English

Invertibility of convolution operators on homogeneous groups

Functional Analysis 2010-09-17 v2

Abstract

We say that a tempered distribution AA belongs to the class Sm(\Ge)S^m(\Ge) on a homogeneous Lie algebra \Ge\Ge if its Abelian Fourier transform a=A^a=\hat{A} is a smooth function on the dual \Ges\Ges and satisfies the estimates Dαa(ξ)Cα(1+ξ)mα. |D^{\alpha}a(\xi)|\le C_{\alpha}(1+|\xi|)^{m-|\alpha|}. Let AS0(\Ge)A\in S^0(\Ge). Then the operator ffA~(x)f\mapsto f\star\widetilde{A}(x) is bounded on L2(\Ge)L^2(\Ge). Suppose that the operator is invertible and denote by BB the convolution kernel of its inverse. We show that BB belongs to the class S0(\Ge)S^0(\Ge) as well. As a corollary we generalize Melin's theorem on the parametrix construction for Rockland operators.

Keywords

Cite

@article{arxiv.1007.1429,
  title  = {Invertibility of convolution operators on homogeneous groups},
  author = {Pawel Glowacki},
  journal= {arXiv preprint arXiv:1007.1429},
  year   = {2010}
}

Comments

17 pages, see also http://www.math.uni.wroc.pl/~glowacki

R2 v1 2026-06-21T15:46:05.598Z