New Trends in General Variational Inequalities

Abstract: It is well known that general variational inequalities provide us with a unified, natural, novel and simple framework to study a wide class of unrelated problems, which arise in pure and applied sciences. In this paper, we present a number of new and known numerical techniques for solving general variational inequalities and equilibrium problems using various techniques including projection, Wiener-Hopf equations, dynamical systems, the auxiliary principle and the penalty function. General variational-like ine… Show more

“…Remark 3.2 For variational inequality problem, this kind of method is firstly appeared in Noor [18,19,22] Lemma 3.3 ([14]) Linesearch (3.1) stops after finitely many steps.…”

“…It is well known that (1.1) is equivalent to the problem of finding the zero of subdifferentials of f + g at x. This problem is called the variational inclusion problem, see [19]. We denote by argmin(f + g) the solution set of (1.1).…”

Novel forward–backward algorithms for optimization and applications to compressive sensing and image inpainting

“…Remark 3.2 For variational inequality problem, this kind of method is firstly appeared in Noor [18,19,22] Lemma 3.3 ([14]) Linesearch (3.1) stops after finitely many steps.…”

“…It is well known that (1.1) is equivalent to the problem of finding the zero of subdifferentials of f + g at x. This problem is called the variational inclusion problem, see [19]. We denote by argmin(f + g) the solution set of (1.1).…”

Novel forward–backward algorithms for optimization and applications to compressive sensing and image inpainting

“…Clearly every strongly convex function is a convex function, but the converse is not true. For the applications of strongly convex functions in variational inequalities, differential equations and equilibrium problems, see [6,7,8,11,12,13,14,15,16,19,20,22,24] and the references therein.…”

“…The log-parallelogram law (5.2) characterizes the inner product spaces involving exponentially biconvex function. Also, see [6,20] for the derivation and other properties of the inner product spaces.…”

“…It is an interesting problem to study the existences of a solution of the log-bivariational inequalities and develop some numerical methods. For the applications, formulations, numerical methods and other aspects of variational inequalities, see [7,8,15,16,17,19,20,24] and the references therein…”

Strongly log-biconvex Functions and Applications

Characterizations of Higher Order Strongly Generalized Convex Functions