Bounded weak solutions with Orlicz space data: an overview

Abstract

It is well known that non-negative solutions to the Dirichlet problem u =f in a bounded domain , where f∈ Lq(), q>n2, satisfy \|u\|L∞() ≤ C\|f\|Lq(). We generalize this result by replacing the Laplacian with a degenerate elliptic operator, and we show that we can take the data f in an Orlicz space LA() that, in the classical case, lies strictly between Ln2() and Lq(), q>n2.

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