The inhomogeneous Total Variation Flow with L1-data

Abstract

This paper is devoted to the study of the Dirichlet problem for the parabolic equation driven by the 1--Laplacian operator under minimal integrability assumptions. Specifically, we consider equation* u'-(Du/|D u|)=f in (0,+∞)×\,, equation* where ⊂N is a bounded open set with Lipschitz boundary, u0∈ L1() is the initial datum, and f∈ Lloc1(0,+∞; L1()) is the source term. We establish the existence and uniqueness of entropy solutions in this low-regularity setting. Our approach relies on an approximation scheme and an entropy formulation adapted to the 1--Laplacian structure. Additional results include comparison between solutions, further regularity when data have higher integrability and an analysis of the long-time decay of solutions in the homogeneous case.

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