Regularity estimates for singular parabolic measure data problems with sharp growth

Abstract

We prove global gradient estimates for parabolic p-Laplace type equations with measure data, whose model is ut - div (|Du|p-2 Du) = μ in \ × (0,T) ⊂ Rn × R, where μ is a signed Radon measure with finite total mass. We consider the singular case 2nn+1 <p 2-1n+1 and give possibly minimal conditions on the nonlinearity and the boundary of , which guarantee the regularity results for such measure data problems.