Litcius/Paper detail

Existence of strong solutions for a system of interaction between a compressible viscous fluid and a wave equation <sup>*</sup>

Debayan Maity, Arnab Roy, Takéo Takahashi

2021Nonlinearity18 citationsDOIOpen Access PDF

Abstract

Abstract In this article, we consider a fluid–structure interaction system where the fluid is viscous and compressible and where the structure is a part of the boundary of the fluid domain and is deformable. The fluid is governed by the barotropic compressible Navier–Stokes system, whereas the structure displacement is described by a wave equation. We show that the corresponding coupled system admits a unique, strong solution for an initial fluid density and an initial fluid velocity in H 3 and for an initial deformation and an initial deformation velocity in H 4 and H 3 respectively. The reference configuration for the fluid domain is a rectangular cuboid with the elastic structure being the top face. We use a modified Lagrangian change of variables to transform the moving fluid domain into the rectangular cuboid and then analyze the corresponding linear system coupling a transport equation (for the density), a heat-type equation, and a wave equation. The corresponding results for this linear system and estimations of the coefficients coming from the change of variables allow us to perform a fixed point argument and to prove the existence and uniqueness of strong solutions for the nonlinear system, locally in time.

Topics & Concepts

Barotropic fluidMathematicsCompressibilityUniquenessMathematical analysisDomain (mathematical analysis)Lagrangian and Eulerian specification of the flow fieldCuboidNonlinear systemCompressible flowDisplacement (psychology)Boundary (topology)Fluid–structure interactionViscous liquidClassical mechanicsBoundary value problemDeformation (meteorology)Linear systemWave equationMechanicsVelocity potentialWeak solutionFluid dynamicsUniqueness theorem for Poisson's equationPhysicsCoupling (piping)Linear elasticityRADIUSNavier-Stokes equation solutionsStability and Controllability of Differential EquationsAdvanced Mathematical Physics Problems