Elliptic problems involving the 1--Laplacian and a singular lower order term

Abstract

This paper is concerned with the Dirichlet problem for an equation involving the 1--Laplacian operator 1 u and having a singular term of the type f(x)uγ. Here f∈ LN() is nonnegative, 0<γ1 and is a bounded domain with Lipschitz--continuous boundary. We prove an existence result for a concept of solution conveniently defined. The solution is obtained as limit of solutions of p--Laplacian type problems. Moreover, when f(x)>0 a.e., the solution satisfies those features that might be expected as well as a uniqueness result. We also give explicit 1--dimensional examples that show that, in general, uniqueness does not hold. We remark that the Anzellotti theory of L∞--divergence--measure vector fields must be extended to deal with this equation.