Spectral Multipliers on 2-Step Stratified Groups, II

Abstract

Given a graded group G and commuting, formally self-adjoint, left-invariant, homogeneous differential operators L1,…, Ln on G, one of which is Rockland, we study the convolution operators m(L1,…, Ln) and their convolution kernels, with particular reference to the case in which G is abelian and n=1, and the case in which G is a 2-step stratified group which satisfies a slight strengthening of the Moore-Wolf condition and L1,…,Ln are either sub-Laplacians or central elements of the Lie algebra of G. Under suitable conditions, we prove that: i) if the convolution kernel of the operator m(L1,…, Ln) belongs to L1, then m equals almost everywhere a continuous function vanishing at ∞ (`Riemann-Lebesgue lemma'); ii) if the convolution kernel of the operator m(L1,…, Ln) is a Schwartz function, then m equals almost everywhere a Schwartz function.