Some harmonic analysis on commutative nilmanifolds

Abstract

In this work, we consider a family of Gelfand pairs (K N, N) (in short (K,N)) where N is a two step nilpotent Lie group, and K is the group of orthogonal automorphisms of N. This family has a nice analytic property: almost all these 2-step nilpotent Lie group have square integrable representations. In this cases, following Moore-Wolf's theory, we find an explicit expression for the inversion formula of N, and as a consequence, we decompose the regular action of K N on L2(N). This result completes the analysis carried out by Wolf, where the inversion formula is obtained in the case that N has not square integrable representation. When N is the Heisenberg group, we obtain the decomposition of L2(N) under the action of K N for all K such that (K,N) is a Gelfand pair. Finally, we also give a parametrization for the generic spherical functions associated to the pair (K,N), and we give an explicit expression for these functions in some cases.