A general descent framework for the monotone variational inequality problem
From MaRDI portal
Publication:1315420
DOI10.1007/BF01582152zbMath0813.90111OpenAlexW1970441758MaRDI QIDQ1315420
Jia Hao Wu, Patrice Marcotte, Michael Florian
Publication date: 30 May 1995
Published in: Mathematical Programming. Series A. Series B (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf01582152
Related Items
Gap functions and global error bounds for history-dependent variational-hemivariational inequalities, On the convergence of descent methods for monotone variational inequalities, Error bound results for generalized D-gap functions of nonsmooth variational inequality problems, Unconstrained optimization reformulations of variational inequality problems, Nonconvex functions and variational inequalities, Equivalence of variational inequality problems to unconstrained minimization, A class of combined iterative methods for solving variational inequalities, Modified primal path-following scheme for the monotone variational inequality problem, Convergence and error bound of a method for solving variational inequality problems via the generalized D-gap function, Error bounds of regularized gap functions for nonsmooth variational inequality problems, Models and Software for Urban and Regional Transportation Planning: The Contributions of the Center for Research on Transportation, Unnamed Item, Error bounds and finite termination for constrained optimization problems, Merit functions: a bridge between optimization and equilibria, Value functions and error bounds of trust region methods, On gap functions for quasi-variational inequalities, D-gap functions for nonsmooth variational inequality problems, Merit functions: a bridge between optimization and equilibria, A note on D-gap functions for equilibrium problems, Solving variational inequality and fixed point problems by line searches and potential optimization, Descent methods for equilibrium problems in a Banach space, Regularized gap functions for nonsmooth variational inequality problems, Gap functions and error bounds for random generalized variational inequality problems, Generalized gap functions and error bounds for generalized variational inequalities, Two error bounds for constrained optimization problems and their applications, Long-step primal path-following algorithm for monotone variational inequality problems, Unconstrained optimization reformulations of equilibrium problems, The quasi-Newton method of solution of convex variational inequalities with descent decomposition, Error bounds of regularized gap functions for polynomial variational inequalities, A continuation method for (strongly) monotone variational inequalities, Theoretical and numerical investigation of the D-gap function for box constrained variational inequalities, Unnamed Item, Difference gap functions and global error bounds for random mixed equilibrium problems, An extended descent framework for variational inequalities, A unified description of iterative algorithms for traffic equilibria, Error bounds of regularized gap functions for weak vector variational inequality problems
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Finite-dimensional variational inequality and nonlinear complementarity problems: A survey of theory, algorithms and applications
- A regularization of the Frank-Wolfe method and unification of certain nonlinear programming methods
- Accelerating the convergence of the diagonalization and projection algorithms for finite-dimensional variational inequalities
- A generalization of Brouwer's fixed point theorem
- A Sequential Linear Programming Algorithm for Solving Monotone Variational Inequalities
- Newton's Method for B-Differentiable Equations
- Linearized simplicial decomposition methods for computing traffic equilibria on networks
- A relaxed projection method for variational inequalities
- Nonlinear cost network models in transportation analysis
- Convex quadratic programming with one constraint and bounded variables
- Adaptation of a Modified Newton Method for Solving the Asymmetric Traffic Equilibrium Problem
- Projection methods for variational inequalities with application to the traffic assignment problem
- Iterative methods for variational and complementarity problems
- Generalized Gradients and Applications
- An iterative scheme for variational inequalities
- The Theory of Max-Min, with Applications
