Nestor Guillen, Inwon Kim, Antoine Mellet
Published 2020-12-04Version 1
We study the incompressible limit of the porous medium equation with a right hand side representing either a source or a sink term, and an injection boundary condition. This model can be seen as a simplified description of non-monotone motions in tumor growth and crowd motion, generalizing the congestion-only motions studied in recent literature (\cite{AKY}, \cite{PQV}, \cite{KP}, \cite{MPQ}). We characterize the limit density, which solves a free boundary problem of Hele-Shaw type in terms of the limit pressure. The novel feature of our result lies in the characterization of the limit pressure, which solves an obstacle problem at each time in the evolution
Comments: 33 pages, 2 figures
Optimal regularity and nondegeneracy of a free boundary problem related to the fractional Laplacian
Lipschitz Continuity of Solutions to a Free Boundary Problem involving the A-Laplacian
Global existence for a free boundary problem of Fisher-KPP type
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