The Muskat problem with a large slope

Abstract

In this paper, we establish local well-posedness results for the Muskat equation in any dimension using modulus of continuity techniques. By introducing a novel quantity \(βσ(f0')\) which encapsulates local monotonicity and slope, we identify a new class of initial data within \(W1,∞(Rd)\). This includes scenarios where the product of the maximal and minimal slopes is large, thereby guaranteeing the local existence of a classical solution.

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