By the Schauder-Tychonoff fixed-point theorem, we inyestigate the existence and asymptotic behavior of positive radial solutions of fully nonlinear elliptic equations in Re. We give some sufficient conditions to guara...By the Schauder-Tychonoff fixed-point theorem, we inyestigate the existence and asymptotic behavior of positive radial solutions of fully nonlinear elliptic equations in Re. We give some sufficient conditions to guarantee the existence of bounded and unbounded radial solutions and consider the nonexistence of positive solution in Rn.展开更多
We investigate sharp conditions for boundary and interior gradient estimates of continuous viscosity solutions to fully nonlinear, uniformly elliptic equations under Dirichlet boundary conditions. When these condition...We investigate sharp conditions for boundary and interior gradient estimates of continuous viscosity solutions to fully nonlinear, uniformly elliptic equations under Dirichlet boundary conditions. When these conditions are violated, there can be blow up of the gradient in the interior or on the boundary of the domain. In particular we de- rive sharp results on local and global Lipschitz continuity of continuous viscosity solutions under more general growth conditions than before. Lipschitz regularity near the boundary allows us to predict when the Dirichlet condition is satisfied in a classical and not just in a viscosity sense, where detachment can occur. Another consequence is this: if interior gra- dient blow up occurs, Perron-type solutions can in general become discontinuous, so that the Dirichlet problem can become unsolvable in the class of continuous viscosity solutions.展开更多
In this article,we consider a fully nonlinear partial differential equation which can be expressed as a sum of two Monge-Ampere operators acting in different two-dimensional coordinate sections.This equation is ellipt...In this article,we consider a fully nonlinear partial differential equation which can be expressed as a sum of two Monge-Ampere operators acting in different two-dimensional coordinate sections.This equation is elliptic,for example,in the class of convex functions.We show that the notion of Monge-Ampere measures and Aleksandrov generalized solutions extends to this equation,subject to a weaker notion of convexity which we call bi-planar convexity.While the equation is also elliptic in the class of bi-planar convex functions,the contrary is not necessarily true.This is a substantial difference compared to the classical Monge-Ampere equation where ellipticity and convexity coincide.We provide explicit counter-examples:classical solutions to the bi-planar equation that satisfy the ellipticity condition but are not generalized solutions in the sense introduced.We conclude that the concept of generalized solutions based on convexity arguments is not a natural setting for the bi-planar equation.展开更多
This paper discuss the existence of bifurcation point of positive solutions for the fully nonlinear elliptic equations involving super-critical Soboley exponent which include semilinear, MongeAmpere and Hessian equati...This paper discuss the existence of bifurcation point of positive solutions for the fully nonlinear elliptic equations involving super-critical Soboley exponent which include semilinear, MongeAmpere and Hessian equations as its examples, by setting abstract bifurcation theorem via the topological degree theory.展开更多
First, we review the authors' recent results on translating solutions to mean curvature flows in Euclidean space as well as in Minkowski space, emphasizing on the asymptotic expansion of rotationally symmetric soluti...First, we review the authors' recent results on translating solutions to mean curvature flows in Euclidean space as well as in Minkowski space, emphasizing on the asymptotic expansion of rotationally symmetric solutions. Then we study the sufficient condition for which the translating solution is rotationally symmetric. We will use a moving plane method to show that this condition is optimal for the symmetry of solutions to fully nonlinear elliptic equations without ground state condition.展开更多
In this paper, we classify Mobius invariant differential operators of second orderin two-dimensional Euclidean space, and establish a Liouville type theorem forgeneral Mobius invariant elliptic equations. The equation...In this paper, we classify Mobius invariant differential operators of second orderin two-dimensional Euclidean space, and establish a Liouville type theorem forgeneral Mobius invariant elliptic equations. The equationsare naturally associ-ated with a continuous family of convex cones Γ_(p) in R^(2), with parameter p∈[1,2],joining the half plane Γ_(1) := {(λ_(1),λ_(2)) : λ_(1)+λ_(2)> 0} and the first quadrant Γ_(2) := {(λ_(1),λ_(2)) : λ_(1),λ_(2)> 0}. Chen and C. M. Li established in 1991 a Liouvilletype theorem corresponding to Γ_(1) under an integrability assumption on the solution. The uniqueness result does not hold without this assumption. The Liouville typetheorem we establish in this paper for Γ_(p),1 < p ≤ 2, does not require any additionalassumption on the solution as for Γ_(1). This is reminiscent of the I iouville type theo-rems in dimensions n≥3 established by Caffarelli, Gidas and Spruck in 1989 andby A.B. Li and Y. Y. Li in 2003-2005, where no additional assumption was neededeither. On the other hand, there is a striking new phenomena in dimension n=2 that Γ_(p) ,for p=1 is a sharp dividing line for such uniqueness result to hold without anyfurther assumption on the solution. In dimensions n≥3, there is no such dividing line.展开更多
文摘By the Schauder-Tychonoff fixed-point theorem, we inyestigate the existence and asymptotic behavior of positive radial solutions of fully nonlinear elliptic equations in Re. We give some sufficient conditions to guarantee the existence of bounded and unbounded radial solutions and consider the nonexistence of positive solution in Rn.
