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On the Classification of Incompressible Fluids and a Mathematical Analysis of the Equations That Govern Their Motion

Jan Blechta, Josef Málek, K. R. Rajagopal

2020SIAM Journal on Mathematical Analysis42 citationsDOIOpen Access PDF

Abstract

In the first part of the paper we provide a new classification of incompressible fluids characterized by a continuous monotone relation between the velocity gradient and the Cauchy stress. The considered class includes Euler fluids, Navier--Stokes fluids, classical power-law fluids as well as stress power-law fluids, and their various generalizations including the fluids that we refer to as activated fluids, namely, fluids that behave as an Euler fluid prior activation and behave as a viscous fluid once activation takes place. We also present a classification concerning boundary conditions that are viewed as the constitutive relations on the boundary. In the second part of the paper, we develop a robust mathematical theory for activated Euler fluids associated with different types of the boundary conditions ranging from no-slip to free-slip and include Navier's slip as well as stick-slip. Both steady and unsteady flows of such fluids in three-dimensional domains are analyzed.

Topics & Concepts

MathematicsCompressibilityBoundary value problemMathematical analysisEuler's formulaEuler equationsBoundary (topology)Constitutive equationMonotone polygonSlip (aerodynamics)Cauchy distributionNo-slip conditionFluid mechanicsIncompressible flowClassical mechanicsMotion (physics)Cauchy problemGeneralized Newtonian fluidClass (philosophy)Herschel–Bulkley fluidEuler systemFluid dynamicsCompressible flowRelation (database)Viscous liquidFluid motionMechanicsEquations of motionWeak solutionCharacterization (materials science)Elasticity and Material ModelingNavier-Stokes equation solutionsThermoelastic and Magnetoelastic Phenomena