On a power-type coupled system of <i>k</i>-Hessian equations
Chenghua Gao, Xingyue He, Maojun Ran
Abstract
We deal with a coupled system of k-Hessian equations:where k = 1, 2, · · · , N , B is a unit ball in ℝN , N ≥ 2, α and β are positive constants. By using the fixed-point index theory in cone, we obtain the existence, uniqueness and nonexistence of radial convex solutions for some suitable constants α and β. Furthermore, by using a generalized Krein-Rutman theorem, we also obtain a necessary and sufficient existence condition of the convex solutions to a nonlinear eigenvalue problem.
Topics & Concepts
MathematicsHessian equationUniquenessHessian matrixFixed-point indexUnit sphereCone (formal languages)Regular polygonMathematical analysisNonlinear systemEigenvalues and eigenvectorsType (biology)Convex coneFixed-point theoremConstant (computer programming)Pure mathematicsConvex setApplied mathematicsConvex optimizationDifferential equationGeometryBoundary value problemAlgorithmQuantum mechanicsBiologyEcologyProgramming languageComputer sciencePhysicsFirst-order partial differential equationNonlinear Partial Differential EquationsGeometric Analysis and Curvature FlowsAdvanced Mathematical Modeling in Engineering