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Phase-conjugation of the isolated optical vortex using a flat surfaces.
A.Yu.Okulov Russian Academy of Sciences, 119991, Moscow, Russia
(Dated: August 14, 2014)
The robust method for obtaining the helical interference pattern due to the phase-conjugation of an isolated optical vortex by means of the non-holographic technique is proposed. It is shown that a perfect wavefront-reversal of the vortex in a linear polarization state via even number of reflections is achievable due to the flip-flop of the photons momentum p ≈ k with respect to the photons orbital angular momentum projection Lz. The possible experimental realization is based upon catseye prism like reflections inside the confocal optical loop cavity. The alternative scheme contains the Dove prism embedded in the optical loop with the odd number of reflections from mirrors. This conf ocal interferometric technique is applicable to the optical tweezers, atomic traps, Sagnac laser loops and metamaterials fabrication.
PACS numbers: 42.65.Hw,42.65.Jx,42.65.Re,42.55.Wd,42.60.Jf
arXiv:1006.2778v6 [physics.optics] 14 Aug 2014
I. INTRODUCTION.
Phase-conjugation (PC) proved to be an efficient tool for the laser beam divergence control [1], self-adjustment of optical schemes [2] and beam combination [3] a decades ago. A substantial progress in understanding of the physical mechanism of a PC-mirror is associated with a concept of the phase-singularities inside an optical speckle patterns [4]. In accordance with this concept the randomly spaced dark lines of the speckle (zeros of electric field complex amplitude Ef (z, r⊥, t)) are collocated with the helical phase ramps [5]. Thus the phase-conjugated replica Eb(z, r⊥, t) = Ef (z, r⊥, t) ought to have the set of the own helical phase ramps collocated with the phase ramps of the incident wave [2]. This helical phase feature of the optical speckle imposes a serious limitation upon the usage of the deformable adaptive mirrors because the smooth deformable surface is not capable to follow the helical phase ramp. On the other hand the dynamical interference pattern written by the incident speckle and reflected wave inside nonlinear optical medium, say Stimulated Brillouin Scattering(SBS) medium [3] or photorefractive medium [6], operates like a high-fidelity spatial filter increasing the signal-noise ratio for the backward reflected PC wave Eb.
Recently the concept of phase singularity had been enriched by understanding that helical phase ramps are the sources of the helical interference patterns around zeros of the speckle optical fields [7, 8]. In particular it was shown that interference of the two counter propagating isolated optical vortices in the form of Laguerre-Gaussian (LG) beams produces a helical optical potential or ”lattice with twist” [9]. The key point for achieving such a helical interference pattern proved to be the conservation of the total orbital angular momentum (OAM) in a PC -
Electronic
address:
alexey.okulov@gmail.com;
URL: https://sites.google.com/site/okulovalexey
mirror: the turn of OAM of reflected wave is the urgent requirement to the perfect coincidence of the incident and reflected wavefronts and helicoidal interference [8]. Noteworthy that for the non PC mirror the OAM is not reversed and the interference pattern around phase singularity is a toroidal one [10]. The other important feature of the PC - mirror is that OAM conservation leads unavoidably to the transfer of rotations to the PC mirror. In SBS mirror the rotations appear in the form of the helical acoustical phonons with 2 OAM hence optical anisotropy (chirality) emerges in initially isotropic SBS medium [11]. Quite recently the chiral sound excitations in an initially isotropic liquid were found experimentally and obtained numerically using Khokhlov-ZabolotskayaKuznetsov equation [12]. Nevertheless we will show below that in a definite experimental conditions the PC reflection of a single optical vortex with a topological charge may be achieved experimentally with the even number of reflections from the perfectly flat (nonchiral) surfaces.
