Vector spaces and linear inequalities

## ABSTRACT It is well‐known that, under certain conditions, network equilibrium, optimization and variational inequality problems are equivalent. Hence, solution algorithms to solve any of the three problems can be used to solve the other problems. Vector network equilibrium problems lead to analo

This paper will present some results on quasivariational inequality {C, E , P , 'p} in topological linear locally convex Hausdorff spaces. We shall be concerning with quasivariatioiial inequalities defined on subsets which are convexe closed, or only closed. The compactness of the subset C is replac

## Abstract We study the behaviour of moments of order __p__ (1 < __p__ < ∞) of affine and quadratic forms with respect to non log‐concave measures and we obtain an extension of Khinchine–Kahane inequality for new families of random vectors by using Pisier's inequalities for martingales. As a conse

We develop a simple geometry free context where one can formulate and prove general forms of Gehring's Lemma. We show how our result follows from a general inverse type reiteration theorem for approximation spaces.

In this paper we consider the class of s-Orlicz convex functions defined on a s-Orlicz convex subset of a real linear space. Some inequalities of Jensen's type for this class of mappings are pointed out.