In this article, we study positive solutions to the system{Aαu(x) = Cn,αPV∫Rn(a1(x-y)(u(x)-u(y)))/(|x-y|n+α)dy = f(u(x), Bβv(x) = Cn,βPV ∫Rn(a2(x-y)(v(x)-v(y))/(|x-y|n+β)dy ...In this article, we study positive solutions to the system{Aαu(x) = Cn,αPV∫Rn(a1(x-y)(u(x)-u(y)))/(|x-y|n+α)dy = f(u(x), Bβv(x) = Cn,βPV ∫Rn(a2(x-y)(v(x)-v(y))/(|x-y|n+β)dy = g(u(x),v(x)).To reach our aim, by using the method of moving planes, we prove a narrow region principle and a decay at infinity by the iteration method. On the basis of these results, we conclude radial symmetry and monotonicity of positive solutions for the problems involving the weighted fractional system on an unit ball and the whole space. Furthermore, non-existence of nonnegative solutions on a half space is given.展开更多
In this paper, we introduce the concepts of the conesweak subdifferential and the cone-weak direction derivative of convex set-valued mapping in a locally convex topological vector space. We study the relationship bet...In this paper, we introduce the concepts of the conesweak subdifferential and the cone-weak direction derivative of convex set-valued mapping in a locally convex topological vector space. We study the relationship between them and obtain some important results.展开更多
基金Supported by National Natural Science Foundation of China(11771354)
文摘In this article, we study positive solutions to the system{Aαu(x) = Cn,αPV∫Rn(a1(x-y)(u(x)-u(y)))/(|x-y|n+α)dy = f(u(x), Bβv(x) = Cn,βPV ∫Rn(a2(x-y)(v(x)-v(y))/(|x-y|n+β)dy = g(u(x),v(x)).To reach our aim, by using the method of moving planes, we prove a narrow region principle and a decay at infinity by the iteration method. On the basis of these results, we conclude radial symmetry and monotonicity of positive solutions for the problems involving the weighted fractional system on an unit ball and the whole space. Furthermore, non-existence of nonnegative solutions on a half space is given.
文摘In this paper, we introduce the concepts of the conesweak subdifferential and the cone-weak direction derivative of convex set-valued mapping in a locally convex topological vector space. We study the relationship between them and obtain some important results.
