Local elliptic regularity for solutions to stationary Fokker-Planck equations via Dirichlet forms and resolvents
Abstract
In this paper, we show that, for a solution to the stationary Fokker-Planck equation with general coefficients, defined as a measure with an L2-density, this density not only exhibits H1,2-regularity but also H\"older continuity. To achieve this, we first construct a reference measure μ= dx by utilizing existence and elliptic regularity results, ensuring that the given divergence-type operator corresponds to a sectorial Dirichlet form. By employing elliptic regularity results for homogeneous boundary value problems in both divergence and non-divergence type equations, we demonstrate that the image of the resolvent operator associated with the sectorial Dirichlet form has H2,2-regularity. Furthermore, through calculations based on the Dirichlet form and the H2,2-regularity of the resolvent operator, we prove that the density of the solution measure for the stationary Fokker-Planck equation is, indeed, the weak limit of H1,2-functions defined via the resolvent operator. Our results highlight the central role of Dirichlet form theory and resolvent approximations in establishing the regularity of solutions to stationary Fokker-Planck equations with general coefficients.
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