Infinitely many solutions for a class of elliptic boundary value problems with (p,q)-Kirchhoff type

Abstract

In this paper, we investigate the existence of infinitely many solutions for the following elliptic boundary value problem with (p,q)-Kirchhoff type eqnarray* cases -[M1(∫|∇ u1|p dx)]p-1p u1+[M3(∫ a1(x)|u1|p dx)]p-1a1(x)|u1|p-2u1=Gu1(x,u1,u2)\ \ in , -[M2(∫|∇ u2|q dx)]q-1q u2+[M4(∫ a2(x)|u2|q dx)]q-1a2(x)|u2|q-2u2=Gu2(x,u1,u2)\ \ in , u1=u2=0\ \ \ on ∂. cases eqnarray* By using a critical point theorem due to Ding in [Y. H. Ding, Existence and multiplicity results for homoclinic solutions to a class of Hamiltonian systems. Nonlinear Anal, 25(11)(1995)1095-1113], we obtain that system has infinitely many solutions under the sub-(p,q) conditions.

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