Showing total 4 results

1. Solution Methods for Pseudomonotone Variational Inequalities.

Author

Tam, N. N., Yao, J. C., and Yen, N. D.

Subjects

VARIATIONAL inequalities (Mathematics), CALCULUS of variations, DIFFERENTIAL inequalities, STOCHASTIC convergence, MATHEMATICAL functions, MATHEMATICAL inequalities, MONOTONE operators, OPERATOR theory, MATHEMATICS

Abstract

We extend some results due to Thanh-Hao (Acta Math. Vietnam. 31: 283-289, 2006) and Noor (J. Optim. Theory Appl. 115:447-452, 2002). The first paper established a convergence theorem for the Tikhonov regularization method (TRM) applied to finite-dimensional pseudomonotone variational inequalities (VIs), answering in the affirmative an open question stated by Facchinei and Pang (Finite- Dimensional Variational Inequalities and Complementarity Problems, Springer, New York, 2003). The second paper discussed the application of the proximal point algorithm (PPA) to pseudomonotone VIs. In this paper, new facts on the convergence of TRM and PPA (both the exact and inexact versions of PPA) for pseudomonotone VIs in Hilbert spaces are obtained and a partial answer to a question stated in (Acta Math. Vietnam. 31:283-289, 2006) is given. As a byproduct, we show that the convergence theorem for inexact PPA applied to infinite-dimensional monotone variational inequalities can be proved without using the theory of maximal monotone operators. [ABSTRACT FROM AUTHOR]

Published

2008

2. Well-Posedness and L-Well-Posedness for Quasivariational Inequalities.

Author

Lignola, M. B.

Subjects

MATHEMATICAL inequalities, FIXED point theory, NONLINEAR operators, MATHEMATICAL mappings, OPERATOR theory, FUNCTIONAL analysis, MATHEMATICAL functions, TOPOLOGY, MATHEMATICS

Abstract

In this paper, two concepts of well-posedness for quasivariational inequalities having a unique solution are introduced. Some equivalent characterizations of these concepts and classes of well-posed quasivariational inequalities are presented. The corresponding concepts of well-posedness in the generalized sense are also investigated for quasivariational inequalities having more than one solution. [ABSTRACT FROM AUTHOR]

Published

2006

3. Cyclic Hypomonotonicity, Cyclic Submonotonicity, and Integration.

Author

Daniilidis, A., Georgiev, P., and Crouzeix, J. P.

Subjects

MATHEMATICAL optimization, MATHEMATICAL inequalities, SUBDIFFERENTIALS, MONOTONIC functions, FUNCTIONAL integration, MATHEMATICS, MATHEMATICAL analysis, MATHEMATICAL functions

Abstract

Rockafellar has shown that the subdifferentials of convex functions are always cyclically monotone operators. Moreover, maximal cyclically monotone operators are necessarily operators of this type, since one can construct explicitly a convex function, which turns out to be unique up to a constant, whose subdifferential gives back the operator. This result is a cornerstone in convex analysis and relates tightly convexity and monotonicity. In this paper, we establish analogous robust results that relate weak convexity notions to cor- responding notions of weak monotonicity, provided one deals with locally Lipschitz functions and locally bounded operators. In particular, the subdifferentials of locally Lipschitz functions that are directionally hypomonotone [respectively, directionally submonotone] enjoy also an additional cyclic strengthening of this notion and in fact are maximal under this new property. Moreover, every maximal cyclically hypomonotone [respectively, maximal cyclically submonotone] opera- tor is always the Clarke subdifferential of some directionally weakly convex [respectively, directionally approximately convex] locally Lipschitz function, unique up to a constant, which in finite dimentions is a lower C² function [respectively, a lower C¹ function]. [ABSTRACT FROM AUTHOR]

Published

2004

4. Existence Theorem for the Discontinuous Generalized Quasivariational Inequality Problem.

Author

Cubiotti, P.

Subjects

VARIATIONAL inequalities (Mathematics), EXISTENCE theorems, MATHEMATICAL inequalities, MATHEMATICS, MATHEMATICAL functions, BANACH spaces

Abstract

We consider the following generalized quasivariational inequality problem: given a real Banach space E with topological dual E[sup *] and given two multifunctions G:X →2[sup X] and F:X →2E[sup *], find (○, &ψcirc;) ∈X×E[sup *] such that ○ ∈ G(○), &ψcirc; ∈ F(○), 〈φcirc; ○ - y) ≤ 0, for all y ∈ G(○). We prove an existence theorem where F is not assumed to have any continuity or monotonicity property. Making use of a different technical construction, our result improves some aspects of a recent existence result (Theorem 3.1 of Ref. 1). In particular, the coercivity assumption of this latter result is weakened meaningfully. [ABSTRACT FROM AUTHOR]

Published

2003