Invertibility properties of operator matrices on Hilbert spaces

Abstract

Denote by Tnd(A) an upper triangular operator matrix of dimension n whose diagonal entries are given and the others are unknown. In this article we provide necessary and sufficient conditions for various types of Fredholm and Weyl completions of Tnd(A). As consequences, we get corrected perturbation results of Wu et al. (2020). In the special case n=2, we recover many already existing known results, and specially we correct results of Zhang et al. (2012). Finally, in the case of essential Fredholm invertibility, in the special case n=2 we obtain some results that seem new in the literature. Our method is based on the space decomposition technique, similarly to the work of Huang et al. (2019), but our approach extends to arbitrary dimension n≥2.

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