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 On maps preserving the spectrum of the skew Lie product of operators

 الزيداني، إيمان شايع محمد


//uquui/handle/20.500.12248/117158
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On maps preserving the spectrum of the skew Lie product of operators

Alternative : الدوال التي تحافظ على ضرب لي للمؤثرات الخطية على فضاء هيلبرت المركب
Call Number : 23777
Publisher :جامعة أم القرى
Pub Place : مكة المكرمة
Issue Date : 2020 - 1441 H
Description : 38 ورقة.
Format : ماجستير
Subjects : Mathematics ؛
Language : انجليزي
Is format of : مكتبة الملك عبدالله بن عبدالعزيز الجامعية

problem of describing maps on operators and matrices that preserve certain functions, subsets and relations has been widely studied in the literature, see [7], [9], [10], [11], [14], [15], [16], [17], [23], [29], [30], [32], [33] and their references therein. One of the classical problems in this area of research is to characterize maps preserving the spectra of the product of operators. Moln´ar in [29] studied maps preserving the spectrum of operator and matrix products. His results have been extended in several directions [8], [1], [2], [12], [13], [19], [21], [22], [24] and [25]. In [2], the problem of characterizing maps between matrix algebras preserving the spectrum of polynomial products of matrices is considered. In particular, the results obtained therein extend and unify several results obtained in [11] and [13]. Let H and K be two complex infinite dimensional Hilbert spaces. Let B(H) (resp. B(K)) denote the algebra of all bounded linear operators on H (resp. on K ). We say that a map ϕ : B(H) →B(K) preserves the skew Lie product of operators if [ϕ(T),ϕ(S)] ∗ = [T,S] ∗ where [T,S] ∗ = TS −ST∗ for any operators S,T ∈B(H). Latter in [1], the form of all maps preserving the spectrum and the local spectrum of skew Lie product of matrices are determined. In this thesis we will examine the form of surjective maps preserving the spectrum of skew Lie product of operators

Title: On maps preserving the spectrum of the skew Lie product of operators
Other Titles: الدوال التي تحافظ على ضرب لي للمؤثرات الخطية على فضاء هيلبرت المركب
Authors: المبروك، محمد صالح
الزيداني، إيمان شايع محمد
Subjects :: Mathematics
Issue Date :: 2020
Publisher :: جامعة أم القرى
Abstract: problem of describing maps on operators and matrices that preserve certain functions, subsets and relations has been widely studied in the literature, see [7], [9], [10], [11], [14], [15], [16], [17], [23], [29], [30], [32], [33] and their references therein. One of the classical problems in this area of research is to characterize maps preserving the spectra of the product of operators. Moln´ar in [29] studied maps preserving the spectrum of operator and matrix products. His results have been extended in several directions [8], [1], [2], [12], [13], [19], [21], [22], [24] and [25]. In [2], the problem of characterizing maps between matrix algebras preserving the spectrum of polynomial products of matrices is considered. In particular, the results obtained therein extend and unify several results obtained in [11] and [13]. Let H and K be two complex infinite dimensional Hilbert spaces. Let B(H) (resp. B(K)) denote the algebra of all bounded linear operators on H (resp. on K ). We say that a map ϕ : B(H) →B(K) preserves the skew Lie product of operators if [ϕ(T),ϕ(S)] ∗ = [T,S] ∗ where [T,S] ∗ = TS −ST∗ for any operators S,T ∈B(H). Latter in [1], the form of all maps preserving the spectrum and the local spectrum of skew Lie product of matrices are determined. In this thesis we will examine the form of surjective maps preserving the spectrum of skew Lie product of operators
Description :: 38 ورقة.
URI: https://dorar.uqu.edu.sa/uquui/handle/20.500.12248/117158
Appears in Collections :الرسائل العلمية المحدثة

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