Spectral multiplier theorems of Euclidean type on new classes of 2-step stratified groups

Abstract

From a theorem of Christ and Mauceri and Meda it follows that, for a homogeneous sublaplacian L on a 2-step stratified group G with Lie algebra g, an operator of the form F(L) is of weak type (1,1) and bounded on Lp(G) for 1 < p < ∞ if the spectral multiplier F satisfies a scale-invariant smoothness condition of order s > Q/2, where Q = g + [g,g] is the homogeneous dimension of G. Here we show that the condition can be pushed down to s > d/2, where d = g is the topological dimension of G, provided that d ≤ 7 or [g,g] ≤ 2.