Infinitely Many Solutions For An Elliptic System With Nonlinear Boundary Conditions

JULIAN FERNANDEZ BONDER; PINASCO, JUAN PABLO; ROSSI, JULIO DANIEL

ELECTRONIC JOURNAL OF DIFFERENTIAL EQUATIONS

TEXAS STATE UNIVERSITY

Año: 2001 vol. 6 p. 141 - 154

1072-6691

In this paper we prove the existence of infinitely many nontrivial solutions of the system ¢u = u; ¢v = v; with nonlinear coupling at the smooth boundary of a bounded domain of RN. The proof, under suitable assumptions on the Hamiltonian, is based on variational arguments and on the Fountain Theorem of the critical point theory.