Existence, asymptotic behaviour and convergence of a generalised 3D Muskat problem in stable regime

Abstract

We address a generalised three-dimensional α-Muskat model that comes from the fluid interface problem given by two incompressible fluids with different densities in the stable regime. We establish local-in-time wellposedness when α∈[0,1) and also prove global-in-time existence for strong solutions when α∈[0,12) with initial data controlled by explicit constants. We obtain maximum principles for the L∞-norms of both the solutions and their gradients, and we further acquire the corresponding decay rates of these L∞-norms. Finally, some convergence results for strong solutions as α0+ are also proved.

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