Sub-Laplacians of holomorphic Lp-type on exponential solvable groups

Abstract

Let L denote a right-invariant sub-Laplacian on an exponential, hence solvable Lie group G, endowed with a left-invariant Haar measure. Depending on the structure of G, and possibly also that of L, L may admit differentiable Lp-functional calculi, or may be of holomorphic Lp-type for a given p 2. By ``holomorphic Lp-type'' we mean that every Lp-spectral multiplier for L is necessarily holomorphic in a complex neighborhood of some non-isolated point of the L2-spectrum of L. This can in fact only arise if the group algebra L1(G) is non-symmetric. Assume that p 2. For a point l in the dual g * of the Lie algebra g of G, we denote by (l)=Ad*(G)l the corresponding coadjoint orbit. We prove that every sub-Laplacian on G is of holomorphic Lp-type, provided there exists a point l∈ g * satisfying ``Boidol's condition'' (which is equivalent to the non-symmetry of L1(G)), such that the restriction of (l) to the nilradical of g is closed.

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