There have been many really positive results co ncerning the weakly compact operators on Banach lattices in terms of their order structure as well as in many respects. This paper will survey some known recent result...There have been many really positive results co ncerning the weakly compact operators on Banach lattices in terms of their order structure as well as in many respects. This paper will survey some known recent results in this area.展开更多
Abstract The main purpose of this article is to prove a collection of new nxea point theorems for (ws)-compact and so-called 1-set weakly contractive operators under Leray- Schauder boundary condition. We also intro...Abstract The main purpose of this article is to prove a collection of new nxea point theorems for (ws)-compact and so-called 1-set weakly contractive operators under Leray- Schauder boundary condition. We also introduce the concept of semi-closed operator at the origin and obtain a series of new fixed point theorems for such class of operators. As consequences, we get new fixed point existence for (ws)-compact (in particular nonexpansive) self mappings unbounded closed convex subset of Banach spaces. The main condition in our results is formulated in terms of axiomatic measures of weak noncompactness. Later on, we give an application to generalized Hammerstein type integral equations.展开更多
Let φ and ψ be linear fractional self\|maps of the unit disk D and X a separable Hilbert space. In this paper we completely characterize the weak compactness of the product operators of a composition operation C φ...Let φ and ψ be linear fractional self\|maps of the unit disk D and X a separable Hilbert space. In this paper we completely characterize the weak compactness of the product operators of a composition operation C φ with another one's adjoint C * ψ on the vector\|valued Bergman space B 1(X) for forms C φC * ψ and C * ψC φ.展开更多
Let φ be an analytic self-map of the complex unit disk and X a Banach space. This paper studies the action of composition operator Cφ: f→foφ on the vector-valued Nevanlinna classes N(X) and Na(X). Certain cri...Let φ be an analytic self-map of the complex unit disk and X a Banach space. This paper studies the action of composition operator Cφ: f→foφ on the vector-valued Nevanlinna classes N(X) and Na(X). Certain criteria for such operators to be weakly compact are given. As a consequence, this paper shows that the composition operator Cφ is weakly compact on N(X) and Na(X) if and only if it is weakly compact on the vector-valued Hardy space H^1 (X) and Bergman space B1(X) respectively.展开更多
In this paper we investigate the asymptotic spectrum and accumulation of a transport operator A in slab geometry with continuous energy, anisotropic scattering and inhomogeneous medium. In L^p (1 ≤ p 〈 +∞) space...In this paper we investigate the asymptotic spectrum and accumulation of a transport operator A in slab geometry with continuous energy, anisotropic scattering and inhomogeneous medium. In L^p (1 ≤ p 〈 +∞) space we show a series of new results for the asymptotic point spectrum and accumulation of A.展开更多
The spectrum of the transport operator A in a nonhomogeneous slab withcontinuous energy is discussed in consideration of anisotropic scattering and fission. Weshow the relative compactness of the perturbation K = A - ...The spectrum of the transport operator A in a nonhomogeneous slab withcontinuous energy is discussed in consideration of anisotropic scattering and fission. Weshow the relative compactness of the perturbation K = A - B, investigate the spectrumof A, especially obtain the essential spectrum and the asymptotic point spectrum in L1space which is the most natural space for the transport theory.展开更多
文摘There have been many really positive results co ncerning the weakly compact operators on Banach lattices in terms of their order structure as well as in many respects. This paper will survey some known recent results in this area.
文摘Abstract The main purpose of this article is to prove a collection of new nxea point theorems for (ws)-compact and so-called 1-set weakly contractive operators under Leray- Schauder boundary condition. We also introduce the concept of semi-closed operator at the origin and obtain a series of new fixed point theorems for such class of operators. As consequences, we get new fixed point existence for (ws)-compact (in particular nonexpansive) self mappings unbounded closed convex subset of Banach spaces. The main condition in our results is formulated in terms of axiomatic measures of weak noncompactness. Later on, we give an application to generalized Hammerstein type integral equations.
文摘Let φ and ψ be linear fractional self\|maps of the unit disk D and X a separable Hilbert space. In this paper we completely characterize the weak compactness of the product operators of a composition operation C φ with another one's adjoint C * ψ on the vector\|valued Bergman space B 1(X) for forms C φC * ψ and C * ψC φ.
文摘Let φ be an analytic self-map of the complex unit disk and X a Banach space. This paper studies the action of composition operator Cφ: f→foφ on the vector-valued Nevanlinna classes N(X) and Na(X). Certain criteria for such operators to be weakly compact are given. As a consequence, this paper shows that the composition operator Cφ is weakly compact on N(X) and Na(X) if and only if it is weakly compact on the vector-valued Hardy space H^1 (X) and Bergman space B1(X) respectively.
基金Foundation item: Zhejiang Provincial Natural Science Foundation (102002) of China.
文摘In this paper we investigate the asymptotic spectrum and accumulation of a transport operator A in slab geometry with continuous energy, anisotropic scattering and inhomogeneous medium. In L^p (1 ≤ p 〈 +∞) space we show a series of new results for the asymptotic point spectrum and accumulation of A.
文摘The spectrum of the transport operator A in a nonhomogeneous slab withcontinuous energy is discussed in consideration of anisotropic scattering and fission. Weshow the relative compactness of the perturbation K = A - B, investigate the spectrumof A, especially obtain the essential spectrum and the asymptotic point spectrum in L1space which is the most natural space for the transport theory.