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Well-posedness of the Muskat problem in subcritical <i>L</i><sub><i>p</i></sub>-Sobolev spaces

H. ABELS, B.-V. MATIOC

2021European Journal of Applied Mathematics19 citationsDOIOpen Access PDF

Abstract

We study the Muskat problem describing the vertical motion of two immiscible fluids in a two-dimensional homogeneous porous medium in an L p -setting with p ∈ (1, ∞). The Sobolev space $W_p^s(\mathbb R)$ with s = 1+1/ p is a critical space for this problem. We prove, for each s ∈ (1+1/ p , 2) that the Rayleigh–Taylor condition identifies an open subset of $W_p^s(\mathbb R)$ within which the Muskat problem is of parabolic type. This enables us to establish the local well-posedness of the problem in all these subcritical spaces together with a parabolic smoothing property.

Topics & Concepts

Sobolev spaceSmoothingSpace (punctuation)HomogeneousMathematicsPorous mediumMotion (physics)Mathematical analysisParabolic partial differential equationStatistical physicsPure mathematicsComputer sciencePhysicsApplied mathematicsNavier-Stokes equation solutionsNonlinear Partial Differential EquationsStability and Controllability of Differential Equations