Reduced Gutzwiller formula with symmetry: case of a Lie group

Abstract

We consider a classical Hamiltonian H on R2d, invariant by a Lie group of symmetry G, whose Weyl quantization H is a selfadjoint operator on L2(Rd). If is an irreducible character of G, we investigate the spectrum of its restriction H\ to the symmetry subspace L2\(Rd) of L2(Rd) coming from the decomposition of Peter-Weyl. We give semi-classical Weyl asymptotics for the eigenvalues counting function of H\ in an interval of R, and interpret it geometrically in terms of dynamics in the reduced space R2d/G. Besides, oscillations of the spectral density of H\ are described by a Gutzwiller trace formula involving periodic orbits of the reduced space, corresponding to quasi-periodic orbits of R2d.

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