On the Analytic Structure of Commutative Nilmanifolds

Abstract

In the classification theorems of Vinberg and Yakimova for commutative nilmanifolds, the relevant nilpotent groups have a very surprising analytic property. The manifolds are of the form G/K = N K/K where, in all but three cases, the nilpotent group N has irreducible unitary representations whose coefficients are square integrable modulo the center Z of N. Here we show that, in those three "exceptional" cases, the group N is a semidirect product N1 R or N1 C where the normal subgroup N1 contains the center Z of N and has irreducible unitary representations whose coefficients are square integrable modulo Z. This leads directly to explicit harmonic analysis and Fourier inversion formulae for commutative nilmanifolds.