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Spectrum Perturbations of Linear Operators in a Banach Space

Michael Gil’ ()
Additional contact information
Michael Gil’: Ben Gurion University of the Negev

A chapter in Mathematical Analysis in Interdisciplinary Research, 2021, pp 297-333 from Springer

Abstract: Abstract This chapter is a survey of the recent results of the author on the spectrum perturbations of linear operators in a Banach space. It consists of three parts. In the first part, for an integer p ≥ 1, we introduce the approximative quasi-normed ideal Γ p of compact operators A with a quasi-norm N Γ p ( . ) $$N_{\varGamma _p}(.)$$ and the property ∑ k | λ k ( A ) | p ≤ a p N Γ p p ( A ) $$\sum _k |\lambda _k(A)|{ }^p\le a_p N_{\varGamma _p}^p(A)$$ , where λ k(A) (k = 1, 2, …) are the eigenvalues of A and a p is a constant independent of A. Let I be the unit operator. Assuming that A ∈ Γ p and I − Ap is boundedly invertible, we obtain invertibility conditions for perturbed operators. Applications of these conditions to the spectrum perturbations of absolutely p-summing and absolutely (p, 2) summing operators are also discussed. As examples, in the first part of the chapter, we consider the Hille–Tamarkin integral operators and Hille–Tamarkin infinite matrices. The second part of the chapter deals with the ideal of nuclear operators A in a Banach space satisfying the condition ∑k x k(A)

Keywords: Banach space; Linear operators; Compact operators; Perturbations; Absolutely p-summing operators; Absolutely (p; 2)-summing operators; Integral operators; Infinite matrices; Resolvent; Determinant; Invariant projections; 47A10; 47A55; 47B10; 47A75; 47G10; 47A11; 47A30 (search for similar items in EconPapers)
Date: 2021
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Persistent link: https://EconPapers.repec.org/RePEc:spr:spochp:978-3-030-84721-0_16

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DOI: 10.1007/978-3-030-84721-0_16

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