Abstract
The classes of band-dominated operators and the subclass of operators in the Wiener algebra {mathcal {W}} are known to be inverse closed. This paper studies and extends partially known results of that type for one-sided and generalized invertibility. Furthermore, for the operators in the Wiener algebra {mathcal {W}} invertibility, the Fredholm property and the Fredholm index are known to be independent of the underlying space l^p, 1le ple infty . Here this is completed by the observation that even the kernel and a suitable direct complement of the range as well as generalized inverses of operators in {mathcal {W}} are invariant w.r.t. p.
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