On the Existence of Strong Solutions to the Cahn--Hilliard--Darcy System with Mass Source
Andrea Giorgini, Kei Fong Lam, Elisabetta Rocca, Giulio Schimperna
Abstract
We study a diffuse interface model describing the evolution of the flow of a binary fluid in a Hele-Shaw cell. The model consists of a Cahn--Hilliard--Darcy type system with transport and mass source. A relevant physical application is related to tumor growth dynamics, which in particular justifies the occurrence of a mass inflow. We study the initial-boundary value problem for this model and prove global existence and uniqueness of strong solutions in two space dimensions as well as local existence in three space dimensions.
Topics & Concepts
MathematicsNonlinear systemCahn–Hilliard equationDarcy's lawMathematical analysisApplied mathematicsMathematical economicsPartial differential equationPorous mediumPhysicsGeologyGeotechnical engineeringQuantum mechanicsPorositySolidification and crystal growth phenomenananoparticles nucleation surface interactionsFluid Dynamics and Thin Films