: We consider an approximation problem related to strongly irreducible operators, that is, does the direct sum of a strongly irreducible operator in B∞(Ω) and certain operator have a small compact perturbation wh...: We consider an approximation problem related to strongly irreducible operators, that is, does the direct sum of a strongly irreducible operator in B∞(Ω) and certain operator have a small compact perturbation which is a strongly irreducible operator in B∞(Ω)? In this paper, we prove that the direct sum of any strongly irreducible operator in B∞(Ω) and certain biquasitriangular operator have small compact perturbations which are strongly irreducible operators in B∞(Ω).展开更多
It is proved that a system under compact perturbation cannot be uniformly exponentially stable for an isometric C0-semigroup or a C0-group with polynomial growth for negative time in a Banach space. The results extend...It is proved that a system under compact perturbation cannot be uniformly exponentially stable for an isometric C0-semigroup or a C0-group with polynomial growth for negative time in a Banach space. The results extend and improve the corresponding results of previous literature.展开更多
Let н be a complex, separable, infinite dimensional Hilbert space, T ε(H). (u+K)(T) denotes the (u+k)-orbit of T, i.e., (u+k)(T) = {R-1TR: R is invertible and of the form unitary plus compact}...Let н be a complex, separable, infinite dimensional Hilbert space, T ε(H). (u+K)(T) denotes the (u+k)-orbit of T, i.e., (u+k)(T) = {R-1TR: R is invertible and of the form unitary plus compact}. Let be an analytic and simply connected Cauchy domain in C and n ε N. A(, n) denotes the class of operators, each of which satisfies (i) T is essentially normal; (ii) σ(T) =, ρF(T) ∩ σ(T) = ; (iii) ind (λ-T) = -n, nul (λ-T) = 0 (λ∈Ω ). It is proved that given T1, T2 ε A(, n) and ε > 0, there exists a compact operator K with K <ε such that T1 +Kε (u+k)(T2). This result generalizes a result of P. S. Guinand and L. Marcoux [6,15]. Furthermore, the authors give a character of the norm closure of (u+K)(T), and prove that for each T ε A(, n), there exists a compact (SI) perturbation of T whose norm can be arbitrarily small.展开更多
This paper gives the concepts of finite dimensional irreducible operators((FDI) operators)and infinite dimensional irreducible operators((IDI) operators). Discusses the relationships of(FDI)operators,(IDI)...This paper gives the concepts of finite dimensional irreducible operators((FDI) operators)and infinite dimensional irreducible operators((IDI) operators). Discusses the relationships of(FDI)operators,(IDI) operators and strongly irreducible operators((SI) operators) and illustrates some properties of the three classes of operators. Some sufficient conditions for the finite-dimensional irreducibility of operators which have the forms of upper triangular operator matrices are given. This paper proves that every operator with a singleton spectrum is a small compact perturbation of an(FDI) operator on separable Banach spaces and shows that every bounded linear operator T can be approximated by operators in(Σ FDI)(X) with respect to the strong-operator topology and every compact operator K can be approximated by operators in(Σ FDI)(X) with respect to the norm topology on a Banach space X with a Schauder basis, where(ΣFDI)(X) := {T∈B(X) : T=Σki=1Ti, Ti ∈(FDI), k ∈ N}.展开更多
A bounded linear operator T acting on a Hilbert space is called Coburn operator if ker(T-λ) = {0} or ker(T-λ)*= {0} for each λ∈ C. In this paper, the authors define other Coburn type properties for Hilbert space o...A bounded linear operator T acting on a Hilbert space is called Coburn operator if ker(T-λ) = {0} or ker(T-λ)*= {0} for each λ∈ C. In this paper, the authors define other Coburn type properties for Hilbert space operators and investigate the compact perturbations of operators with Coburn type properties. They characterize those operators for which has arbitrarily small compact perturbation to have some fixed Coburn property.Moreover, they study the stability of these properties under small compact perturbations.展开更多
Stability of infinite matrices has important applications to spline approximation, wavelets, Gabor time-frequency analysis, etc. In this paper, perturbation analysis for convolution dominated infinite matrices was stu...Stability of infinite matrices has important applications to spline approximation, wavelets, Gabor time-frequency analysis, etc. In this paper, perturbation analysis for convolution dominated infinite matrices was studied by introducing an idea of lp-stability at infinity. For infinite matrices in the Gohberg-Baskakov-Sjostrand class, a practical criterion for the lp-stability at infinity of convolution dominated infinite matrices on Zd under perturbation of compact operators was given.展开更多
In the present paper, by virtue of new approch techniques, we obtain several mapping theorems involving compact perturbations of m—accretive operators.These results improve and extend the corresponding those obtained...In the present paper, by virtue of new approch techniques, we obtain several mapping theorems involving compact perturbations of m—accretive operators.These results improve and extend the corresponding those obtained by Kartsatos,Zhu, and Kartsatos and Mabry.展开更多
Abstract A Hilbert space operator T is said to have property (ω1) if σα(T)/σaw(T) π00(T), where σα(T) andσαw(T) denote the approximate point spectrum and the Weyl essential approximate point sp...Abstract A Hilbert space operator T is said to have property (ω1) if σα(T)/σaw(T) π00(T), where σα(T) andσαw(T) denote the approximate point spectrum and the Weyl essential approximate point spectrum of T respectively, and π00(T) ---- {λ∈ iso σ(T), 0 〈 dim N(T- λI) 〈 ∞}. Ifσα(T)/σαw(T) = π00(T), we say T satisfies property (w). In this note, we investigate the stability of the property (wi) and the property (w) under compact perturbations, and we characterize those operators for which the property (wi) and the property (w) are stable under compact perturbations.展开更多
The authors characterize the (U+K) orbits of a class essentially normal operators and prove that some essentially normal operators with connected spectrum are strongly irreducible after a small compact perturbation....The authors characterize the (U+K) orbits of a class essentially normal operators and prove that some essentially normal operators with connected spectrum are strongly irreducible after a small compact perturbation. This partially answers a question of Domigo A. Herrero.展开更多
基金The Specialized Research Fund (20050183002) for the Doctoral Program of Higher Educationthe NNSF (10371049 and J0630104) of China.
