The gradient of the Moreau\|Yosida approximation to a piecewise C\+2 convex function is studied in this paper. The piecewise smoothness of the gradient function is obtained under a constraint qulification of the const...The gradient of the Moreau\|Yosida approximation to a piecewise C\+2 convex function is studied in this paper. The piecewise smoothness of the gradient function is obtained under a constraint qulification of the constant rank.展开更多
This article is concerned with the weak convergence of invariant measures asso- ciated with multivalued stochastic differential equations in the finite dimensional space.
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
文摘The gradient of the Moreau\|Yosida approximation to a piecewise C\+2 convex function is studied in this paper. The piecewise smoothness of the gradient function is obtained under a constraint qulification of the constant rank.
基金supported by NSFs of China(11471340 and 11461028)
文摘This article is concerned with the weak convergence of invariant measures asso- ciated with multivalued stochastic differential equations in the finite dimensional space.
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.
