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Decomposition of the (n, ϵ) -pseudospectrum of an element of a Banach algebra
K. Dhara,
Published in Birkhauser
2020
Volume: 5
   
Issue: 1
Pages: 248 - 260
Abstract
Let A be a complex Banach algebra with unit. For an integer n≥ 0 and ϵ> 0 , the (n, ϵ) -pseudospectrum of a∈ A is defined by Λn,ϵ(A,a):={λ∈C:(λ-a)is not invertible inAor‖(λ-a)-2n‖1/2n≥1ϵ}.Let p∈ A be a nontrivial idempotent. Then pAp= { pbp: b∈ A} is a Banach subalgebra of A with unit p, known as a reduced Banach algebra. Suppose ap= pa. We study the relationship of Λn , ϵ(A, a) and Λn , ϵ(pAp, pa). We extend this by considering first a finite family, and then an at most countable family of idempotents satisfying some conditions. We establish that under suitable assumptions, the (n, ϵ) -pseudospectrum of a can be decomposed into the union of the (n, ϵ) -pseudospectra of some elements in reduced Banach algebras. © 2019, Tusi Mathematical Research Group (TMRG).
About the journal
JournalAdvances in Operator Theory
PublisherBirkhauser
ISSN2538225X