Gelfand type problems involving the 1-Laplacian operator

Abstract

In this paper, the theory of Gelfand problems is adapted to the 1--Laplacian setting. Concretely, we deal with the following problem equation* \arraycc -1u=λ f(u) &in \,;\\[2mm] u=0 &on ∂\,; array . equation* where ⊂RN (N1) is a domain, λ ≥ 0 and f\>:\>[0,+∞[]0,+∞[ is any continuous increasing and unbounded function with f(0)>0. It is proved the existence of a threshold λ*=h()f(0) (being h() the Cheeger constant of ) such that there exists no solution when λ>λ* and the trivial function is always a solution when λλ*. The radial case is analyzed in more detail showing the existence of multiple solutions (even singular) as well as the behaviour of solutions to problems involving the p--Laplacian as p tends to 1, which allows us to identify proper solutions through an extra condition.