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Existence of Solutions to Reaction Cross Diffusion Systems

Matt Jacobs

2023SIAM Journal on Mathematical Analysis11 citationsDOI

Abstract

.Reaction cross diffusion systems are a two species generalization of the porous media equation. These systems play an important role in the mechanical modeling of living tissues and tumor growth. Due to their mixed parabolic-hyperbolic structure, even proving the existence of solutions to these equations is challenging. In this paper, we exploit the parabolic structure of the system to prove the strong compactness of the pressure gradient in \(L^2\). The key ingredient is the energy dissipation relation, which, along with some compensated compactness arguments, allows us to upgrade weak convergence to strong convergence. As a consequence of the pressure compactness, we are able to prove the existence of solutions in a general setting and pass to the Hele-Shaw/incompressible limit in any dimension.Keywordsreaction-diffusion equationcell growth modelhyperbolic-parabolic systemconvex dualityenergy dissipation relationMSC codes35M1135Q9249N1535Q35

Topics & Concepts

MathematicsReaction–diffusion systemMathematical analysisDiffusionApplied mathematicsThermodynamicsPhysicsAdvanced Mathematical Modeling in EngineeringNonlinear Partial Differential EquationsMathematical Biology Tumor Growth
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