TL;DR
This paper reviews the concept of the geometric phase in quantum systems, covering its theory, implications, experimental observation, and diverse applications across physics disciplines.
Contribution
It provides a comprehensive overview of the geometric phase, including recent theoretical developments and a wide range of applications in various physical systems.
Findings
The geometric phase arises in cyclic quantum evolutions and has observable effects.
Generalizations include nonadiabatic and degenerate cases, expanding its applicability.
Applications span from classical physics to condensed matter, illustrating its fundamental importance.
Abstract
Quantum eigenstates undergoing cyclic changes acquire a phase factor of geometric origin. This phase, known as the Berry phase, or the geometric phase, has found applications in a wide range of disciplines throughout physics, including atomic and molecular physics, condensed matter physics, optics, and classical dynamics. In this article, the basic theory of the geometric phase is presented along with a number of representative applications. The article begins with an account of the geometric phase for cyclic adiabatic evolutions. An elementary derivation is given along with a worked example for two-state systems. The implications of time-reversal are explained, as is the fundamental connection between the geometric phase and energy level degeneracies. We also discuss methods of experimental observation. A brief account is given of geometric magnetism; this is a Lorenz-like force of…
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Taxonomy
TopicsQuantum and electron transport phenomena · Advanced Physical and Chemical Molecular Interactions · Quantum, superfluid, helium dynamics