On the solutions of nonlocal 1-Laplacian equation with L1-data

Abstract

We study the solutions to a nonlocal 1-Laplacian equation given by 2P.V.∫RNu(x)-u(y)|u(x)-u(y)| dy|x-y|N+s=f(x) for x∈ , with Dirichlet boundary condition u(x)=0 in RN and nonnegative L1-data. By investigating the asymptotic behaviour of renormalized solutions up to the nonlocal p-Laplacian equations as p goes to 1+, we introduce a suitable definition of solutions and prove that the limit function u of \up\ is a solution of the nonlocal 1-Laplacian equation above.

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