Marcinkiewicz regularity for singular parabolic p-Laplace type equations with measure data
Abstract
We consider quasilinear parabolic equations with measurable coefficients when the right-hand side is a signed Radon measure with finite total mass, having p-Laplace type: ut - div \, a(Du,x,t) = μ in \ × (0,T) ⊂ Rn × R. In the singular range 2nn+1 <p 2-1n+1, we establish regularity estimates for the spatial gradient of solutions in the Marcinkiewicz spaces, under a suitable density condition of the right-hand side measure.
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