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VOLUME 52, NUMBER 19
PHYSICAL REVIEW LETTERS
7 MAY 1984
Neutron Phase Shift in a Rotating Two-Crystal Interferometer
D. K. Atwood, (a) M. A. Horne, (b) C. G. Shull, and J. Arthur(c) Department ofPhysics, Massachusetts Institute of Technology, Cambridge, Massachusetts 02139
(Received 5 March 1984)
The phase shift introduced by rotational motion of a two-crystal neutron interferometer has been measured and found to agree with prediction within 0.4%. This agreement is obtained without making the in-crystal phase corrections employed in a recent study of a linearly accelerated three-crystal interferometer.
PACS numbers: 03.20. + i, 07.90, + c, 41.80.-y
The phase shift introduced by rotational motion of an optical interferometer was first demonstrated by Sagnac 1 in 1913 and was observed in the 1925 experiment of Michelson, Gale, and Pearson2 in which terrestrial rotation was employed. Although the inertial properties of photons and neutrons differ, an analogous effect for neutrons was predicted by Page3 in 1975. This effect was seen in the gravitation experiment of Colella, Overhauser, and Werner4 in which terrestrial rotation contributed a small phase shift in a three-crystal neutron interferometer. Later investigation5 found this to be within 3% of the predicted value.
A related effect caused by linear acceleration of a three-crystal neutron interferometer has been reported recently by Bonse and Wroblewski.6 Their experiment and the earlier rotation experiment are intimately related since, for each case, the interferometer is at rest in a noninertial frame and neutrons are subject to inertial forces in that frame. Bonse and Wroblewski report phase shifts within 4% of predicted values, after making a 10% correction for in-crystal dynamical diffraction phase shifts. Although a similar correction might improve the agreement with theory in the rotation experiment,5 Staudenmann et al. did not include it in their evaluation. Such inclusion would apparently affect the excellent agreement (1 part in 600) in the gravity experiment.4
The present Letter reports more precise measurements of the Page shift using laboratory controlled rotation of a two-crystal neutron interferometer. Measured over a range of rotation speeds 32 times greater than that of the Earth, the shift agrees with the Page formula to within 0.4% without correction for in-crystal effects.
The Page phase shift <f>R due to interferometer rotation at angular velocity oT has been derived in a number of ways: by optical analogy,3 general rela-
tivity considerations,7 dynamical analysis in a noninertial frame,5 kinematical analysis in an inertial frame, 8 and by analogy with the Bohm-Aharonov
phase shift.9 If centrifugal effects are negligible, the result, to first order in o>, is
<f) R
A.
(1)
Here A is the area enclosed by the unperturbed interferometer beams and any change in the area due to rotation is assumed negligible.
Our experiment was performed with a two-crystal interferometer shown in Fig. 1 . A beam of thermal neutrons (of mean wavelength 1.564 A and angular
;>. rr ^ . (It ^(400) Planes
FIG. 1. Typical neutron current flow in a two-crystal interferometer without rotational motion of interferometer (solid lines) and with rotational motion about entrance point (dashed lines). Overlap focusing occurs at an exit point for either case (slightly modified entrance conditions are necessary to maintain the same separation of the illustrated beams) when a suitable wedge is positioned in the gap between the crystals. The trajectory curvature, arising from the Coriolis force on the neutrons, is very much larger (and with both signs) within the crystals than in the free space region.
