The Dirichlet problem for the $1$-Laplacian with a general singular term and $L^1$-data
see attached file
nonlinear elliptic equations
Finite and Infinite energy solutions of singular elliptic problems: existence and uniqueness
We establish existence and uniqueness of solution for the homogeneous Dirichlet problem associated to a fairly general class of elliptic equations modeled by
$$
-\Delta u= h(u){f} \ \ \text{in}\,\ \Omega,
$$
where $f$ is an irregular datum, possibly a measure, and $h$ is a continuous function that may blow up at zero. We also provide regularity results on both the solution and the lower order term depending on the regularity of the data, and we discuss their optimality.
A uniqueness result for a singular elliptic equation with gradient term
.