LEITE, Camilla dos Santos Rodrigues.; LIMA, Aércio Ferrreira de.
Résumé:
When a system moves in a cyclical motion from the initial to final state, the wave function acquires a phase.
The phase acquired by the physical system, in general, comes from two contributions: one from a dynamic
nature and the other from a nature geometric. The geometric phase is not only important for quantum
mechanics systems but also for all ondulatory physical. The analysis of a simple one-dimensional
mechanical system is used to discuss the relationship between geometric phase and non-classical
properties of quantum states. The quantum system investigated in this study is a particle bound to a square
well potential, commonly discussed in text-books, except for the possibility that the walls of the well move
adiabatically.