|
106+18
|
|
|
|
4 —'
|
|
|
|
18.24
|
|
|
|
28+9.3
|
|
|
|
180+5.4
|
|
|
|
208+11
|
|
|
|
5
|
|
|
|
20.08
|
|
|
|
120+13
|
|
|
|
287+ 14
|
|
|
|
193+18
|
|
|
|
and then tailed off. When the PR analyzer was used in the (111) parallel configuration, the contrast fell a bit
|
|
more slowly than in the direct C3 beam, but not substantially so. This is to be expected, since this reAection only
|
|
reduced the spectral width by -12%. In the antiparallel
|
|
con6guration, the PR analyzed contrast falls o8' much more slowly than in the direct C3 beam. While the direct
|
|
beam curve goes through a contrast minimum at D =8
|
|
mm, the antiparallel PR data still have 48% relative con-
|
|
|
|
Longitudinal Displacement hx (A)
|
|
0 100 200 300 400
|
|
|
|
100 i
|
|
|
|
Direct C3 Beam
|
|
|
|
50 25
|
|
|
|
100,
|
|
75
|
|
50 25 0C 0 100 & O 75 50 25
|
|
|
|
PR Analyzer
|
|
11) Parallel
|
|
aI I
|
|
zer
|
|
nti
|
|
|
|
. 1 00 ".
|
|
755025-
|
|
|
|
(d) NP Analyzer
|
|
(111) Anti
|
|
|
|
0
|
|
|
|
I
|
|
|
|
I
|
|
|
|
~
|
|
|
|
I
|
|
|
|
I
|
|
|
|
0
|
|
|
|
4
|
|
|
|
8
|
|
|
|
12 16 20
|
|
|
|
Bi Sample Thickness D (mm)
|
|
|
|
FIG. 9. The relative contrast results vs sample thickness for
|
|
the different analyzer configurations used in the experiment. The solid lines represent the theoretical curves based on our model and spectral measurements.
|
|
|
|
trast. When the nearly perfect analyzer is used, the contrast hardly declines at all; even with 20 mm of Bi, the
|
|
relative contrast remains near 90%. Very good contrast
|
|
can thus be extracted from an apparently incoherent
|
|
beam. The measured data also agree fairly well with the
|
|
predicted curves.
|
|
The second goal of the experiment was to calculate the phase di8'erence between the interferograms in the C2 beam and in the analyzed C3 beam. We used the data from the PR (111) antiparallel scans to make the phase comparison. The C2 and analyzed C3 relative contrast curves are plotted jointly in Fig. 10(a). The C2 curve
|
|
goes through contrast minima at D =8 and 16 mm, at
|
|
which points we expect a 180' shift in the phase of the interferogram. The PR analyzed curve does not go through a contrast minimum (Fig. 9), so it should not ex-
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Longitudinal
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0
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100
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(a) 100 $
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80
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o 60
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40 0
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20
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CL
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Displacement ht ()t)
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200 300 400
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O
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180
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90
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U
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0
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I
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4
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8
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12 16 20
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Eli Sample Thickness D (mm)
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FIG. 10. (a) The relative contrast vs sample thickness in the C2 beam and the analyzed C3 beam, using the PR analyzer in the (111) antiparallel configurations. (b) The phase difference
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between the C2 and analyzed C3 beam is this configuration.
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45
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COHERENCE AND SPECTRAL FILTERING IN NEUTRON. . .
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41
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Analyzed C3
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6000
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- P=Q mm
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4000 i
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2000—
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Direct C2
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50000
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FWV~ ~ D=O mm
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40000-
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0
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I' I
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- 0=4mm
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4000-
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2000—
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E
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0
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I
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~
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I
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I
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~ D=10 mm
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3000 '
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2000-
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. D=12 mm
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3000-
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™ 2500-
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I
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~
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I
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I
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8 2800 D 1
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2600
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—1.0 -0.5 0.0 0.5 1.0
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n (deg )
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I
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I
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I
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40000- 0=4 rnm
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C
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3O0OO-
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I
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I
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I
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C) 36ooo, - 0=10 mm
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34000-
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M
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C
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0
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~
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I
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I
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36ooo - D=12 mm
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V
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0
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I, 34000-
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I
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~
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I
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0=18 mrn
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33500 -
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~~ ~
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33000 -
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~~ ~~
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~
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~~
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II
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~
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I
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~
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I
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i
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I
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—1.0 -0.5 0.0 0,5 1.0
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a (deg )
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FIG. 11. Several interferograms replotted from Fig. 8, with
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the vertical axes scaled so that the phasing is readily apparent.
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In the first two panels (D =0 and 4 mm), the C2 and analyzed C3 curves are clearly 180' out of phase; for D =10 and 12 mm, = in the next two panels, the curves are in phases; and in the final
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panel, with D 18 mm, the curves are again out of phase.
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perience a 180' phase shift at any point.
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difTfearbenleceVPIIc2g—ivePsc3thoef
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initial phases Pc2 and the C2 and analyzed
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Pc3 and the C3 interfero-
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grams, sample-in condition, for each sample thickness in
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the PR (111)antiparallel added to Pc& to make it
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data set. If necessary,
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greater than Pc3. The
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3P6c20'—wPeQre3
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data in Table VII are plotted in Fig. 10(b), and show that
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the 180' phase shift does occur. Up to a thickness of 6 mm of Bi, C2 and the analyzed C3 beam are 180' out of
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phase. Between 6 and 8 mm of Bi, C2 goes through a
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contrast minimum, so that from 8 to 14 mm of Bi, the C2
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and analyzed C3 beams are in phase. At about 16 mm of
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Bi, C2 goes through another contrast minimum, so that
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from 18 to 20 mm of Bi, the two beams are again 180' out
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of phase. This effect can be seen directly from the inter-
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ferograms shown in Fig. 11.