II. PROPAGATION OF THE SPECKLE AND ISOLATED VORTEX LINE.
The propagation of a speckle field along z axis means a motion of the field zeros, i.e. the motion of the phase singularities in the same z axis direction. The trajectories of zeros are not rectilinear [11, 13, 14], moreover trajectories intertwine each other as it happens with the higher-order LG optical vortices propagation [15]. The intertwining produces the structurally stable twisted entities in a speckle (fig.1) as is shown by numerical modeling of the following equation [7]:
∂ E(f ,b) (z , ∂z
r⊥,
t)
+
n(z, r⊥) c
∂ E(f ,b) ∂t
±
i 2k(f,b)
∆⊥E(f,b)
=
0,
(1)
where n(z, r⊥) is inhomogeneity of refractive index,
k(f,b) = |kf,b| ≈ kz are the wave numbers of the counter
2
FIG. 1: a) Intertwining of the helical interference patterns in the optical speckle [7].The size of pattern is 32µm in Xdirection and 64µm in Z-direction. The period of longitudinal (Z) modulation is λ/2. b) In contrast to optical vortices in a speckle the isolated LG optical vortices propagate rectilinearly. Interference pattern (4) is sliced at Y = 0, 5, 10µm distances from the vortex axis Z.
FIG. 2: Two consecutive reflections of LG beam emitted by CW laser with mode converter MC. Each total internal reflection inside the catseye prism from plane prism surface changes the topological charge of LG to the opposite one. After two reflections at 45-degree angle the optical vortex has the opposite direction of propagation and opposite direction of the angular momentum. The counter propagating LG has the same topological charge hence composite wavetrain produces the helical interference pattern. Confocal telescope consisting of the thin lenses L compensates the free-space propagation parabolic wavefront.
directed incident and reflected speckle fields, with bound-
ary condition as a multimode random field [16] composed of Ng plane waves having amplitudes Ajx,jy , random phases θjx,jy and randomly tilted wave vectors each hav-
ing random transverse projections kj⊥x,jy at z = 0 plane:
FIG. 3: The single reflection inside Dove prism changes the topological charge. After the two refractions the LG propagates with conserved momentum and overturned angular momentum. This leads to helical interference pattern due to
overlapping with counter propagating LG, having opposite
E(f)(r, 0) ≈ E0(f)
Ajx,jy exp [i kj⊥x,jy ·r⊥+iθjx,jy ]. OAM.
jx,jy ∈Ng
(2)
The paraxial propagation of the randomly tilted plane self-similar propagation of the optical vortex for the non-
waves produces the twisted interference patterns resem- holographic wavefront reversal by conventional mirrors,
bling visually the ropes each composed of several inter- lenses and prisms. At the first sight our proposal looks a
twined optical vortices [7, 15]. The similar propagation counterintuitive one, because we focus attention of exper-
behavior and appearance of the knot structures had been imentalists upon previously criticized catseye prism PC
reported in [13, 14].
techniques [2]. The case is that the rays reversal (with
In contrast to the speckle field, the isolated vortex line small lateral displacement) inside the prism is not able
propagates rectilinearly in a free space and it is struc- to perform a wave propagation reversal of the random
turally stable (fig.1). This happens for example for the collection of optical vortices in a speckle field or in the
LG laser beam with topological charge [18]:
complicated image optical field. This seeming paradox is
resolved by taking into account that rays reversal means
E(f,b)(z, r, θ, t)
E0(f,b)
exp (1
[ i(−ω(f,b)t ± k(f,b)z) + iz/(k(f,b)D02))2
±
iθ]
a photons momentum reversal, while helical phase singularity is reversed by means of the angular momentum resersal [8]. Noteworthy that OAM direction is changed
(r/D0)
exp [
D02(1
+
r2 iz/(k(f,b)D02))
]
,(3) to the opposite one inside Dove prism due to one total internal reflection inside prism (at 45 degrees incidence
angle) and two refractions [19]. The same happens in
where [(z, r, θ, t) → (z, r⊥, t)] are cylindrical coordinates catseye prism due to the same reason: when the plane
embedded at LG axis (z axis). This straight vortex surface is tilted at the angle α with respect to propaga-
line is the exact self-similar solution of the free space tion of vortex the rotational symmetry of setup is absent
wave equation in a paraxial approximation (1). Our aim hence the angular momentum is not conserved and OAM
is to describe how to use the structural stability, hence is rotated at 2α angle. For both prisms the change of an-
3
gular momentum is 2 per photon hence the prisms feel
the torque |T | = 2 · I/ω, where I is intensity, ω is radiation frequency [8].
