Solving linear variational inequality problems by a self-adaptive projection method
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Publication:858851
DOI10.1016/j.amc.2006.06.013zbMath1110.65057OpenAlexW2025462495MaRDI QIDQ858851
Publication date: 11 January 2007
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2006.06.013
algorithmglobal convergencenumerical exampleslinear complementarity problemlinear variational inequalityprojection and contraction methods
Numerical optimization and variational techniques (65K10) Variational inequalities (49J40) Complementarity and equilibrium problems and variational inequalities (finite dimensions) (aspects of mathematical programming) (90C33)
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Cites Work
- Finite-dimensional variational inequality and nonlinear complementarity problems: A survey of theory, algorithms and applications
- On the gradient-projection method for solving the nonsymmetric linear complementarity problem
- Solution of projection problems over polytopes
- A projection and contraction method for a class of linear complementarity problems and its application in convex quadratic programming
- Solving a class of linear projection equations
- A new method for a class of linear variational inequalities
- A self-adaptive projection and contraction method for monotone symmetric linear variational inequalities.
- A class of projection and contraction methods for monotone variational inequalities
- A globally convergent Newton method for solving strongly monotone variational inequalities
- Two-Metric Projection Methods for Constrained Optimization
- Iterative methods for variational and complementarity problems
- A New Projection Method for Variational Inequality Problems
- Modified Projection-Type Methods for Monotone Variational Inequalities
- On the basic theorem of complementarity
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