Inverse-closedness of weighted Schur and BGS type quasi-Banach algebras
Abstract
We prove that the weighted quasi-Banach algebras of operator valued matrices satisfying Schur and Baskakov-Gohberg-Sj\"ostrand (BGS) conditions are inverse-closed in the Banach algebra B(2(X,H)) whenever the weight is admissible, where H is a Hilbert space and X is a relatively separated subset of Rd. Furthermore, we identify the Gel'fand space of weighted infinite variable group algebra pω(ZN) for 0<p≤1, and establish inverse-closedness of infinite variable analogue of BGS-type algebra in B(2(ZN,H)).
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