Stability of solutions for nonlocal problems
Abstract
In this paper we deal with the stability of solutions of fractional p-Laplace problems with nonlinear sources when the fractional parameter s goes to 1. We prove a general convergence result for general weak solutions which is applied to study the convergence of ground state solutions of p-fractional problems in bounded and unbounded domains as s goes to 1. Moreover, our result applies to treat the stability of p-fractional eigenvalues as s goes to 1.
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