Second-order necessary conditions for differential–difference inclusion problems

We study an optimal control problem given by hyperbolic differential inclusions with boundary conditions and endpoint constraints. An approach concerning second-order optimality conditions is proposed.

In this paper, we study periodic problems for second-order differential inclusions in R N with a maximal monotone term. The nonlinear differential operator is not necessarily homogeneous, does not obey any growth condition and incorporates as a special case the one-dimensional p-Laplacian. Using tec

Consider the second order nonlinear neutral differential equation with delays: Ž . w . E d rdt y t y py t y q q t f y t y s 0, for t g 0, ϱ , where Ž . Ž . Ž . Ž . q t , f x are continuous functions, q t G 0, yf y ) 0 if y / 0, and 0p -1, Ž . ) 0, ) 0. When f y satisfies either the superlinear or

## Abstract We study the existence of __W__^2,1^ solutions for singular and nonsmooth initial value problems of the type equation image where__T__ > 0 is a priori fixed, __x__~0~, __x__~1~ ∈ ℝ, and __F__: [0, __T__ ] × ℝ → 𝒫(ℝ) \ {∅︁} is a multivalued mapping. (© 2007 WILEY‐VCH Verlag GmbH & Co.