Semilinear elliptic equations involving power nonlinearities and hardy potentials with boundary singularities
Abstract
Let ⊂RN (N≥ 3) be a C2 bounded domain and ⊂ ∂ be a C2 compact submanifold without boundary, of dimension k, 0≤ k ≤ N-1. We assume that = \0\ if k = 0 and =∂ if k=N-1. Denote d(x)=dist(x,) and put Lμ= + μ d-2 where μ is a parameter. In this paper, we study boundary value problems for equations -Lμ u |u|p-1u = 0 in with prescribed condition u= on ∂ , where p>1 and is a given measure on ∂ . The nonlinearity |u|p-1u is referred to as absorption or source depending whether the plus sign or minus sign appears. The distinctive feature of the problems is characterized by the interplay between the concentration of , the type of nonlinearity, the exponent p and the parameter μ. The absorption case and the source case are sharply different in several aspects and hence require completely different approaches. In each case, we establish various necessary and sufficient conditions expressed in terms of appropriate capacities. In comparison with related works in the literature, by employing a fine analysis, we are able to treat the supercritical ranges for the exponent p, and the critical case for the parameter μ, which justifies the novelty of our paper.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.