Global Marcinkiewicz estimates for nonlinear parabolic equations with nonsmooth coefficients

Abstract

Consider the parabolic equation with measure data equation* \ aligned &ut- div a(D u,x,t)=μ&in& T, &u=0 &on& ∂pT, aligned. equation* where is a bounded domain in Rn, T=× (0,T), ∂pT=(∂× (0,T)) (×\0\), and μ is a signed Borel measure with finite total mass. Assume that the nonlinearity a satisfies a small BMO-seminorm condition, and is a Reifenberg flat domain. This paper proves a global Marcinkiewicz estimate for the SOLA (Solution Obtained as Limits of Approximation) to the parabolic equation.