Existence and regularity of mean curvature flow with transport term in higher dimensions
Abstract
Given an initial C1 hypersurface and a time-dependent vector field in a Sobolev space, we prove a time-global existence of a family of hypersurfaces which start from the given hypersurface and which move by the velocity equal to the mean curvature plus the given vector field. We show that the hypersurfaces are C1 for a short time and, even after some singularities occur, almost everywhere C1 away from higher multiplicity region.
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