1984 The American Physical Society
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PHYSICAL REVIEW LETTERS
7 MAY 1984
divergence 0.52°) illuminates the first of two crystal plates (silicon) through a lxg-mm2 entrance slit. A single plane-wave component of this beam is diffracted by internal (400) planes if the incident angle is within the Darwin range (0.66 arc sec) of the Bragg angle 0B- The angular deviation A0 from the Bragg angle is conveniently specified by a parameter
y,
(2)
where E is the neutron energy and VG is the (400) Fourier component of the crystal potential. The diffraction process gives rise to two neutron currents (shown as solid ray lines in the figure) traveling at opposite but symmetrical angles ± ft relative to the lattice planes with ft determined by y. At the back surface each current releases both forward and Bragg diffracted waves at positions specified by the parameter ± Y defined as
tanft/tan0 B,
(3)
where 0 < Y < 1. At the second crystal each Bragg plane wave again produces two currents traveling at angles ± ft. Two of these four currents meet at an overlap position on the back face of this crystal, thereby completing the interferometer paths associated with the incident plane wave being considered. Other incident plane waves generate current paths with different Y values and we adopt the model that these act independently, i.e., that the various incident plane waves are incoherent. 10
To test this description, a wedge of refractive material may be inserted transverse to the beam in the gap between the crystals, thereby introducing a phase difference <f> w which is proportional to the separation parameter T, i.e.,
0^ = 4)^,
(4)
where <f>w is the phase difference for edge rays (T = 1). With use of standard wave amplitude expressions, the neutron intensity released at the overlap position may be obtained by integration over the parameter Y, noting both amplitude and phase, yielding
where J\ is the first-order Bessel function. This distribution may be tested with continuous variation of & w by rotating a fixed-angle wedge about an axis parallel to the beam. Figure 2 (a) illustrates such a wedge phase scan, using a crystalline silicon wedge of angle 5.94°, as compared to the expected distribution. Although the results are generally consistent with Eq. (5), a significant shift in the central 1674
18
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+ 5.81-10 rod/sec CCW
w«- 5.29-I0~ 4 rod/see CW
/ N
with rotation
/. \ '/ .'.\
• /
• x,
12 £:
o * 10
H20
V
/'.-I'
5 18
without rotation (A)
" 16
14
•-•"•v •/*'-•j»•*"^»*X «v /
12
» i
-X •*
+ 16
-8-4 0 +4 +8 +12 +16 +20 +24 Wedge Phase Difference $ w (rod)
FIG. 2. Neutron intensity from interferometer as a function of phase difference introduced by a wedge inserted between crystals: (a) with no rotational motion and (b) with rotational motion of interferometer. Shifts caused by rotational motion arise from the Coriolis force acting on the neutron. The solid curve in (a) is that expected from Eq. (5) as normalized to the central and wing observed intensities.
peak phase position along with peak broadening and loss of contrast in the outer fringes is to be noted. The former arises from an intrinsic phase gradient within the interferometer system (which includes that caused by unvarying terrestrial rotation) and the latter from the presence of subtle residual vibration effects. This systematic effect is taken into account in all subsequent results.
In the absence of interferometer rotation, we note that the unperturbed currents leaving the first crystal at positions ± Y enclose an area A0F where
o is the area enclosed by the outermost currents, = 1. Thus the rotationally induced phase shift in first order is
(6)
with the assumption that Eq. (1) is valid for an interferometer utilizing in-crystal currents. This assumption is supported by a first-order dynamical diffraction calculation which yields Eq. (6) directly. However, the adequacy of a first-order equation may itself be questioned in view of the trajectory
VOLUME52, NUMBERS
PHYSICAL REVIEW LETTERS
7 MAY 1984
curvature caused by the Coriolis force and the potentially nonnegligible effect on the area. This curvature, depicted in Fig. 1, is greatly enhanced (five orders of magnitude) in the crystals relative to that in free space leading to the concept of an anomalous effective mass of the neutrons 11 which may be of either sign. The details of these hyperbolic paths may be evaluated by adapting the trajectory equations of Werner 12 to the Coriolis force.
It may be shown, however, that the large trajectory perturbations in the crystals have little effect on the area. Considering perturbed currents that reach the same exit points ± F on the first crystal (these will be generated by a slightly tipped incident ray) we note there will be a steady evolution of the y value that continues through the interferometer gap. Thus the radiation incident on the second crystal is shifted by
(7)
from the value incident on the first crystal for all rays. Here, G is the magnitude of the reciprocal lattice vector. Because of this y shift the currents in the second crystal do not meet at the exit surface and hence the enclosed area is not defined. Suppose, however, that a compensating wedge is present in the interferometer chosen such that
= 0.
(8)
Now the currents do meet as shown in Fig. 1 and, moreover, the enclosed area is still A 0F.
The wedge introduced to refocus the currents in the rotating interferometer should also compensate for the phase difference due to rotation. In general, a wedge that produces an angle bending characterized by &yw also produces a phase difference (f>w given by
When Eqs. (7) and (8) are inserted into Eq. (9), the negative of the phase shift given in Eq. (6) is obtained.
