- Geometric phase
In mechanics (including
classical mechanicsas well as quantum mechanics), the Geometric phase, or the Pancharatnam-Berry phase (named after S. Pancharatnamand Sir Michael Berry), also known as the Pancharatnam phase or Berry phase, is a phase acquired overthe course of a cycle, when the system is subjected to cyclic adiabatic processes, resulting from the geometrical properties of the parameter spaceof the Hamiltonian. The phenomenon was first discovered in 1956, [S. Pancharatnam, Proceedings of Indian Acadamic of Science, 44, A, 247 (1956).] and rediscovered in 1984. [M. V. Berry, Proceedings of the Royal Society of London, A, 392, 45 (1984).] It can be seen in the Aharonov-Bohm effectand in the conical intersectionof potential energy surfaces. In the case of the Aharonov-Bohm effect, the adiabatic parameter is the magnetic fieldinside the solenoid, and cyclic means that the difference involved in measuring the effect by interference corresponds to a closed loop, in the usual way (see below). In the case of the conical intersection, the adiabaticparameters are the molecular coordinates. Apart from quantum mechanics, it arises in a variety of other wavesystems, such as classical optics. As a rule of thumb, it occurs whenever there are at least two parameters affecting a wave,in the vicinity of some sort of singularity or some sort of hole in the topology.
Waves are characterized by
amplitudeand phase, and both may vary as a function of those parameters. The Berry phase occurs when both parameters are changed simultaneously but very slowly (adiabatically), and eventually brought back to the initial configuration. In quantum mechanics, this could e.g. involve rotations but also translations of particles, which are apparently undone at the end. Intuitively one expects that the waves in the system return to the initial state, as characterized by the amplitudes and phases (and accounting for the passage of time). However, if the parameter excursions correspond to a cyclic loopinstead of a self-retracing back-and-forth variation, then it is possible that the initial and final states differ in their phases. This phase difference is the Berry phase, and its occurrence typically indicates that the system's parameter dependence is singular (undefined) for some combination of parameters.
To measure the Berry phase in a wave system, an
interference experimentis required. The Foucault pendulumis an example from classical mechanicsthat is sometimes used to illustrate the Berry phase. This mechanics analogue of the Berry phase is known as the Hannay angle.
Examples of geometric phases
The Foucault Pendulum
One of the easiest examples is the
Foucault pendulum. An easy explanation in terms of geometric phases is given by Frank Wilczek::How does the pendulum precess when it is taken around a general path C? For transport along the equator, the pendulum will not precess. [...] Now if C is made up of geodesicsegments, the precession will all come from the angles where the segments of the geodesics meet; the total precession is equal to the net deficit angle which in turn equals the solid angleenclosed by C modulo 2pi. Finally, we can approximate any loop by a sequence of geodesic segments, so the most general result (on or off the surface of the sphere) is that the net precession is equal to the enclosed solid angle.In summary, there are no inertial forces that could make the pendulum precess. Thus the orientation of the pendulum undergoes parallel transportalong the path of fixed latitude. By the Gauss-Bonnet theoremthe phase shift is given by the enclosed solid angle.
Polarized light in an optical fiber
Imagine linearly polarized light entering a
single-mode optical fiber. Suppose the fiber traces out some path in space and the light exits the fiber in the same direction as it entered. Then compare the initial and final polarizations. In semiclassical approximationthe fiber functions like a waveguide and the momentum of the light is at all times tangent to the fiber. The polarization can be thought of as an orientation perpendicular to the momentum. As the fiber traces out its path, the momentum vector of the light traces out a path on the sphere in momentum space. The path is closed since initial and final directions of the light coincide, and the polarization is a vector tangent to the sphere. Going to momentum space is equivalent to taking the Gauss map. There are no forces that could make the polarization turn, just the constraint to remain tangent to the sphere. Thus the polarization undergoes parallel transport and the phase shift is given by the enclosed solid angle (times the spin, which in case of light is 1).
* For the connection to mathematics, see
Conical intersections of potential energy surfaces.
* V. Cantoni and L. Mistrangioli (1992) "Three-Point Phase, Symplectic Measure and Berry Phase", "International Journal of Theoretical Physics " vol. 31 p. 937.
* Richard Montgomery, "A Tour of Subriemannian Geometries, Their Geodesics and Applications (Mathematical Surveys and Monographs, Volume 91)", (2002) American Mathematical Society, ISBN 0-8218-1391-9. "(See chapter 13 for a mathematical treatment)"
* Connections to other physical phenomena (such as the
Jahn-Teller effect) are discussed here: [http://www.mi.infm.it/manini/berryphase.html]
* Paper by Prof. Galvez at Colgate University, describing Geometric Phase in Optics: [http://departments.colgate.edu/physics/faculty/EGalvez/articles/PreprintRflash.pdf]
* Surya Ganguli, " Fibre Bundles and Gauge Theories in Classical Physics: A Unified Description of Falling Cats, Magnetic Monopoles and Berry's Phase" [http://www.keck.ucsf.edu/~surya/cats.ps]
* Robert Batterman, "Falling Cats, Parallel Parking, and Polarized Light" [http://philsci-archive.pitt.edu/archive/00000794/00/falling-cats.pdf]
Frank Wilczekand Alfred Shapere, "Geometric Phases in Physics", World Scientific, 1989
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