We establish continuous maximal regularity results for parabolic differential
operators acting on sections of tensor bundles on Riemannian manifolds. As an
application, we show that solutions to the Yamabe flow instantaneously
regularize and become real analytic in space and time. The regularity result is
obtained by introducing a family of parameter-dependent diffeomorphims acting
on functions over Riemannian manifolds in conjunction with maximal regularity
and the implicit function theorem
Abstract. It is the purpose of this article to establish a technical tool to study regularity of solutions to parabolic equations on manifolds. As applications of this technique, we prove that solutions to the Ricci-DeTurck flow, the surface diffusion flow and the mean curvature flow enjoy joint analyticity in time and space, and solutions to the Ricci flow admit temporal analyticity.
Abstract. We establish the equivalence between the family of uniformly regular Riemannian manifolds without boundary and the class of manifolds with bounded geometry.
Abstract. We study the regularity of the free boundary arising in a thermodynamically consistent two-phase Stefan problem with surface tension by means of a family of parameter-dependent diffeomorphisms, Lp-maximal regularity theory, and the implicit function theorem.
Abstract. The main aim of this article is to establish an Lp-theory for elliptic operators on manifolds with singularities. The particular class of differential operators discussed herein may exhibit degenerate or singular behavior near the singular ends of the manifolds. Such a theory is of importance for the study of elliptic and parabolic equations on non-compact, or even incomplete manifolds, with or without boundary.
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