Lagrangian flows for vector fields with gradient given by a singular integral (1208.6374v1)
Abstract: We prove quantitative estimates on flows of ordinary differential equations with vector field with gradient given by a singular integral of an $L1$ function. Such estimates allow to prove existence, uniqueness, quantitative stability and compactness for the flow, going beyond the $BV$ theory. We illustrate the related well-posedness theory of Lagrangian solutions to the continuity and transport equations.
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