Let 0<p<1. In this paper we prove that the Bergman norm on the p-th Bergman space b^p(H) is equivalent to certain "normal direction norm" as well as certain "tangential direction norm", where...Let 0<p<1. In this paper we prove that the Bergman norm on the p-th Bergman space b^p(H) is equivalent to certain "normal direction norm" as well as certain "tangential direction norm", where H=R^n-1×R+ is the upper half space. As an application, we get the boundedness of harmonic conjugation operators on b%p (H).展开更多
Let X be a metric space with an ordering structure,A: X→X is a operator and x≤Ax for any x∈X. In this paper we prove a new fixed point theorem, which generalizes famous caristi fixed point theorem.
We investigate the Liouville theorem for an integral system with Poisson kernel on the upper half space R+n,{u(x) =2/(nωn)∫?R+n(xnf(v(y)))/(|x- y|n)dy, x ∈R+n,v(y) =2/(nωn)∫R+n(xng(u(x)))/(...We investigate the Liouville theorem for an integral system with Poisson kernel on the upper half space R+n,{u(x) =2/(nωn)∫?R+n(xnf(v(y)))/(|x- y|n)dy, x ∈R+n,v(y) =2/(nωn)∫R+n(xng(u(x)))/(|x- y|n)dx, y ∈?R+n,where n 3, ωn is the volume of the unit ball in Rn. This integral system arises from the Euler-Lagrange equation corresponding to an integral inequality on the upper half space established by Hang et al.(2008).With natural structure conditions on f and g, we classify the positive solutions of the above system based on the method of moving spheres in integral form and the inequality mentioned above.展开更多
We study positive solutions to the following higher order SchrSdinger system with Dirichlet boundary conditions on a half space: where a is any even number between 0 and n. This PDE system is closely related to the i...We study positive solutions to the following higher order SchrSdinger system with Dirichlet boundary conditions on a half space: where a is any even number between 0 and n. This PDE system is closely related to the integral system where G is the corresponding Green's function on the half space. More precisely, we show that every solution to (0.2) satisfies (0.1), and we believe that the converse is also true. We establish a Liouville type theorem the non-existence of positive solutions to (0.2) under a very weak condition that u and v are only locally integrable. Some new ideas are involved in the proof, which can be applied to a system of more equations.展开更多
A new fixed point theorem and the selection property for upper semi-continuous set-valued mappings in abstract convexity space are established. As their applications the existence of Nash equilibrium for n-person non-...A new fixed point theorem and the selection property for upper semi-continuous set-valued mappings in abstract convexity space are established. As their applications the existence of Nash equilibrium for n-person non-cooperative generalized games is proved.展开更多
文摘Let 0<p<1. In this paper we prove that the Bergman norm on the p-th Bergman space b^p(H) is equivalent to certain "normal direction norm" as well as certain "tangential direction norm", where H=R^n-1×R+ is the upper half space. As an application, we get the boundedness of harmonic conjugation operators on b%p (H).
基金Supported by Chinese National Science Fund for Distinguished Young Scholars(No.11101319,No.11201081,No.11202035)the Foundation of Shaanxi Statistical Research Center(No.13JD04)the Foundation of Shaanxi Province Education Department(No.14JK1276)
文摘Let X be a metric space with an ordering structure,A: X→X is a operator and x≤Ax for any x∈X. In this paper we prove a new fixed point theorem, which generalizes famous caristi fixed point theorem.
基金supported by National Natural Science Foundation of China (Grant No. 11571268)Natural Science Basic Research Plan in Shaanxi Province of China (Grant No. 2014JM1021)
文摘We investigate the Liouville theorem for an integral system with Poisson kernel on the upper half space R+n,{u(x) =2/(nωn)∫?R+n(xnf(v(y)))/(|x- y|n)dy, x ∈R+n,v(y) =2/(nωn)∫R+n(xng(u(x)))/(|x- y|n)dx, y ∈?R+n,where n 3, ωn is the volume of the unit ball in Rn. This integral system arises from the Euler-Lagrange equation corresponding to an integral inequality on the upper half space established by Hang et al.(2008).With natural structure conditions on f and g, we classify the positive solutions of the above system based on the method of moving spheres in integral form and the inequality mentioned above.
基金supported by China Scholarship Council(Grant No.201206060010)
文摘We study positive solutions to the following higher order SchrSdinger system with Dirichlet boundary conditions on a half space: where a is any even number between 0 and n. This PDE system is closely related to the integral system where G is the corresponding Green's function on the half space. More precisely, we show that every solution to (0.2) satisfies (0.1), and we believe that the converse is also true. We establish a Liouville type theorem the non-existence of positive solutions to (0.2) under a very weak condition that u and v are only locally integrable. Some new ideas are involved in the proof, which can be applied to a system of more equations.
基金the National Natural Science Foundation of China(No.10561003)
文摘A new fixed point theorem and the selection property for upper semi-continuous set-valued mappings in abstract convexity space are established. As their applications the existence of Nash equilibrium for n-person non-cooperative generalized games is proved.