文摘: We consider an approximation problem related to strongly irreducible operators, that is, does the direct sum of a strongly irreducible operator in B∞(Ω) and certain operator have a small compact perturbation which is a strongly irreducible operator in B∞(Ω)? In this paper, we prove that the direct sum of any strongly irreducible operator in B∞(Ω) and certain biquasitriangular operator have small compact perturbations which are strongly irreducible operators in B∞(Ω).
基金Project of Sichuan Provincial Science and Technology Department (No.2007J13-006)
文摘It is proved that a system under compact perturbation cannot be uniformly exponentially stable for an isometric C0-semigroup or a C0-group with polynomial growth for negative time in a Banach space. The results extend and improve the corresponding results of previous literature.
文摘Let н be a complex, separable, infinite dimensional Hilbert space, T ε(H). (u+K)(T) denotes the (u+k)-orbit of T, i.e., (u+k)(T) = {R-1TR: R is invertible and of the form unitary plus compact}. Let be an analytic and simply connected Cauchy domain in C and n ε N. A(, n) denotes the class of operators, each of which satisfies (i) T is essentially normal; (ii) σ(T) =, ρF(T) ∩ σ(T) = ; (iii) ind (λ-T) = -n, nul (λ-T) = 0 (λ∈Ω ). It is proved that given T1, T2 ε A(, n) and ε > 0, there exists a compact operator K with K <ε such that T1 +Kε (u+k)(T2). This result generalizes a result of P. S. Guinand and L. Marcoux [6,15]. Furthermore, the authors give a character of the norm closure of (u+K)(T), and prove that for each T ε A(, n), there exists a compact (SI) perturbation of T whose norm can be arbitrarily small.
基金Supported by National Natural Science Foundation of China(Grant Nos.11401101,11201071 and 11171066)Fujian Natural Science Foundation(Grant No.2013J05004)Foundation of Fuzhou University(Grant Nos.2013-XQ-33 and XRC-1259)
文摘This paper gives the concepts of finite dimensional irreducible operators((FDI) operators)and infinite dimensional irreducible operators((IDI) operators). Discusses the relationships of(FDI)operators,(IDI) operators and strongly irreducible operators((SI) operators) and illustrates some properties of the three classes of operators. Some sufficient conditions for the finite-dimensional irreducibility of operators which have the forms of upper triangular operator matrices are given. This paper proves that every operator with a singleton spectrum is a small compact perturbation of an(FDI) operator on separable Banach spaces and shows that every bounded linear operator T can be approximated by operators in(Σ FDI)(X) with respect to the strong-operator topology and every compact operator K can be approximated by operators in(Σ FDI)(X) with respect to the norm topology on a Banach space X with a Schauder basis, where(ΣFDI)(X) := {T∈B(X) : T=Σki=1Ti, Ti ∈(FDI), k ∈ N}.
基金supported by the National Natural Science Foundation of China(Nos.11901035,11901230)。
文摘A bounded linear operator T acting on a Hilbert space is called Coburn operator if ker(T-λ) = {0} or ker(T-λ)*= {0} for each λ∈ C. In this paper, the authors define other Coburn type properties for Hilbert space operators and investigate the compact perturbations of operators with Coburn type properties. They characterize those operators for which has arbitrarily small compact perturbation to have some fixed Coburn property.Moreover, they study the stability of these properties under small compact perturbations.
基金National Natural Science Foundation of China(No.10971023)Fundamental Research Funds for the Central Universities of China
文摘Stability of infinite matrices has important applications to spline approximation, wavelets, Gabor time-frequency analysis, etc. In this paper, perturbation analysis for convolution dominated infinite matrices was studied by introducing an idea of lp-stability at infinity. For infinite matrices in the Gohberg-Baskakov-Sjostrand class, a practical criterion for the lp-stability at infinity of convolution dominated infinite matrices on Zd under perturbation of compact operators was given.
文摘In the present paper, by virtue of new approch techniques, we obtain several mapping theorems involving compact perturbations of m—accretive operators.These results improve and extend the corresponding those obtained by Kartsatos,Zhu, and Kartsatos and Mabry.
基金Supported by the Fundamental Research Funds for the Central Universities(Grant No.GK201301007)National Natural Science Foundation of China(Grant No.11371012)
文摘Abstract A Hilbert space operator T is said to have property (ω1) if σα(T)/σaw(T) π00(T), where σα(T) andσαw(T) denote the approximate point spectrum and the Weyl essential approximate point spectrum of T respectively, and π00(T) ---- {λ∈ iso σ(T), 0 〈 dim N(T- λI) 〈 ∞}. Ifσα(T)/σαw(T) = π00(T), we say T satisfies property (w). In this note, we investigate the stability of the property (wi) and the property (w) under compact perturbations, and we characterize those operators for which the property (wi) and the property (w) are stable under compact perturbations.
文摘The authors characterize the (U+K) orbits of a class essentially normal operators and prove that some essentially normal operators with connected spectrum are strongly irreducible after a small compact perturbation. This partially answers a question of Domigo A. Herrero.
