The new iteration methods for solving absolute value equations.
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Publication:2685401
DOI10.21136/AM.2021.0055-21OpenAlexW3215258373MaRDI QIDQ2685401
Publication date: 21 February 2023
Published in: Applications of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.21136/am.2021.0055-21
linear complementarity problemiteration methodnumerical experimentmatrix splittingabsolute value equation
Nonlinear programming (90C30) Numerical computation of solutions to systems of equations (65H10) Iterative numerical methods for linear systems (65F10)
Related Items (6)
Two new iteration methods with optimal parameters for solving absolute value equations ⋮ On optimal progressive censoring schemes from models with U-shaped hazard rate: a comparison between conventional and fuzzy priors ⋮ Novel evaluation of fuzzy fractional Helmholtz equations ⋮ Computational framework of hydrodynamic stagnation point flow of nanomaterials with natural convection configured by a heated stretching sheet ⋮ The solution of a type of absolute value equations using two new matrix splitting iterative techniques ⋮ Two new fixed point iterative schemes for absolute value equations
Cites Work
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- On the global convergence of the inexact semi-smooth Newton method for absolute value equation
- The Picard-HSS iteration method for absolute value equations
- On generalized Traub's method for absolute value equations
- A globally and quadratically convergent method for absolute value equations
- IGAOR and multisplitting IGAOR methods for linear complementarity problems
- A dynamic model to solve the absolute value equations
- On the preconditioned GAOR method for a linear complementarity problem with an \(M\)-matrix
- Convergence of SSOR methods for linear complementarity problems
- Absolute value equations
- Minimum norm solution of the absolute value equations via simulated annealing algorithm
- A generalized Newton method for absolute value equations
- Solution of nonsymmetric, linear complementarity problems by iterative methods
- Solution of symmetric linear complementarity problems by iterative methods
- Unified smoothing functions for absolute value equation associated with second-order cone
- Numerical validation for systems of absolute value equations
- A generalization of the Gauss-Seidel iteration method for solving absolute value equations
- SOR-like iteration method for solving absolute value equations
- Numerical comparisons based on four smoothing functions for absolute value equation
- A note on absolute value equations
- A smoothing Newton method for absolute value equation associated with second-order cone
- A new concave minimization algorithm for the absolute value equation solution
- A new two-step iterative method for solving absolute value equations
- A special shift splitting iteration method for absolute value equation
- Numerical comparisons of smoothing functions for optimal correction of an infeasible system of absolute value equations
- On the solution of general absolute value equations
- A new SOR-like method for solving absolute value equations
- Matrix multisplitting Picard-iterative method for solving generalized absolute value matrix equation
- The new iteration algorithm for absolute value equation
- Modulus-based matrix splitting methods for horizontal linear complementarity problems
- The sparsest solution to the system of absolute value equations
- Solving absolute value equation using complementarity and smoothing functions
- An iterative method for solving absolute value equations and sufficient conditions for unique solvability
- Linear complementarity as absolute value equation solution
- Absolute value equation solution via concave minimization
- On equivalent reformulations for absolute value equations
- Modulus-based matrix splitting iteration methods for linear complementarity problems
- The Linear Complementarity Problem
- A Preconditioned AOR Iterative Method for the Absolute Value Equations
- A theorem of the alternatives for the equationAx+B|x| =b
- TWO CSCS-BASED ITERATION METHODS FOR SOLVING ABSOLUTE VALUE EQUATIONS
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