Well-posedness for local and nonlocal quasilinear evolution equations in fluids and geometry
Abstract
We establish a Schauder-type estimate for general local and non-local linear parabolic system ∂tu+Lsu=γ f+g in (0,∞)×Rd where =(-)12, 0<γ≤ s, Ls is the Pesudo-differential operator defined by equation Lsu(t,x)=(2π)-d2∫RdA(t,x,) u(t,)eix·d, A(t,x,) ||s. equation To prove this, we develop a new freezing coefficient method for kernel, where we freeze the coefficient at x0, then derive a representation formula of the solution, and finally we take x0=x when estimating the solution. By applying our Schauder-type estimate to suitably chosen differential operators Ls, we obtain critical well-posedness results of various local and non-local nonlinear evolution equations in geometry and fluids, including hypoviscous Navier--Stokes equations, the surface quasi-geostrophic equation, mean curvature equations, Willmore flow, surface diffusion flow, Peskin equations, thin-film equations and Muskat equations.
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