Global estimates for quasilinear parabolic equations on Reifenberg flat domains and its applications to Riccati type parabolic equations with distributional data

Abstract

In this paper, we prove global weighted Lorentz and Lorentz-Morrey estimates for gradients of solutions to the quasilinear parabolic equations: ut-div(A(x,t,∇ u))=div(F), in a bounded domain × (0,T)⊂RN+1, under minimal regularity assumptions on the boundary of domain and on nonlinearity A. Then results yields existence of a solution to the Riccati type parabolic equations: ut-div(A(x,t,∇ u))=|∇ u|q+div(F)+μ, where q>1 and μ is a bounded Radon measure.