Reduced Gutzwiller formula with symmetry: case of a finite group
Abstract
We consider a classical Hamiltonian H on R2d, invariant by a finite 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 reduced semi-classical asymptotics of a regularised spectral density describing the spectrum of H\ near a non critical energy E∈R. If \E:=\H=E \ is compact, assuming that periodic orbits are non-degenerate in \E/G, we get a reduced Gutzwiller trace formula which makes periodic orbits of the reduced space \E/G appear. The method is based upon the use of coherent states, whose propagation was given in the work of M. Combescure and D. Robert.
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