Integrability properties of quasi-regular representations of NA groups

Abstract

Let G = N A, where N is a graded Lie group and A = R+ acts on N via homogeneous dilations. The quasi-regular representation π = indAG (1) of G can be realised to act on L2 (N). It is shown that for a class of analysing vectors the associated wavelet transform defines an isometry from L2 (N) into L2 (G) and that the integral kernel of the corresponding orthogonal projector has polynomial off-diagonal decay. The obtained reproducing formula is instrumental for proving decomposition theorems for function spaces on nilpotent Lie groups.