The Sattinger iteration method for 1-Laplace type problems and its application to concave-convex nonlinearities

Abstract

In this paper we extend the classical sub-supersolution Sattinger iteration method to 1-Laplace type boundary value problems of the form equation* cases -Δ1 u = F(x,u) & in\;Ω,\\ u=0 & on\;∂Ω, cases equation* where Ω is an open bounded domain of RN (N≥ 2) with Lipschitz boundary and F(x,s) is a Caratheódory function. This goal is achieved through a perturbation method that overcomes structural obstructions arising from the presence of the 1-Laplacian and by proving a weak comparison principle for these problems. As a significant application of our main result we establish existence and non-existence theorems for the so-called ``concave-convex'' problem involving the 1-Laplacian as leading term.

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