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Degenerated and Competing Dirichlet Problems with Weights and Convection

Dumitru Motreanu

2021Axioms14 citationsDOIOpen Access PDF

Abstract

This paper focuses on two Dirichlet boundary value problems whose differential operators in the principal part exhibit a lack of ellipticity and contain a convection term (depending on the solution and its gradient). They are driven by a degenerated (p,q)-Laplacian with weights and a competing (p,q)-Laplacian with weights, respectively. The notion of competing (p,q)-Laplacians with weights is considered for the first time. We present existence and approximation results that hold under the same set of hypotheses on the convection term for both problems. The proofs are based on weighted Sobolev spaces, Nemytskij operators, a fixed point argument and finite dimensional approximation. A detailed example illustrates the effective applicability of our results.

Topics & Concepts

Sobolev spaceMathematicsConvectionDirichlet problemTerm (time)Dirichlet distributionBoundary value problemMathematical analysisApplied mathematicsLaplace operatorDirichlet boundary conditionMathematical proofPure mathematicsPhysicsGeometryMeteorologyQuantum mechanicsNonlinear Partial Differential EquationsAdvanced Mathematical Modeling in EngineeringDifferential Equations and Numerical Methods
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