Inverse-Closedness of a Banach Algebra of Integral Operators on the Heisenberg Group
Abstract
Let H be the general, reduced Heisenberg group. Our main result establishes the inverse-closedness of a class of integral operators acting on Lp(H), given by the off-diagonal decay of the kernel. As a consequence of this result, we show that if α1I+Sf, where Sf is the operator given by convolution with f, f∈ L1v(H), is invertible in (Lp(H)), then (α1I+Sf)-1=α2I+Sg, and g∈ L1v(H)$. We prove analogous results for twisted convolution operators and apply the latter results to a class of Weyl pseudodifferential operators. We briefly discuss relevance to mobile communications.
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