Project overview
This project was supported by Austrian Science Fund-FWF.
We intend to achieve a breakthrough in the field of classical algorithms for solving pseudo monotone variational inequalities (VIs) and analyze their convergence properties. We also plan to investigate the close connection between numerical algorithms and continuous dynamical system for solving pseudo monotone VIs. We address the following three main objectives:
1. Convergence of the FBF method and appropriate modi cations using generalized
projections for solving VIs involving pseudo monotone operators;
2. Dynamical system approaches for solving pseudo monotone VIs;
3. Linear convergence of projection-type methods and exponential rate of the trajectories generated by dynamical systems without imposing strong pseudo monotonicity
We intend to achieve a breakthrough in the field of classical algorithms for solving pseudo monotone variational inequalities (VIs) and analyze their convergence properties. We also plan to investigate the close connection between numerical algorithms and continuous dynamical system for solving pseudo monotone VIs. We address the following three main objectives:
1. Convergence of the FBF method and appropriate modi cations using generalized
projections for solving VIs involving pseudo monotone operators;
2. Dynamical system approaches for solving pseudo monotone VIs;
3. Linear convergence of projection-type methods and exponential rate of the trajectories generated by dynamical systems without imposing strong pseudo monotonicity
Staff
Lead researchers
Collaborating research institutes, centres and groups
Research outputs
DOI:
Type: article
DOI:
Type: article