On a p-Laplace Neumann problem with asymptotically asymmetric perturbations

The solvability of a p-Laplace Neumann problem with asymptotically asymmetric perturbations was studied. The upper and lower bounds of the problem were defined and it was proved that the problem had at least one solution. The results showed that the interaction of the function f with the principal eigenvalue λ1 was controlled by means of a pair of upper and lower solutions, and its interaction with the first nontrivial branch was controlled by an asymptotic condition involving a primitive of f.