In this paper the conformal invariance by infinitesimal transformations of first order Lagrange systems is discussed in detail. The necessary and sufficient conditions of conformal invariance and Lie symmetry simultan...In this paper the conformal invariance by infinitesimal transformations of first order Lagrange systems is discussed in detail. The necessary and sufficient conditions of conformal invariance and Lie symmetry simultaneously by the action of infinitesimal transformations are given. Then it gets the Hojman conserved quantities of conformal invariance by the infinitesimal transformations. Finally an example is given to illustrate the application of the results.展开更多
The purpose of this paper is to study the existence and iterative approximation of minimax quasi-solutions for a class of initial value problems of first order impulsive differential systems by using monotone iterativ...The purpose of this paper is to study the existence and iterative approximation of minimax quasi-solutions for a class of initial value problems of first order impulsive differential systems by using monotone iterative methods.展开更多
It is important to study the propagation and interaction of progressing waves of nonlinear equations in the class of piecewise smooth function. However, there has not been many works on that in multidimensional case. ...It is important to study the propagation and interaction of progressing waves of nonlinear equations in the class of piecewise smooth function. However, there has not been many works on that in multidimensional case. In 1985, J, Rauch & M. Reed have provad the existence and uniqueness of piecewise smooth solution for展开更多
Exponential stability of the first order singular distributed parameter systems is discussedin the light of degenerate semi-group methods,which is described by the abstract developing equationin Hilbert space.The nece...Exponential stability of the first order singular distributed parameter systems is discussedin the light of degenerate semi-group methods,which is described by the abstract developing equationin Hilbert space.The necessary and sufficient conditions concerning the exponential stability of thefirst order singular distributed parameter systems are given.展开更多
In this paper we consider the first order discrete Hamiltonian systems {x1(n+1)-x1(n)=Hx2(n,x(n)),x2(n)-x2(n-1)=Hx1(n,x(n)),where x(n) = (x2(n)x1(n))∑ R^2N, H(n,z) = 1/2S(n)z. z + R(n,z...In this paper we consider the first order discrete Hamiltonian systems {x1(n+1)-x1(n)=Hx2(n,x(n)),x2(n)-x2(n-1)=Hx1(n,x(n)),where x(n) = (x2(n)x1(n))∑ R^2N, H(n,z) = 1/2S(n)z. z + R(n,z) is periodic in n and superlinear as {z} →4 ∞. We prove the existence and infinitely many (geometrically distinct) homoclonic orbits of the system by critical point theorems for strongly indefinite functionals.展开更多
In this paper,a discontinuous finite element method for the positive and symmetric,first-order hyperbolic systems(steady and nonsteady state)is constructed and analyzed by using linear triangle elements,and the O(h^2)...In this paper,a discontinuous finite element method for the positive and symmetric,first-order hyperbolic systems(steady and nonsteady state)is constructed and analyzed by using linear triangle elements,and the O(h^2)-order optimal error estimates are derived under the assumption of strongly regular triangulation and the Ha-regularity for the exact solutions.The convergence analysis is based on some superclose estimates of the interpolation approximation.Finally,we discuss the Maxwell equations in a two-dimensional domain,and numerical experiments are given to validate the theoretical results.展开更多
Lipschitz continuous solutions to the Cauchy problem for 1-D first order quasi-linear hyperbolic systems are considered. Based on the methods of approximation and integral equations, the author gives two definitions o...Lipschitz continuous solutions to the Cauchy problem for 1-D first order quasi-linear hyperbolic systems are considered. Based on the methods of approximation and integral equations, the author gives two definitions of Lipschitz solutions to the Cauchy problem and proves the existence and uniqueness of solutions.展开更多
基金supported by the National Natural Science Foundation of China (Grant Nos 10372053,10572021 and 10772025)the National Natural Science Foundation of Henan province of China(Grant No 0311010900)
文摘In this paper the conformal invariance by infinitesimal transformations of first order Lagrange systems is discussed in detail. The necessary and sufficient conditions of conformal invariance and Lie symmetry simultaneously by the action of infinitesimal transformations are given. Then it gets the Hojman conserved quantities of conformal invariance by the infinitesimal transformations. Finally an example is given to illustrate the application of the results.
文摘The purpose of this paper is to study the existence and iterative approximation of minimax quasi-solutions for a class of initial value problems of first order impulsive differential systems by using monotone iterative methods.
基金This paper is supported by the National Foundations.
文摘It is important to study the propagation and interaction of progressing waves of nonlinear equations in the class of piecewise smooth function. However, there has not been many works on that in multidimensional case. In 1985, J, Rauch & M. Reed have provad the existence and uniqueness of piecewise smooth solution for
基金This research is supported by the National Natural Science Foundation of China under Grant No.60674018.
文摘Exponential stability of the first order singular distributed parameter systems is discussedin the light of degenerate semi-group methods,which is described by the abstract developing equationin Hilbert space.The necessary and sufficient conditions concerning the exponential stability of thefirst order singular distributed parameter systems are given.
基金CHEN WenXiong supported by Science Foundation of Huaqiao UniversityYANG Minbo was supported by Natural Science Foundation of Zhejiang Province (Grant No. Y7080008)+1 种基金YANG Minbo was supported by National Natural Science Foundation of China (Grant No. 11101374, 10971194)DING Yanheng was supported partially by National Natural Science Foundation of China (Grant No. 10831005)
文摘In this paper we consider the first order discrete Hamiltonian systems {x1(n+1)-x1(n)=Hx2(n,x(n)),x2(n)-x2(n-1)=Hx1(n,x(n)),where x(n) = (x2(n)x1(n))∑ R^2N, H(n,z) = 1/2S(n)z. z + R(n,z) is periodic in n and superlinear as {z} →4 ∞. We prove the existence and infinitely many (geometrically distinct) homoclonic orbits of the system by critical point theorems for strongly indefinite functionals.
基金suppored bythe National Natural Science Funds of China 10771031
文摘In this paper,a discontinuous finite element method for the positive and symmetric,first-order hyperbolic systems(steady and nonsteady state)is constructed and analyzed by using linear triangle elements,and the O(h^2)-order optimal error estimates are derived under the assumption of strongly regular triangulation and the Ha-regularity for the exact solutions.The convergence analysis is based on some superclose estimates of the interpolation approximation.Finally,we discuss the Maxwell equations in a two-dimensional domain,and numerical experiments are given to validate the theoretical results.
文摘Lipschitz continuous solutions to the Cauchy problem for 1-D first order quasi-linear hyperbolic systems are considered. Based on the methods of approximation and integral equations, the author gives two definitions of Lipschitz solutions to the Cauchy problem and proves the existence and uniqueness of solutions.
