Convergence-accelerated fixed-time dynamical methods for absolute value equations
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Publication:6636803
DOI10.1007/S10957-024-02525-ZMaRDI QIDQ6636803
Xu Zhang, Yaling Hu, Longcheng Zhang, Zheng Peng, Cailian Li
Publication date: 12 November 2024
Published in: Journal of Optimization Theory and Applications (Search for Journal in Brave)
Numerical mathematical programming methods (65K05) Numerical optimization and variational techniques (65K10) Complementarity and equilibrium problems and variational inequalities (finite dimensions) (aspects of mathematical programming) (90C33)
Cites Work
- Title not available (Why is that?)
- The Picard-HSS iteration method for absolute value equations
- A globally and quadratically convergent method for absolute value equations
- A dynamic model to solve the absolute value equations
- Absolute value equations
- Inexact operator splitting methods with selfadaptive strategy for variational inequality problems
- A semismooth equation approach to the solution of nonlinear complementarity problems
- A generalization of the Gauss-Seidel iteration method for solving absolute value equations
- SOR-like iteration method for solving absolute value equations
- Inexact implicit methods for monotone general variational inequalities
- A continuation method for monotone variational inequalities
- Minimum norm solution to the absolute value equation in the convex case
- A new look at smoothing Newton methods for nonlinear complementarity problems and box constrained variational inequalities
- Neural network based on systematically generated smoothing functions for absolute value equation
- An inverse-free dynamical system for solving the absolute value equations
- Continuous distributed algorithms for solving linear equations in finite time
- A dynamical system for strongly pseudo-monotone equilibrium problems
- Sign projected gradient flow: a continuous-time approach to convex optimization with linear equality constraints
- Levenberg-Marquardt method for solving systems of absolute value equations
- On the SOR-like iteration method for solving absolute value equations
- Solving absolute value equation using complementarity and smoothing functions
- Error bounds and a condition number for the absolute value equations
- Modulus-based matrix splitting iteration methods for linear complementarity problems
- The Linear Complementarity Problem
- Error Bound and Convergence Analysis of Matrix Splitting Algorithms for the Affine Variational Inequality Problem
- Engineering and Economic Applications of Complementarity Problems
- Global and superlinear convergence of the smoothing Newton method and its application to general box constrained variational inequalities
- A Positive Algorithm for the Nonlinear Complementarity Problem
- Finite-Time Stability of Continuous Autonomous Systems
- A modified fixed point iteration method for solving the system of absolute value equations
- Distributed Computation of Linear Matrix Equations: An Optimization Perspective
- A Combined Smoothing and Regularization Method for Monotone Second-Order Cone Complementarity Problems
- A projection neural network and its application to constrained optimization problems
- Nonlinear Feedback Design for Fixed-Time Stabilization of Linear Control Systems
- Exact and inexact Douglas–Rachford splitting methods for solving large-scale sparse absolute value equations
- Global projection-type error bounds for general variational inequalities
- Neurodynamic optimization approaches with finite/fixed-time convergence for absolute value equations
- A New Fixed-Time Dynamical System for Absolute Value Equations
- A modified inverse-free dynamical system for absolute value equations
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