A Schauder regularity theory for nonlocal and mixed local-nonlocal viscous Hamiltonx2013Jacobi equations

Abstract

We prove space-time Schauder estimates x2013 optimal regularity estimates in Hölder spaces x2013 and well-posedness results for mild and classical solutions of viscous Hamiltonx2013Jacobi equations with subcritical nonlocal and mixed local-nonlocal diffusions in Rd. Our spatial Schauder estimates hold under mild assumptions on the nonlocal/mixed operators and Hamiltonians. The Laplacian, fractional Laplacians, nonsymmetric, spectrally one-sided, and strongly anisotropic integral operators, as well as sums of such operators are covered. We observe an interplay between the regularity of the initial data and the growth of the Hamiltonian in the gradient, and develop a spatial Schauder theory for two canonical cases: (i) Lipschitz initial data and general Hamiltonians that are Hölder in space and merely locally Lipschitz in the gradient, and (ii) Hölder initial data and Hamiltonians that are Hölder in space and locally Lipschitz with power growth in the gradient. We compute explicit blow-up rates for C1 and higher order Hölder norms as t 0. The results include short and long time existence of mild solutions, optimal regularity in Hölder spaces and corresponding Schauder a priori estimates, and that spatially smooth mild solutions are regular in time and pointwise classical solutions. Under further assumptions on the diffusion operator, we then prove time and space-time Schauder regularity estimates in optimal Hölder spaces which respect the natural fractional parabolic scaling. These results generalize classical linear local and fractional Schauder estimates to our non-linear fractional, possibly anisotropic and nonsymmetric setting.