As a consequence of OAM reversal the vortex propagates in the optical loop schemes (fig.2, fig.3) as a perfectly phase-conjugated one due to the simple reflections from conventional prism surfaces, provided the vortex is slightly focused by a thin lenses in order to compensate diffractive divergence. The technical requirements for the loop adjustment are the same as those previously formulated for the ring lasers and Fabry-Perot cavities with Hermite-Gaussian and Laguerre-Gaussian beams [10].
III. ANGULAR MOMENTA ORIENTATION AND ROTATION OF INTERFERENCE PATTERN
For the ultimate quality PC reflection of the linearly polarized (E0(f,b)||y axis) s order LG-laser beam the interference pattern inside the beam waist reads as:
|Ef (z, r, θ, t) + Eb(z, r, θ, t)|2 |E0(f,b)|2·
(r/D0)2exp [
D0
2
(1
+
2 iz
· r2 /(k(f,b)D02))
[1 + cos[ (ωf ωb)t (kf + kb)z + 2 θ ]] , (4)
The helicity of pattern is due to the self-similar phase argument (ωf ωb)t (kf + kb)z + 2 θ which remains a constant at the double helix with a diameter 2D0 and λ/2 pitch (λ = 2π/k(f,b)) [8]. Such double helix optical potential rotates with angular frequency Ω = ωf ωb which looks attractive from the point of view of optical microfluidics, micro and nano-particles manipulation [6, 15] and as an optical dipole trap for ultracold atomic ensemble [9].
The key point in physical interpretation of this helical pattern is the mutual orientation of the photons
momentum p ≈ k and projection of the photons orbital angular momentum Lz on propagation axis [8, 18]. The mutual orientation of both quantum and classical
momenta p and angular momenta L is changed after single reflection from isotropic optical element namely metal or multilayer dielectric mirror. On the contrary the anisotropic structures inside wavefront reversal mirror [8] perform turn of the orbital angular momentum of laser beam because of the wavefront matching property of PCM. This turn operation is analogous to the photons spin turn (change of the circular polarization to the oppositely rotating one) when passing through birefringent plate (i.e.anisotropic crystal) [20].
Consider two optical loop schemes (fig.2, fig.3) composed of plane mirrors, ideal thin lenses for the adjusting of the parabolic component of the wavefronts (3) [19] and prisms (possibly with laser gain medium inside). As is shown in [8] each reflection from plane mirror changes
the mutual orientation of the photons momentum kz
and the angular momentum Lz = ± z/z to the opposite one.
Consequently two reflections in (fig.2) scheme does not change the topological charge of photon and oppositely propagating wave possesses the helical wavefront with the same handedness. Thus LG beam reflected inside catseye prism and the other LG beam reflected from beamsplitter BS and mirror M1 will have the perfect wavefront coincidence provided their parabolic phase profiles which occurs due to a free-space propagation are compensated by a thin lens (fig.2, fig.3). As a result the interference pattern will have a double helix geometry, provided their path difference is smaller than coherence a length ∆lcoh = c · τ (τ is coherence time). Alternatively in fig.3 scheme the single reflection inside Dove prism changes the topological charge of each photon to the opposite one [19] and the else reflection from mirror M2 is needed to restore the mutual orientation of the OAM and momentum. This sequence of reflections ensure the helical wavefront coincidence and produces the helical interference pattern with the twice-reflected (BS+M1) counter propagating LG beam. The removal of Dove prism will produce toroidal interference pattern because of the absence of phase conjugation and parallel orbital angular momenta of colliding photons [6, 8, 10].
