On the spectral theory of groups of affine transformations of compact nilmanifolds

Abstract

Let N be a connected and simply connected nilpotent Lie group, a lattice in N, and X=N/ the corresponding nilmanifold. Let Aff(X) be the group of affine transformations of X. We characterize the countable subgroups H of Aff(X) for which the action of H on X has a spectral gap, that is, such that the associated unitary representation U of H on the space of functions from L2(X) with zero mean does not weakly contain the trivial representation. Denote by T the maximal torus factor associated to X. We show that the action of H on X has a spectral gap if and only if there exists no proper H-invariant subtorus S of T such that the projection of H on Aut (T/S) has an abelian subgroup of finite index. We first establish the result in the case where X is a torus. In the case of a general nilmanifold, we study the asymptotic behaviour of matrix coefficients of U using decay properties of metaplectic representations of symplectic groups. The result shows that the existence of a spectral gap for subgroups of Aff(X) is equivalent to strong ergodicity in the sense of K.Schmidt. Moreover, we show that the action of H on X is ergodic (or strongly mixing) if and only if the corresponding action of H on T is ergodic (or strongly mixing).