The experiment was performed by rotating the interferometer at a fixed rotational speed about a vertical axis located at the neutron entrance point on the first crystal. Wedge scans were performed simultaneously with the rotational motion and are illustrated in Fig. 2(b). The shift in central-peak phase from that with no rotational motion served to identify the compensation phase <b wc . A computer-controlled stepping motor with suitable gearing and step smoothing was used to drive a micrometer which contacted a moment arm affixed to the spectrometer turntable. A further stage of vibration
isolation separated the interferometer crystal from the turntable. The rotational motion was cyclic and limited to a range of 0.5°, thereby maintaining uniform illumination on the crystal at the Bragg angle. Phased counting intervals over a smaller angle range permitted study for both clockwise and counterclockwise motion at preselected constant angular speeds. Calibration wedge scans with no rotation were obtained before and after each motional run.
Consistent results for the wedge scans required stringent control of temperature stability on a millikelvin scale. Peak broadening in the motional wedge scans was found to increase with angular speed and was associated with increased angular vibration. Calculations of this "ac Page effect," based upon direct measurements of the vibration frequency spectrum, gave broadening effects consistent with the observations. It is to be emphasized that the determination of 4> wc is not affected by this contrast reduction.
The results of the experimental study are displayed in Fig. 3 where the rotational phase difference as derived from the wedge compensation value is graphed versus rotational angular speed. A linear
+16 +12
-8 -6 -4 theoretical
ccw x +2 +4 +-6 +8
(I0~4 rod/sec)
-8
-12
Std. deviation
-16
(XIO)
-20
FIG. 3. Interferometer phase difference induced by rotation as a function of rotational angular speed. For clarity, the standard-deviation brackets of the measured points are presented with tenfold amplification. The small arrow indicates the effective terrestrial rotation speed at Cambridge, Massachusetts and the solid line is the ex-
pected linear dependence of Eq. (6).
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PHYSICAL REVIEW LETTERS
7 MAY 1984
regression fit to the data gives 19091(88)c«>-0.044(0.035)
for comparison with the numerical evaluation of Eq. (6) for our interferometer (/4 0 = 6.036 cm2, /-0.9186 cm, and L =3.747 cm),
with the phase being expressed in radians and angular speed in radians per second. Agreement with theory is about 0.4% and within standard deviation.
The absence here of a Bonse-type correction, i.e., first order in the perturbing force, is a general feature of the two-crystal interferometer valid for the gravity as well as the Coriolis case. Experiment improvements will ultimately encounter phase shifts that are second order in the perturbation as represented by path integrals along first-order trajectories and these will require careful treatment in the crystals because of the anomalous effective mass of the neutrons. Experiments demonstrating the effects of applied magnetic forces are currently in progress.
We appreciate discussion with A. Zeilinger, A. G. Klein, D. Greenberger, and H. Bernstein. The research was supported by U. S. Department of Energy Contract No. DE-AC02-76ER03342.
(a) Present address: AT&T Bell Laboratories, Murray Hill, N. J. 07974.
(b)Permanent address: Stonehill College, North Easton, Mass. 02356.
<c)presen t address: Oak Ridge National Laboratory, Oak Ridge, Tenn. 37830.
'M. G. Sagnac, C. R. Acad. Sci. 157, 708, 1410 (1913). 2A. A. Michelson, H. G. Gale, and F. Pearson, Astrophys.J. 61, 140(1925).
3L. A. Page, Phys. Rev. Lett. 35, 543 (1975). 4R. Colella, A. W. Overhauser, and S. A. Werner, Phys. Rev. Lett. 34, 1472 (1975).
5J. L. Staudenmann, S. A. Werner, R. Colella, and A. W. Overhauser, Phys. Rev. A 21, 1419 (1980).
6U. Bonse and T. Wroblewski, Phys. Rev. Lett. 51, 1401 (1983).
7J. Anandan, Phys. Rev. D 15, 1448 (1977); L. Stodolsky, Gen. Relativ. Gravit. 11, 391 (1979).
8L. A. Page, in Neutron Interferometry, edited by U. Bonse and H. Rauch (Clarendon, Oxford, 1980), p. 327; M. Dresden and C. N. Yang, Phys. Rev. D 20, 1846 (1979).
9J. J. Sakurai, Phys. Rev. D 21, 2993 (1980). 10Different behavior is to be expected if the entrance slit width is much finer than that normally used: J. R. Arthur, Ph.D. thesis, Massachusetts Institute of Technology, 1983 (unpublished).
UD. K. Atwood, Ph.D. thesis, Massachusetts Institute of Technology, 1982 (unpublished); also A. Zeilinger et ai, to be published.
12S. A. Werner, Phys. Rev. B 21, 1774 (1980).
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