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