Exact Multiplicity Results for a Class of Boundary-Value Problems with Cubic Nonlinearities

In this paper, we establish existence and multiplicity results for the problem Ž . Ž. w x Ž . Ž . xЉ q x q f t, x, xЈ s s t a.e. in 0, ; x 0 s x s ␥ , under the Ambrosetti᎐Prodi type condition, with f being a Caratheodory function.

## Consider the Dirichlet boundary value problem ) u=0, on 0, where 0 is a bounded domain R N and \* 1 is the first eigenvalue of &2 in 0, under Dirichlet boundary conditions. Let . 1 be the corresponding eigenfunction. Such a resonance problem is easy to deal with if the potential G(x, u)= | u 0

## Abstract Let us consider the boundary‐value problem equation image where __g__: ℝ → ℝ is a continuous and __T__ ‐periodic function with zero mean value, not identically zero, (__λ__, __a__) ∈ ℝ^2^ and $ \tilde h $ ∈ __C__ [0, __π__ ] with ∫^__π__^ ~0~ $ \tilde h $(__x__) sin __x dx__ = 0. If _