Saddle Point Non-Singular Value Solution Based on Generalized Inverse Hermitian Triangulation and Split Iteration
- DOI
- 10.2991/wartia-16.2016.6How to use a DOI?
- Keywords
- Saddle point system, Split iteration, Generalized anti Hermitian, Convergence, Non-singular
- Abstract
In order to achieve the nonsingular solution of saddle point linear system, this paper proposes an improved nonlinear Uzawa splitting iteration method, and combined with the generalized anti Hermitian triangle method, the algorithm is further modified, to improves the convergence of the algorithm. Finally, using the GMRES method and block diagonal Hermitian constraints carry out solve for the saddle point linear system, and then this paper can obtain the comparison results of saddle point coefficient matrix spectrum and calculation speed and accuracy. It can be seen from the calculation results that combined with the generalized inverse Hermitian triangulation method, the modified nonlinear Uzawa splitting iteration method has faster calculation speed and better convergence.
- Copyright
- © 2016, the Authors. Published by Atlantis Press.
- Open Access
- This is an open access article distributed under the CC BY-NC license (http://creativecommons.org/licenses/by-nc/4.0/).
Cite this article
TY - CONF AU - Juan Li PY - 2016/05 DA - 2016/05 TI - Saddle Point Non-Singular Value Solution Based on Generalized Inverse Hermitian Triangulation and Split Iteration BT - Proceedings of the 2016 2nd Workshop on Advanced Research and Technology in Industry Applications PB - Atlantis Press SP - 26 EP - 30 SN - 2352-5401 UR - https://doi.org/10.2991/wartia-16.2016.6 DO - 10.2991/wartia-16.2016.6 ID - Li2016/05 ER -