Second Order Viability Problems for Differential Inclusions

In this paper the existence of Lyapunov functions for second-order differential inclusions is analyzed by using the methodology of the Viability Theory. A necessary assumption on the initial states and sufficient conditions for the existence of local and global Lyapunov functions are obtained. An ap

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

## 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.

## Abstract We consider a nonlinear second order differential inclusion driven by the scalar __p__‐Laplacian and with nonlinear multivalued boundary conditions. Assuming the existence of an ordered pair of upper‐lower solutions and using truncation and penalization techniques together with Zorn's l

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.