Search results for "sub-supersolution"

showing 6 items of 6 documents

Quasilinear Dirichlet Problems with Degenerated p-Laplacian and Convection Term

2021

The paper develops a sub-supersolution approach for quasilinear elliptic equations driven by degenerated p-Laplacian and containing a convection term. The presence of the degenerated operator forces a substantial change to the functional setting of previous works. The existence and location of solutions through a sub-supersolution is established. The abstract result is applied to find nontrivial, nonnegative and bounded solutions.

Convectionsub-supersolutionGeneral MathematicsOperator (physics)quasilinear elliptic problemlcsh:MathematicsMathematical analysisMathematics::Analysis of PDEsnonnegative solutionlcsh:QA1-939Dirichlet distributionTerm (time)symbols.namesakedegenereted p-LaplacianSettore MAT/05 - Analisi MatematicaBounded functionComputer Science (miscellaneous)p-Laplaciansymbolsconvection termEngineering (miscellaneous)MathematicsMathematics
researchProduct

Singular quasilinear elliptic systems involving gradient terms

2019

Abstract In this paper we establish the existence of at least one smooth positive solution for a singular quasilinear elliptic system involving gradient terms. The approach combines the sub-supersolutions method and Schauder’s fixed point theorem.

Elliptic systemsApplied MathematicsSingular system010102 general mathematicsMathematical analysisp-LaplacianGeneral EngineeringMathematics::Analysis of PDEsFixed-point theoremGeneral MedicineFixed point01 natural sciences010101 applied mathematicsRegularityComputational MathematicsMathematics - Analysis of PDEsSettore MAT/05 - Analisi MatematicaFOS: Mathematics0101 mathematicsSub-supersolutionGeneral Economics Econometrics and FinanceAnalysisMathematicsAnalysis of PDEs (math.AP)
researchProduct

A sub-supersolution approach for Neumann boundary value problems with gradient dependence

2020

Abstract Existence and location of solutions to a Neumann problem driven by an nonhomogeneous differential operator and with gradient dependence are established developing a non-variational approach based on an adequate method of sub-supersolution. The abstract theorem is applied to prove the existence of finitely many positive solutions or even infinitely many positive solutions for a class of Neumann problems.

Gradient dependenceClass (set theory)Applied Mathematics010102 general mathematicsGeneral EngineeringNeumann problemGeneral MedicineDifferential operator01 natural sciencesPositive solution010101 applied mathematicsComputational MathematicsQuasilinear elliptic equationSettore MAT/05 - Analisi MatematicaNeumann boundary conditionMathematics::Metric GeometryApplied mathematicsBoundary value problem0101 mathematicsSub-supersolutionGeneral Economics Econometrics and FinanceAnalysisMathematicsNonlinear Analysis: Real World Applications
researchProduct

A Sub-Supersolution Approach for Robin Boundary Value Problems with Full Gradient Dependence

2020

The paper investigates a nonlinear elliptic problem with a Robin boundary condition, which exhibits a convection term with full dependence on the solution and its gradient. A sub- supersolution approach is developed for this type of problems. The main result establishes the existence of a solution enclosed in the ordered interval formed by a sub-supersolution. The result is applied to find positive solutions.

sub-supersolutionConvectionlcsh:MathematicsGeneral Mathematics010102 general mathematicsMathematics::Analysis of PDEsInterval (mathematics)Robin boundary conditionType (model theory)lcsh:QA1-93901 natural sciencesRobin boundary conditionTerm (time)010101 applied mathematicsNonlinear systemnonlinear elliptic problemSettore MAT/05 - Analisi Matematicapositive solutiongradient dependenceComputer Science (miscellaneous)Applied mathematicsBoundary value problem0101 mathematicsEngineering (miscellaneous)MathematicsMathematics
researchProduct

Regular solutions for nonlinear elliptic equations, with convective terms, in Orlicz spaces

2022

We establish some existence and regularity results to the Dirichlet problem, for a class of quasilinear elliptic equations involving a partial differential operator, depending on the gradient of the solution. Our results are formulated in the Orlicz-Sobolev spaces and under general growth conditions on the convection term. The sub- and supersolutions method is a key tool in the proof of the existence results.

sub-supersolutionMathematics - Analysis of PDEsOrlicz-Sobolev spaceSettore MAT/05 - Analisi Matematicagradient dependenceGeneral Mathematicsnonlinear elliptic equationFOS: Mathematics35J25 35J99 46E35Analysis of PDEs (math.AP)
researchProduct

On the Sub-Supersolution Approach for Dirichlet Problems driven by a (p(x), q(x))-Laplacian Operator with Convection Term

2021

The method of sub and super-solution is applied to obtain existence and location of solutions to a quasilinear elliptic problem with variable exponent and Dirichlet boundary conditions involving a nonlinear term f depending on solution and on its gradient. Under a suitable growth condition on the convection term f, the existence of at least one solution satisfying a priori estimate is obtained.

sub-supersolutionpositive solutionSettore MAT/05 - Analisi Matematicagradient dependence(p(x) q(x))-LaplacianDirichlet problem
researchProduct