Higher-Order Generalized Invexity and Duality in Mathematical Programming

In this paper, we consider a class of nonsmooth multiobjective fractional programming problems in which functions are locally Lipschitz. We establish generalized Karush-Kuhn-Tucker necessary and sufficient optimality conditions and derive duality theorems for nonsmooth multiobjective fractional prog

New classes of generalized F, -convexity are introduced for vector-valued Ž . functions. Examples are given to show their relations with F, -pseudoconvex, Ž . Ž . F, -quasiconvex, and strictly F, -pseudoconvex vector-valued functions. The sufficient optimality conditions and duality results are obta

A generalized Newton method is proposed in conjunction with a higher-order Lagrangian finite element discretization of bodies undergoing finite elastic deformations. The method is based on a gradient-like modification of the Newton method, designed to suppress the sensitivity of higher-order element

Spin effects are extracted from the Lorentz-Dirac equations of motion of a point charge without the introduction of additional empirical parameters. The effective motion of the particle is distinguished from the motion of the point electron which performs a classical Zitterbewegung. Introducing para