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It should be mentioned once again that this 180' phase
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shift only occurs when we compare the analyzed C3
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beam with the overall C2 beam. The overall C2 and C3
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beams are always 180 out of phase. With the analyzer,
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however, we can pull out of the beam a certain range of
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components whose mean phase is different from that of
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the overall beam. This is only possible due to the non-
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Czaussian shape of the wavelength distribution.
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IV. CONCLUSIONS
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In this experiment, we were able to restore coherence to an apparently incoherent beam by filtering out of that beam those neutrons whose wavelengths lie in a narrow band o.z. Indeed, with the nearly-perfect-silicon analyzer, we extracted essentially 100% relative contrast
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TABLE VIII. Calculated longitudinal coherence lengths bx of the neutrons in the different analyzer configurations.
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Beam
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Ax (A)
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Direct C3 (and C2) PR analyzer, (111) parallel PR analyzer,
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(111) antiparallel NP analyzer,
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(111) antiparallel
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86.2 97.5
|
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148
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3450
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from a "contrastless" beam, even with 20 mrn of bismuth
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dephasing the beam. We were also able to show that the
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mean phase of the neutrons in this wavelength band may
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not be the same as that of the beam as a whole, but may instead differ by 180'.
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Although the results make perfect sense from a wave-
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component viewpoint, it brings into question the connec-
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tion between particles and localized wave packets. When
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we say there is a neutron wave packet of coherence
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length Ax, we often think semiclassically that the wave
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packet somehow "is" the localized neutron particle. If the two wave packets traversing paths I and II in the in-
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terferometer overlap within a distance Ax in the region of
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recombination, we picture the neutron overlapping with
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itself, giving rise to interference.
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But consider what this conceptual picture means in
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light of this experiment. By reducing the wavelength spread, we increase the longitudinal coherence length of
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the packet, according to the uncertainty principle:
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„= hx(FWHM) = v'81n2o 1.034 A
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(29)
|
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for
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A. =2.35
|
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0
|
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A.
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The
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calculated
|
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coherence
|
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lengths
|
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are
|
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|
given in Table VIII. The thing to keep in mind is that we
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determine the coherence length after the interference has
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|
taken place, far downstream from the interferometer; Ax
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can be 86, 149, or 3450 A, or any other value for that
|
|
matter. If the wave packets "were" the neutron particle,
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we could not vary their physical extent, at will, after the
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fact, as we have apparently done in this experiment.
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The conclusion to be drawn is a familiar one in quan-
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|
tum mechanics: matters waves are not particles, and we
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|
have no right to think of them as such, even in a semi-
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|
classical way. The neutron wave-packet formalism is
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|
merely the mathematical description of Wheeler's
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|
|
quantum-mechanical "great smoky dragon" [12]. We
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know the neutron is a particle when it is emitted, and
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|
again when it is detected, but between these two times,
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|
the physical connection between the neutron particle and
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the wave packet remains hidden, no matter how diligent-
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|
ly we try to analyze the quantum questions with our clas-
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sical tools.
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|
ACKNO%'LEDGMENTS
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|
|
This work was supported by the Physics Division of the NSF (Grant Nos. PHY-8813253 and PHY-9024608}, the U.S.-Austria program at NSF (Grant No. INT-
|
|
8712122}, and Fonds zur Forderung der wissenschaftlichen Forschung (Project No. S4201) in Austria.
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42
|
|
|
|
KAISER, CLOTHIER, WERNER, RAUCH, AND WOLWITSCH
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|
|
*Present address: Physics Department, Bethany College,
|
|
Bethany, WV 26032.
|
|
[1] R. Clothier, H. Kaiser, S. A. Werner, H. Rauch, and H. Wolwitsch, Phys. Rev. A 44, 5357 (1991).
|
|
[2] S. A. Werner, R. Clothier, H. Kaiser, H. Rauch, and H.
|
|
Wolwitsch, Phys. Rev. Lett. 67, 683 (1991). [3] D. Petrascheck and R. Folk, Phys. Status Solidi (A) 36,
|
|
147 (1976).
|
|
[4] V. F. Sears, Neutron Optics (Oxford University, London, 1989), pp. 245-252.
|
|
[5] H. Rauch and M. Suda, Phys. Status Solidi (A) 25, 495
|
|
(1974).
|
|
[6] W. A. Hamilton, A. G. Klein, and G. I. Opat. Phys. Rev.
|
|
|
|
A 28, 3149 (1983). [7] H. Kaiser, S. A. Werner, and E. A. George, Phys. Rev.
|
|
Lett. SO, 563 (1983). [8] G. Comsa, Phys. Rev. Lett. 51, 1105 (1983).
|
|
[9] H. Bernstein and F. Low, Phys. Rev. Lett. 59, 951 (1987). [10] A. G. Klein, G. l. Opat, and W. A. Hamilton, Phys. Rev.
|
|
Lett. 50, 563 (1983).
|
|
[11]R. Clothier, Ph. D. thesis, University of Missouri-
|
|
Columbia, 1991 (unpublished).
|
|
[12] W. A. Miller and J. A. Wheeler, in Proceedings of the In
|
|
ternational Symposium on the Foundations of Quantum Mechanics, Tokyo, 1983, (Physical Society of Japan, Tok-
|
|
yo, 1983), p. 38.
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|