The paper introduces the notion of properties $(Z_{\Pi_a})$ and $(Z_{E_a})$ as variants of Weyl's theorem and Browder's theorem for bounded linear operators acting on infinite dimensional Banach spaces. A characterization of these properties in terms of localized single valued extension property is given, and the perturbation by commuting Riesz operators is also studied. Classes of operators are considered as illustrating examples.
Further common local spectral properties for bounded linear operators
A note on the common spectral properties for bounded linear operators
Approximate Birkhoff-James orthogonality in the space of bounded linear operators
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