Large solutions of semilinear equations with Hardy potential
Abstract
We consider equations of the form -Lμ u +f(u)=0 in a smooth domain , where Lμ= + μδ-2 and δ(x) denotes the distance of the point x to the boundary of the domain. The nonlinear term f is positive, increasing and convex on (0,∞), satisfies the Keller-Osserman condition and some additional technical assumptions. The conditions are satisfied, in particular, by power and exponential nonlinearities. We discuss the question of existence and uniqueness of large solutions when μ>0.
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