On regularity and existence of weak solutions to nonlinear Kolmogorov-Fokker-Planck type equations with rough coefficients

Abstract

We consider nonlinear Kolmogorov-Fokker-Planck type equations of the form equationabeqn (∂t+X·∇Y)u=∇X·(A(∇X u,X,Y,t)). equation The function A=A(,X,Y,t):m×m×m×m is assumed to be continuous with respect to , and measurable with respect to X,Y and t. A=A(,X,Y,t) is allowed to be nonlinear but with linear growth. We establish higher integrability and local boundedness of weak sub-solutions, weak Harnack and Harnack inequalities, and H\"older continuity with quantitative estimates. In addition we establish existence and uniqueness of weak solutions to a Dirichlet problem in certain bounded X, Y and t dependent domains.