Symmetry and convexity of level sets of solutions to $Delta_infty u+f(u)=0$

We consider the equation −infinity-Laplacian(u) = f(u) in a domain Omega with zero Dirichlet condition. where f is a nonnegative continuous function. We investigate whether the solutions to this equation inherit geometrical properties from the domain. We obtain results concerning convexity of level sets and symmetry of solutions.