Schrodinger systems with a convection term for the $(p_1,...,p_d)$-Laplacian in $R^N$

The main goal is to study nonlinear Schrodinger type problems for the $(p_1,dots ,p_d)$-Laplacian with nonlinearities satisfying Keller- Osserman conditions. We establish the existence of infinitely many positive entire radial solutions by an application of a fixed point theorem and the Arzela-Ascoli theorem. An important aspect in this article is that the solutions are obtained by successive approximations and hence the proof can be implemented in a computer program.