On some nonlinear partial differential equations involving the 1-Laplacian

Abstract

In this paper we present an approximation result concerning the first eigenvalue of the 1-Laplacian operator. More precisely, for a bounded regular open domain, we consider a minimisation of the functional ∫|∇ u|+n( ∫ |u|-1)2 over the space W01,1(). For n large enough, the infimum is achieved in some sense on BV(), and letting n go to infinity this provides an approximation of the first eigenfunction for the first eigenvalue, since the term n( ∫ |u|2-1)2 "tends" to the constraint \|u\|1=1.

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