On the existence of three non-negative solutions for a (p,q)-Laplacian system

Abstract

The present paper studies the existence of weak solutions for equation* (P) \aligned (-)s1p1 u &= f1\,(x,u,v) +g1(x,u) \, in \, , \\ (-)s2p2 v &= f2\,(x,u,v) +g2(x,v) \, in \, , \\ u=v &= 0 \,in \, , \\ aligned . equation* where ⊂ is a smooth bounded domain with smooth boundary, s1,s2 ∈ (0,1), 1<pi<Nsi, i=1,2, fi and gi has certain growth assumptions for i=1,2. We prove existence of at least three non negative solutions of ( P) under restrictive range of λ using variational methods. As a consequence, we also conclude that a similar result can be obtained when we consider a more general non local operator Lφi instead of (-)sipi in ( P).