Failure of the Hopf-Oleinik lemma for a linear elliptic problem with singular convection of non-negative divergence
Abstract
In this paper we study existence, uniqueness, and integrability of solutions to the Dirichlet problem -div( M(x) ∇ u ) = -div (E(x) u) + f in a bounded domain of RN with N 3. We are particularly interested in singular E with div E 0. We start by recalling known existence results when |E| ∈ LN that do not rely on the sign of div E . Then, under the assumption that div E 0 distributionally, we extend the existence theory to |E| ∈ L2. For the uniqueness, we prove a comparison principle in this setting. Lastly, we discuss the particular cases of E singular at one point as Ax /|x|2, or towards the boundary as div E dist(x, ∂ )-2-α. In these cases the singularity of E leads to u vanishing to a certain order. In particular, this shows that the Hopf-Oleinik lemma, i.e. ∂ u / ∂ n < 0, fails in the presence of such singular drift terms E.
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