Let fj M (j = 1, 2, …, m; m1) and %f be the skew product associated with the generator system {f1, f2, …, fm}. Then F(%f) is completely invariant under (%f); J(%f) is completely invariant under%f; J(%f) is perfect;...Let fj M (j = 1, 2, …, m; m1) and %f be the skew product associated with the generator system {f1, f2, …, fm}. Then F(%f) is completely invariant under (%f); J(%f) is completely invariant under%f; J(%f) is perfect; J(%f) has interior points if and only if F(%f) =; if fj MAp (p5), j = 1, 2, …, m, then the set of the repelling fixed points of%fof all orders are dense in J(%f).展开更多
Let A be a factor von Neumann algebra and Ф be a nonlinear surjective map from A onto itself. We prove that, if Ф satisfies that Ф(A)Ф(B) - Ф(B)Ф(A)* -- AB - BA* for all A, B ∈ A, then there exist a l...Let A be a factor von Neumann algebra and Ф be a nonlinear surjective map from A onto itself. We prove that, if Ф satisfies that Ф(A)Ф(B) - Ф(B)Ф(A)* -- AB - BA* for all A, B ∈ A, then there exist a linear bijective map ψA →A satisfying ψ(A)ψ(B) - ψ(B)ψ(A)* = AB - BA* for A, B ∈ A and a real functional h on A with h(0) -= 0 such that Ф(A) = ψ(A) + h(A)I for every A ∈ A. In particular, if .4 is a type I factor, then, Ф(A) = cA + h(A)I for every A ∈ .4, where c = ±1.展开更多
Let K<sup>n×n</sup> be the set of all n×n matrices and K<sub>r</sub><sup>n×n</sup> the set {A∈K<sup>n×n</sup>|rankA=r} on askew field K. Zhuang [1] ...Let K<sup>n×n</sup> be the set of all n×n matrices and K<sub>r</sub><sup>n×n</sup> the set {A∈K<sup>n×n</sup>|rankA=r} on askew field K. Zhuang [1] denotes by A<sup>#</sup> the group inverse of A∈K<sup>n×n</sup> which is the solu-tion of the euqations:AXA=A, XAX=X, AX=AX.展开更多
In this paper we study a matrix equation AX+BX=C (Ⅰ)over an arbitrary skew field,and give a consistency criterion of (Ⅰ) and an explicit expression of general solutions of (Ⅰ).A convenient,simple and practi...In this paper we study a matrix equation AX+BX=C (Ⅰ)over an arbitrary skew field,and give a consistency criterion of (Ⅰ) and an explicit expression of general solutions of (Ⅰ).A convenient,simple and practical method of solving (Ⅰ) is also given.As a particular case,we also give a simple method of finding a system of fundamental solutions of a homogeneous system of right linear equations over a skew field.展开更多
Some basic equations and the relations among various Markov chains are established. These works are the bases in the investigation of the theory of Markov chain in random environment.
A general formulation of the stochastic model for random walk in time-random environment and an equivalent definition is established in this paper. Moreover, some basic probability relations similar to the classical c...A general formulation of the stochastic model for random walk in time-random environment and an equivalent definition is established in this paper. Moreover, some basic probability relations similar to the classical case which are very useful in the corresponding research of fractal properties are given. At the end, a typical example is provided to show the recurrence and transience. Key words random environment - random walk in timerandom environment - skew product Markov chain CLC number O 211.6 Foudation item: Supported by the National Natural Science Foundation of China (10371092) and Foundation of Wuhan University.Biography: Zhang Xiao-min (1977-), male, Ph. D candidate, research direction: stochastic processes and random fractal.展开更多
文摘Let fj M (j = 1, 2, …, m; m1) and %f be the skew product associated with the generator system {f1, f2, …, fm}. Then F(%f) is completely invariant under (%f); J(%f) is completely invariant under%f; J(%f) is perfect; J(%f) has interior points if and only if F(%f) =; if fj MAp (p5), j = 1, 2, …, m, then the set of the repelling fixed points of%fof all orders are dense in J(%f).
基金supported by National Natural Science Foundation of China(10871111)the Specialized Research Fund for Doctoral Program of Higher Education(200800030059)(to Cui)Basic Science Research Program through the National Research Foundation of Korea funded by the Ministry of Education,Science and Technology(NRF-2009-0070788)(to Park)
文摘Let A be a factor von Neumann algebra and Ф be a nonlinear surjective map from A onto itself. We prove that, if Ф satisfies that Ф(A)Ф(B) - Ф(B)Ф(A)* -- AB - BA* for all A, B ∈ A, then there exist a linear bijective map ψA →A satisfying ψ(A)ψ(B) - ψ(B)ψ(A)* = AB - BA* for A, B ∈ A and a real functional h on A with h(0) -= 0 such that Ф(A) = ψ(A) + h(A)I for every A ∈ A. In particular, if .4 is a type I factor, then, Ф(A) = cA + h(A)I for every A ∈ .4, where c = ±1.
基金This work is Supported by NSF of Heilongjiang Provice
文摘Let K<sup>n×n</sup> be the set of all n×n matrices and K<sub>r</sub><sup>n×n</sup> the set {A∈K<sup>n×n</sup>|rankA=r} on askew field K. Zhuang [1] denotes by A<sup>#</sup> the group inverse of A∈K<sup>n×n</sup> which is the solu-tion of the euqations:AXA=A, XAX=X, AX=AX.
文摘In this paper we study a matrix equation AX+BX=C (Ⅰ)over an arbitrary skew field,and give a consistency criterion of (Ⅰ) and an explicit expression of general solutions of (Ⅰ).A convenient,simple and practical method of solving (Ⅰ) is also given.As a particular case,we also give a simple method of finding a system of fundamental solutions of a homogeneous system of right linear equations over a skew field.
基金the National Natural Science Foundation of China(10 0 710 5 8-2 ) and Doctoral Programme Foundationof China
文摘Some basic equations and the relations among various Markov chains are established. These works are the bases in the investigation of the theory of Markov chain in random environment.
文摘A general formulation of the stochastic model for random walk in time-random environment and an equivalent definition is established in this paper. Moreover, some basic probability relations similar to the classical case which are very useful in the corresponding research of fractal properties are given. At the end, a typical example is provided to show the recurrence and transience. Key words random environment - random walk in timerandom environment - skew product Markov chain CLC number O 211.6 Foudation item: Supported by the National Natural Science Foundation of China (10371092) and Foundation of Wuhan University.Biography: Zhang Xiao-min (1977-), male, Ph. D candidate, research direction: stochastic processes and random fractal.