Existence of solutions for 1-laplacian problems with singular first order terms

Abstract

We prove existence of solutions to the following problem equation* cases -1 u +g(u)|Du|=h(u)f & in , \\ u=0 & on ∂, cases equation* where ⊂ RN, with N2, is an open and bounded set with Lipschitz boundary, g is a continuous and positive function which possibly blows up at the origin and bounded at infinity and h is a continuous and nonnegative function bounded at infinity (possibly blowing up at the origin) and finally 0 f ∈ LN(). As a by-product, this paper extends the results found where g is a continuous and bounded function. \ investigate the interplay between g and h in order to have existence of solutions.

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