Two new fixed point iterative schemes for absolute value equations
From MaRDI portal
Publication:2111558
DOI10.1007/s13160-022-00526-xOpenAlexW4286559769MaRDI QIDQ2111558
Publication date: 17 January 2023
Published in: Japan Journal of Industrial and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s13160-022-00526-x
Numerical mathematical programming methods (65K05) Nonlinear programming (90C30) Complementarity and equilibrium problems and variational inequalities (finite dimensions) (aspects of mathematical programming) (90C33)
Related Items (2)
A projection-based derivative free DFP approach for solving system of nonlinear convex constrained monotone equations with image restoration applications ⋮ On analysis of fractional order HIV infection model with the adaptive immune response under Caputo operator
Cites Work
- Unnamed Item
- 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
- Minimum norm solution of the absolute value equations via simulated annealing algorithm
- A generalized Newton method for absolute value equations
- Global and finite convergence of a generalized Newton method for absolute value equations
- Solution of nonsymmetric, linear complementarity problems by iterative methods
- Unified smoothing functions for absolute value equation associated with second-order cone
- On developing a stable and quadratic convergent method for solving absolute value equation
- SOR-like iteration method for solving absolute value equations
- A note on 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
- Matrix multisplitting Picard-iterative method for solving generalized absolute value matrix equation
- The new iteration algorithm for absolute value equation
- 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
- On equivalent reformulations for absolute value equations
- The new iteration methods for solving absolute value equations.
- Modulus-based matrix splitting iteration methods for linear complementarity problems
- The Linear Complementarity Problem
- A theorem of the alternatives for the equationAx+B|x| =b
- TWO CSCS-BASED ITERATION METHODS FOR SOLVING ABSOLUTE VALUE EQUATIONS
This page was built for publication: Two new fixed point iterative schemes for absolute value equations
