Spectra of Compact Quotients of the Oscillator Group

Abstract

This paper is a contribution to harmonic analysis of compact solvmanifolds. We consider the four-dimensional oscillator group Osc1, which is a semi-direct product of the three-dimensional Heisenberg group and the real line. We classify the lattices of Osc1 up to inner automorphisms of Osc1. For every lattice L in Osc1, we compute the decomposition of the right regular representation of Osc1 on L2(L Osc1) into irreducible unitary representations. This decomposition allows the explicit computation of the spectrum of the wave operator on the compact locally-symmetric Lorentzian manifold L Osc1.