Wiener pairs of Banach algebras of operator-valued matrices
Abstract
In this article we introduce several new examples of Wiener pairs A ⊂eq B, where B = B(2(X;H)) is the Banach algebra of bounded operators acting on the Hilbert space-valued Bochner sequence space 2(X;H) and A = A(X) is a Banach algebra consisting of operator-valued matrices indexed by some relatively separated set X ⊂ Rd. In particular, we introduce B(H)-valued versions of the Jaffard algebra, of certain weighted Schur-type algebras, of Banach algebras which are defined by more general off-diagonal decay conditions than polynomial decay, of weighted versions of the Baskakov-Gohberg-Sj\"ostrand algebra, and of anisotropic variations of all of these matrix algebras, and show that they are inverse-closed in B(2(X;H)). In addition, we obtain that each of these Banach algebras is symmetric.
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