Existence, non-existence and degeneracy of limit solutions to p-Laplace problems involving Hardy potentials as p1+. The case of a critical drift
Abstract
In this paper we analyze the asymptotic behaviour as p 1+ of solutions up to \ arrayrclr -pu&=&λ|∇ u|p-2∇ u·x|x|2+ f& in ,\\ up&=&0 & on ∂, array. where is a bounded open subset of RN with Lipschitz boundary containing the origin, λ∈R, and f is a nonnegative datum in LN,∞(). As a consequence, under suitable smallness assumptions on f and λ, we show sharp existence results of bounded solutions to the Dirichlet problems cases - 1 u = λD u|D u|· x|x|2+f & in\, , u=0 & on\ ∂ , cases where 1u=div\,(Du|Du|) is the 1-Laplacian operator. The case of a generic drift term in LN,∞() is also considered. Explicits examples are given in order to show the optimality of the main assumptions on the data.
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