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The classical Kelvin–Voigt problem for incompressible fluids with unknown non-constant density: existence, uniqueness and regularity

S. N. Antont︠s︡ev, Hermenegildo Borges de Oliveira, Kh. Khompysh

2021Nonlinearity27 citationsDOI

Abstract

Abstract The classical Kelvin–Voigt equations for incompressible fluids with non-constant density are investigated in this work. To the associated initial-value problem endowed with zero Dirichlet conditions on the assumed Lipschitz-continuous boundary, we prove the existence of weak solutions: velocity and density. We also prove the existence of a unique pressure. These results are valid for d ∈ {2, 3, 4}. In particular, if d ∈ {2, 3}, the regularity of the velocity and density is improved so that their uniqueness can be shown. In particular, the dependence of the regularity of the solutions on the smoothness of the given data of the problem is established.

Topics & Concepts

MathematicsUniquenessLipschitz continuitySmoothnessConstant (computer programming)Mathematical analysisCompressibilityWeak solutionBoundary value problemHölder conditionDirichlet boundary conditionZero (linguistics)Work (physics)Initial value problemDirichlet problemPhysicsMechanicsThermodynamicsComputer scienceProgramming languagePhilosophyLinguisticsNavier-Stokes equation solutionsStability and Controllability of Differential EquationsAdvanced Mathematical Physics Problems