Infinitely many solutions for a H\'enon-type system in hyperbolic space

Abstract

This paper is devoted to study the semilinear elliptic system of H\'enon-type eqnarray* -BNu= K(d(x))Qu(u,v) \\ -BNv= K(d(x))Qv(u,v) eqnarray* in the hyperbolic space BN, N≥ 3, where u, v ∈ Hr1(BN)=\φ∈ H1(BN): φ\, is radial\ and -BN denotes the Laplace-Beltrami operator on BN, Q ∈ C1(R× R,R) is a p-homogeneous function, d(x)=dBN(0,x) and K≥0 is a continuous function. We prove a compactness result and together with the Clark's theorem we establish the existence of infinitely many solutions.