Spectral Multipliers on 2-step Stratified Groups, I

Abstract

Given a 2-step stratified group which does not satisfy a slight strengthening of the Moore-Wolf condition, a sub-Laplacian L and a family T of elements of the derived algebra, we study the convolution kernels associated with the operators of the form m(L, -i T). Under suitable conditions, we prove that: i) if the convolution kernel of the operator m(L,-i T) 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(L,-iT) is a Schwartz function, then m equals almost everywhere a Schwartz function.