Elliptic equations involving the 1-Laplacian and a total variation term with L^{N,\infty}-data

Abstract

In this paper we study, in an open bounded set with Lipschitz boundary, the Dirichlet problem for a nonlinear singular elliptic equation involving the 1--Laplacian and a total variation term, that is, the inhomogeneous case of the equation appearing in the level set formulation of the inverse mean curvature flow. Our aim is twofold. On the one hand, we consider data belonging to the Marcinkiewicz space with a critical exponent, which leads to unbounded solutions. So, we have to begin introducing the suitable notion of unbounded solution to this problem. Moreover, examples of explicit solutions are shown. On the other hand, this equation allows us to deal with many related problems having a different gradient term which depend on a function g. It is known that the total variation term induces a regularizing effect on existence, uniqueness and regularity. We focus on analyzing whether those features remain true when general gradient terms are taken. Roughly speaking, the bigger g, the better the properties of the solution.