Global Lorentz estimates for nonlinear parabolic equations on nonsmooth domains

Abstract

Consider the nonlinear parabolic equation in the form ut- div a(D u,x,t)= div\,(|F|p-2F) in ×(0,T), where T>0 and is a Reifenberg domain. We suppose that the nonlinearity a(,x,t) has a small BMO norm with respect to x and is merely measurable and bounded with respect to the time variable t. In this paper, we prove the global Calder\'on-Zygmund estimates for the weak solution to this parabolic problem in the setting of Lorentz spaces which includes the estimates in Lebesgue spaces. Our global Calder\'on-Zygmund estimates extend certain previous results to equations with less regularity assumptions on the nonlinearity a(,x,t) and to more general setting of Lorentz spaces.