Mild ill-posedness in W1,∞ for the incompressible porous media equation
Abstract
In this paper, we establish the mild ill-posedness of 2D IPM equation in the critical Sobolev space W1,∞ when the initial data are small perturbations of stable profile g(x2). Consequently, instability can be inferred. Notably, our results are valid for arbitrary vertically stratified density profiles g(x2) without imposing any restrictions on the sign of g'(x2). From a physical perspective, since gravity acts downward, density profiles satisfying g'(x2) < 0 typically correspond to stable configurations, whereas those with g '(x2) > 0 are generally expected to be unstable. Surprisingly, our analysis uncovers an unexpected instability even when g'(x2) < 0 and g'(x2)∈ W2,∞(R). To the best of our knowledge, this work provides the first rigorous demonstration of IPM instability for vertically nonlinear density profiles, marking a significant departure from conventional physical expectations.
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