The frequency shift Ω may be produced via two different mechanisms. The first mechanism is the rotational Doppler shift which arises because of rotation of the birefringent half-wavelength plate which alternates the spin component of angular momentum [15, 21] or rotating Dove prism, which alternates the orbital component of angular momentum [22]. The Dove prism rotation technique is difficult to implement because of strict alignment requirements for interference pattern control. The other mechanism is the Sagnac frequency shift which appears in a ring laser located in rotating reference frame. This happens when prisms have laser gain areas collocated with LG beam propagation. Typically the optical gain is induced in a rare-earth doped dielectric host crystals by virtue of the diode laser pump [23]. In this case the external laser outside the loop is not necessary and the beamsplitter BS is to be replaced to return mirror R3. The conditions for the selection of a given transverse LG mode are to be fulfilled [24] and such a case deserves a special consideration elsewhere. As is well known for the loop laser schemes the counter propagating beams have a different frequencies ωf and ωb because of the Earth rotation having angular frequency Ω⊕ and the angular frequency of the optical table rotation Ωlab. For the such Sagnac loop [24] the frequency splitting is:
=
(ωf
ωb)
=
8πA P·
Ωr λ
,
(5)
where Ωr = Ω⊕ + Ωlab (2π/86400) + Ωlab is the angular speed of rotation of the laboratory frame, P , A are the perimeter and the square of the loop respectively. The
frequency shift is measured by a detection of a beats (rotation of interference pattern in our case) of the counter
4
propagating intracavity beams behind the cavity mirrors (M1,M2 in fig.2, fig.3). For the typical ratio of the spatial dimensions of the Sagnac loop laser to the wavelength λ 1µm the frequency splitting proves to be Ω ≈ 2π10(13)rad/sec. In particular the evaluation of Ω is straitforward for the circular ring cavity of radius R when P = 2 · πR, A = πR2: the frequency splitting is Ω = Ωr4πR/λ.
IV. CONCLUSION
In summary we proposed the phase-conjugation of an isolated optical vortex line (LG-beam) with lateral displacement in the confocal optical loop scheme with the even number of reflections. The alternative optical loop
with the odd number of mirrors contains a Dove prism which alternates the photons OAM projection after the straight passage through a prism. This scheme is different from Mach-Zehnder setup used previously for rotational Doppler effect study [15, 21, 22]. Our loop setups with colliding phase-conjugated optical vortices and helical interference patterns therein are the promising tools for nonexpensive replacement of nonlinear optical phase conjugators based upon SBS [2, 3], photorefractive crystals [6] and liquid crystal light valves. The field of experimental applications of confocal loops with catseye prism or Dove prism is in atomic traps [9] and optical tweezers, in particular in assembling the protein - like clusters [25]. The other intriguing application is in the lithography of metamaterials [26, 27] and optical waveguides with the helical refractive index and conductivity [28].
[1] R.Hellwarth, ”Generation of time-reversed wave fronts by nonlinear refraction,”JOSA,67,1-3(1977).
[2] B.Y.Zeldovich, N.F.Pilipetsky and V.V.Shkunov, ”Principles of Phase Conjugation,” (Springer-Verlag), (1985).
[3] N.G.Basov, I.G.Zubarev, A.B.Mironov, S.I.Mikhailov and A.Y.Okulov, ”Laser interferometer with wavefront reversing mirrors,” JETP, 52, 847(1980).
[4] J.F.Nye and M.V.Berry, ”Dislocations in wave trains,” Proc.R.Soc.London, Ser.A, 336,165(1974).
[5] I. Basistiy, M.S.Soskin and M.V.Vasnetsov, ”Optical wave-front dislocations and their properties,” Opt. Commun.119, 604-612(1995).
[6] M.Woerdemann, C.Alpmann and C.Denz, ”Self-pumped phase conjugation of light beams carrying orbital angular momentum,” Opt. Express, 17, 22791(2009).
[7] A.Yu.Okulov, ”Twisted speckle entities inside wavefront reversal mirrors,”Phys.Rev.A , 80, 163907 (2009).
[8] A.Yu.Okulov,”Angular momentum of photons and phase conjugation,” J.Phys.B., 41, 101001 (2008).
