Perturbative anomalies in quantum mechanics
Abstract
In this work, we propose a cohomological approach to studying perturbative anomalies in quantum mechanics. The Hamiltonian H together with the symmetry generator S forms a unitary representation of the two-dimensional Abelian Lie algebra g R2 on the Hilbert space V. We show that perturbations of such a system are related to the first Chevalley-Eilenberg cohomology group H1CE(R2,u(V)). In turn, the perturbative anomalies of the symmetry S are related to the second cohomology group H2CE(R2,u(V)).
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