A variational method for eigenvalue problems nonlinearly dependent on the spectral parameter

A nonlinear spectral problem for a Sturm -Liouville equation The spectral parameter X is varying in an interval A and p ( z , A), q(s, A) are real, continuous functions on [a, b] x A. Some criteria to the eigenvalue accumulation at the endpoints of A will be established. The results are applied to

## Abstract We consider the nonlinear two–parameter problem __u__″(__x__) + __μu__(__x__)^__p__^ = __λu__(__x__)^__p__^, __u__(__x__) > 0, __x__ ∈ __I__ = (0, 1), __u__(0) = __u__(1) = 0, where 1 < __q__ < __p__ < 2__q__ + 3 and __λ__, __μ__ > 0 are parameters. We establish the three–term spect

In this paper we generalize recent theoretical results on the local continuation of parameter-dependent nonlinear variational inequalities. The variational inequalities are rather general and describe, for example, the buckling of beams, plates or shells subject to obstacles. Under a technical hypot