Large solutions for nonlinear parabolic equations without absorption terms
Abstract
In this paper we give a suitable notion of entropy solution of parabolic p-laplacian type equations with 1≤ p<2 which blows up at the boundary of the domain. We prove existence and uniqueness of this type of solutions when the initial data is locally integrable (for 1<p<2) or integrable (for p=1; i.e the Total Variation Flow case).
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