[9] M.Bhattacharya,”Lattice with a twist: Helical waveguides for ultracold matter”, Opt.Commun. 279 (1), 219222 (2007).
[10] T. Puppe, I. Schuster, A. Grothe, A. Kubanek, K. Murr, P.W.H. Pinkse, and G. Rempe, ”Trapping and Observing Single Atoms in a Blue-Detuned Intracavity Dipole Trap,” Phys.Rev.Lett., 99, 013002 (2007).
[11] A.Yu.Okulov,”Optical and sound helical structures in a Mandelstamm-Brillouin mirrors,” JETP Letters, 88,487491 (2008).
[12] R. Marchiano, F. Coulouvrat, L. Gnjehi, and J.-L. Thomas, ”Numerical investigation of the properties of nonlinear acoustical vortices through weakly heterogeneous media,” Phys.Rev.E, 77, 016605 (2008).
[13] J.Leach, M.R.Dennis, J.Courtial, and M.J.Padgett, ”Vortex knots in light,” New.J.Phys.,7, 55 (2005).
[14] M.R.Dennis, R.P.King, B.Jack, K.OHolleran, and M.J.Padgett, ”Isolated optical vortex knots,” Nature.Phys.,6, 118(2010).
[15] M. P. MacDonald, K. Volke-Sepulveda, L. Paterson, J. Arlt, W. Sibbett and K. Dholakia. ”Revolving interference patterns for the rotation of optically trapped particles”, Opt.Comm.,201(1-3),21-28 (2002).
[16] A.Yu.Okulov,”The effect of roughness of optical elements on the transverse structure of alight field in a nonlinear Talbot cavity,” J.Mod.Opt. 38, n.10, 1887 (1991).
[17] A.Yu.Okulov, A.Yu.Okulov,”Two-dimensional periodic structures in nonlinear resonator,” JOSA, B7, 1045 (1990).
[18] L.Allen, M.W.Beijersbergen, R.J.C.Spreeuw and J.P.Woerdman, ”Orbital angular momentum of light and the transformation of Laguerre-Gaussian laser modes,” Phys.Rev. A 45,8185-8189 (1992).
[19] J.Leach,M.J.Padgett,S.M.Barnett,S.Franke-Arnold, and J.Courtial, ”Measuring the Orbital Angular Momentum of a Single Photon,” Phys.Rev.Lett. 88, 257901 (2002).
[20] R.A. Beth,”Mechanical detection and measurement of the angular momentum of light,” Phys.Rev., 50, 115(1936).
[21] J. Arlt, M. MacDonald, L. Paterson, W. Sibbett,K. Volke-Sepulveda and K. Dholakia,”Moving interference patterns created using the angular Doppler-effect,” Opt. Express, 10(19),844(2002).
[22] Ch.V.Felde, P.V.Polyanski and H.V.Bogatyryova, ”Comparative analysis of techniques for diagnostics of phase singularities,” Ukr. J. Phys. Opt. , 9, 8290 (2008).
[23] A.Yu.Okulov,”Scaling of diode-array-pumped solid-state lasers via self-imaging,” Opt.Comm., 99, p.350-354 (1993).
[24] M.O.Scully, M.S.Zubairy,”Quantum optics”, Ch.4 and Ch.17, (Cambridge University Press), (1997).
[25] D.Zerrouki, J.Baudry, D.Pine, P.Chaikin and J. Bibette, ”Chiral colloidal clusters,” Nature, 455, 380(2008).
[26] V.G.Veselago,”The electrodynamics of substances with simultaneously negative values of ǫ and µ,” Sov.Phys.Usp.,10, 509 (1968).
[27] M. Thiel, H. Fischer, G. von Freymann, and M. Wegener, ”Three-dimensional chiral photonic superlattices,” Opt.Lett.,35(2), 166 (2010).
[28] Z. Menachem and M. Mond, ”Infrared wave propagation in a helical waveguide with inhomogeneous cross section and application,” Progress In Electromagnetic Research, 61, 159192 (2006).