Superlinear Sturm-Liouville problems

We consider the nonlinear Sturm-Liouville problem (1) where p ∈ C 1 [0; ], q ∈ C 0 [0; ], with p(x) ¿ 0, x ∈ [0; ], and c 2 i0 + c 2 i1 ¿ 0, i =0; 1. We suppose that f : [0; ] × R 2 → R is continuous and there exist increasing functions l ; u : [0; ∞) → R, and a constant B, such that limt→∞ l (t)

We consider the nonlinear Sturm-Liouville problem where with p(x) ¿ 0 for all x ∈ [0; ]; c 2 i0 + c 2 i1 ¿ 0, i = 0; 1; h ∈ L 2 (0; ). We suppose that f : [0; ] × R → R is continuous and there exist increasing functions l ; u : [0; ∞) → R, and positive constants A, B, such that limt→∞ l (t) = ∞ an

We consider a Sturm -Liouville operator Lu = -(r(t)u ) +p(t)u, where r is a (strictly) positive continuous function on ]a, b[ and p is locally integrable on ]a, b[ . Let r 1 (t) = t a (1/r) ds and choose any c ∈ ]a, b[ . We are interested in the eigenvalue problem Lu = λm(t)u, u(a) = u(b) = 0, and t