基金financed by the Alexander von Humboldt Foundationcontinued in March 2009 at the Mathematisches Forschungsinstitut Oberwolfach in the "Research in Pairs"program
文摘We investigate sharp conditions for boundary and interior gradient estimates of continuous viscosity solutions to fully nonlinear, uniformly elliptic equations under Dirichlet boundary conditions. When these conditions are violated, there can be blow up of the gradient in the interior or on the boundary of the domain. In particular we de- rive sharp results on local and global Lipschitz continuity of continuous viscosity solutions under more general growth conditions than before. Lipschitz regularity near the boundary allows us to predict when the Dirichlet condition is satisfied in a classical and not just in a viscosity sense, where detachment can occur. Another consequence is this: if interior gra- dient blow up occurs, Perron-type solutions can in general become discontinuous, so that the Dirichlet problem can become unsolvable in the class of continuous viscosity solutions.
基金This article contributes to the project"Systematic multi-scale modeling and analysis for geophysical flow"of the Collaborative Research Center TRR 181"Energy Transfers in Atmosphere and Ocean"funded by the Deutsche Forschungsgemeinschaft(DFG,German Research Foundation)under project number 274762653.
文摘In this article,we consider a fully nonlinear partial differential equation which can be expressed as a sum of two Monge-Ampere operators acting in different two-dimensional coordinate sections.This equation is elliptic,for example,in the class of convex functions.We show that the notion of Monge-Ampere measures and Aleksandrov generalized solutions extends to this equation,subject to a weaker notion of convexity which we call bi-planar convexity.While the equation is also elliptic in the class of bi-planar convex functions,the contrary is not necessarily true.This is a substantial difference compared to the classical Monge-Ampere equation where ellipticity and convexity coincide.We provide explicit counter-examples:classical solutions to the bi-planar equation that satisfy the ellipticity condition but are not generalized solutions in the sense introduced.We conclude that the concept of generalized solutions based on convexity arguments is not a natural setting for the bi-planar equation.
文摘This paper discuss the existence of bifurcation point of positive solutions for the fully nonlinear elliptic equations involving super-critical Soboley exponent which include semilinear, MongeAmpere and Hessian equations as its examples, by setting abstract bifurcation theorem via the topological degree theory.
基金Supported by Natural Science Foundation of China (10631020, 10871061)the Grant for Ph.D Program of Ministry of Education of Chinasupported by Innovation Propject for the Development of Science and Technology (IHLB) (201098)
文摘First, we review the authors' recent results on translating solutions to mean curvature flows in Euclidean space as well as in Minkowski space, emphasizing on the asymptotic expansion of rotationally symmetric solutions. Then we study the sufficient condition for which the translating solution is rotationally symmetric. We will use a moving plane method to show that this condition is optimal for the symmetry of solutions to fully nonlinear elliptic equations without ground state condition.
基金Yanyan Li’s research was partially supported by NSF Grants DMS-1501004,DMS-2000261,and Simons Fellows Award 677077Han Lu’s research was partially supported by NSF Grants DMS-1501004,DMS-2000261Siyuan Lu’s research was partially supported by NSERC Discovery Grant.
文摘In this paper, we classify Mobius invariant differential operators of second orderin two-dimensional Euclidean space, and establish a Liouville type theorem forgeneral Mobius invariant elliptic equations. The equationsare naturally associ-ated with a continuous family of convex cones Γ_(p) in R^(2), with parameter p∈[1,2],joining the half plane Γ_(1) := {(λ_(1),λ_(2)) : λ_(1)+λ_(2)> 0} and the first quadrant Γ_(2) := {(λ_(1),λ_(2)) : λ_(1),λ_(2)> 0}. Chen and C. M. Li established in 1991 a Liouvilletype theorem corresponding to Γ_(1) under an integrability assumption on the solution. The uniqueness result does not hold without this assumption. The Liouville typetheorem we establish in this paper for Γ_(p),1 < p ≤ 2, does not require any additionalassumption on the solution as for Γ_(1). This is reminiscent of the I iouville type theo-rems in dimensions n≥3 established by Caffarelli, Gidas and Spruck in 1989 andby A.B. Li and Y. Y. Li in 2003-2005, where no additional assumption was neededeither. On the other hand, there is a striking new phenomena in dimension n=2 that Γ_(p) ,for p=1 is a sharp dividing line for such uniqueness result to hold without anyfurther assumption on the solution. In dimensions n≥3, there is no such dividing line.
