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Abstract A quantal system in an eigenstate, slowly transported round a circuit C by varying parameters R in its Hamiltonian Ĥ (R), will acquire a geometrical phase factor expiγ (C) in addition to the familiar dynamical phase factor. An explicit general formula for γ (C) is derived in terms of the spectrum and eigenstates of Ĥ (R) over a surface spanning C. If C lies near a degeneracy of Ĥ, γ (C) takes a simple form which includes as a special case the sign change of eigenfunctions of real symmetric matrices round a degeneracy. As an illustration γ (C) is calculated for spinning particles in slowly-changing magnetic fields; although the sign reversal of spinors on rotation is a special case, the effect is predicted to occur for bosons as well as fermions, and a method for observing it is proposed. It is shown that the Aharonov-Bohm effect can be interpreted as a geometrical phase factor.
Michael Berry (Thu,) studied this question.
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