Higher regularity of solutions to the singular p-Laplacean parabolic system
Abstract
We study existence and regularity properties of solutions to the singular p-Laplacean parabolic system in a bounded domain . The main purpose is to prove global Lr(,T;Lq()), ≥0, integrability properties of the second spatial derivatives and of the time derivative of the solutions. Hence, for suitable p and exponents r,\,q, by Sobolev embedding theorems, we deduce global regularity of u and ∇ u in H\"older spaces. Finally we prove a global pointwise bound for the solution under the assumption p>2nn+2.
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