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Probing Wigner Rotations for Any Group

Published 18 Oct 2017 in hep-th, math-ph, math.MP, math.RT, and quant-ph | (1710.06883v1)

Abstract: Wigner rotations are transformations that affect spinning particles and cause the observable phenomenon of Thomas precession. Here we study these rotations for arbitrary symmetry groups with a semi-direct product structure. In particular we establish a general link between Wigner rotations and Thomas precession by relating the latter to the holonomies of a certain Berry connection on a momentum orbit. Along the way we derive a formula for infinitesimal, Lie-algebraic transformations of one-particle states.

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