Existence and symmetry for elliptic equations in Rn with arbitrary growth in the gradient

Abstract

We study the semilinear elliptic equation u + g(x,u,Du) = 0 in n. The nonlinearities g can have arbitrary growth in u and Du, including in particular the exponential behavior. No restriction is imposed on the behavior of g(x,z,p) at infinity except in the variable x. We obtain a solution u that is locally unique and inherits many of the symmetry properties of g. Positivity and asymptotic behavior of the solution are also addressed. Our results can be extended to other domains like half-space and exterior domains. We give some examples.