H stability is a new and important concept. In this paper,we discuss the equationx(t)=-a(t)x(t)+∫ t -∞ k(t,s-t,x(s)) d sand we gain a new decision theorem. Using this decision theorem,we obtained a very extensive re...H stability is a new and important concept. In this paper,we discuss the equationx(t)=-a(t)x(t)+∫ t -∞ k(t,s-t,x(s)) d sand we gain a new decision theorem. Using this decision theorem,we obtained a very extensive result of the H uniformly asymptotical stability of this equation. That is,eliminating the restriction that a(t) is bounded.展开更多
For the H-nonlinear equation systems produced by stiff nonlinear function f(y): y ∈ Rm→Rm, the paper presents a new Newton-like iterative so- lution method: completely-square method, establishes its convergence theo...For the H-nonlinear equation systems produced by stiff nonlinear function f(y): y ∈ Rm→Rm, the paper presents a new Newton-like iterative so- lution method: completely-square method, establishes its convergence theory and offers four simple algorithms for approximate calculation of optimum iterative pa- rameter in this method. The iterative method do not need to compute(f’)2, and LU-decomposition only need to be done for some m × m matrix. Numerical examples show that if appropriate approximate optimum iterative parameter is selected on the coefficients in the hybrid method that products the H-nonlinear equation systems then the iterative solution method in the paper is high efficiency.展开更多
The oscillations of a class of vector parabolic partial differential equations with continuous distribution arguments are studied.By employing the concept of H-oscillation and the method of reducing dimension with inn...The oscillations of a class of vector parabolic partial differential equations with continuous distribution arguments are studied.By employing the concept of H-oscillation and the method of reducing dimension with inner product,the multi-dimensional oscillation problems are changed into the problems of which one-dimensional functional differential inequalities have not eventually positive solution.Some new sufficient conditions for the H-oscillation of all solutions of the equations are obtained under Dirichlet boundary condition,where H is a unit vector of RM.展开更多
As for the backward and forward equation of nonhomogeneous(H, Q) -processes,we proof them in a new way. On the base of that, this paper gives the direct computational formalfor one dimensional distribution of the nonh...As for the backward and forward equation of nonhomogeneous(H, Q) -processes,we proof them in a new way. On the base of that, this paper gives the direct computational formalfor one dimensional distribution of the nonhomogeneous(H, Q) -process.展开更多
Let H be an arbitrary Hopf algebra over a field k. In this paper, at first wedeal with the relationship between solutions to the Yang-Baxter equation and quantumYang-Baxter H-comodules; then we use the results to give...Let H be an arbitrary Hopf algebra over a field k. In this paper, at first wedeal with the relationship between solutions to the Yang-Baxter equation and quantumYang-Baxter H-comodules; then we use the results to give a solution to the Yang-Baxterequation over H.展开更多
The generalized binary Darboux transformation for the (1 +2)-dimensional non-isospectral KP-H equation is presented. Moreover, as a direct application, the new rogue wave solutions for the (1+2)-dimensional non-...The generalized binary Darboux transformation for the (1 +2)-dimensional non-isospectral KP-H equation is presented. Moreover, as a direct application, the new rogue wave solutions for the (1+2)-dimensional non-isospectral KP-II equation are constructed by the generalized binary Darboux transformation.展开更多
文摘H stability is a new and important concept. In this paper,we discuss the equationx(t)=-a(t)x(t)+∫ t -∞ k(t,s-t,x(s)) d sand we gain a new decision theorem. Using this decision theorem,we obtained a very extensive result of the H uniformly asymptotical stability of this equation. That is,eliminating the restriction that a(t) is bounded.
文摘For the H-nonlinear equation systems produced by stiff nonlinear function f(y): y ∈ Rm→Rm, the paper presents a new Newton-like iterative so- lution method: completely-square method, establishes its convergence theory and offers four simple algorithms for approximate calculation of optimum iterative pa- rameter in this method. The iterative method do not need to compute(f’)2, and LU-decomposition only need to be done for some m × m matrix. Numerical examples show that if appropriate approximate optimum iterative parameter is selected on the coefficients in the hybrid method that products the H-nonlinear equation systems then the iterative solution method in the paper is high efficiency.
基金Supported by the Science Research Foundation of Administration of Education of Hunan Province(07C164)
文摘The oscillations of a class of vector parabolic partial differential equations with continuous distribution arguments are studied.By employing the concept of H-oscillation and the method of reducing dimension with inner product,the multi-dimensional oscillation problems are changed into the problems of which one-dimensional functional differential inequalities have not eventually positive solution.Some new sufficient conditions for the H-oscillation of all solutions of the equations are obtained under Dirichlet boundary condition,where H is a unit vector of RM.
文摘As for the backward and forward equation of nonhomogeneous(H, Q) -processes,we proof them in a new way. On the base of that, this paper gives the direct computational formalfor one dimensional distribution of the nonhomogeneous(H, Q) -process.
文摘Let H be an arbitrary Hopf algebra over a field k. In this paper, at first wedeal with the relationship between solutions to the Yang-Baxter equation and quantumYang-Baxter H-comodules; then we use the results to give a solution to the Yang-Baxterequation over H.
基金Supported by the National Natural Science Foundation of China under Grant No. 11061003 and Guangxi Natural Science Foundation under Grant No. 2013GXNSFAA019001
文摘The generalized binary Darboux transformation for the (1 +2)-dimensional non-isospectral KP-H equation is presented. Moreover, as a direct application, the new rogue wave solutions for the (1+2)-dimensional non-isospectral KP-II equation are constructed by the generalized binary Darboux transformation.
