English

Restarted Hessenberg method for solving shifted nonsymmetric linear systems

Numerical Analysis 2021-03-16 v6

Abstract

It is known that the restarted full orthogonalization method (FOM) outperforms the restarted generalized minimum residual (GMRES) method in several circumstances for solving shifted linear systems when the shifts are handled simultaneously. Many variants of them have been proposed to enhance their performance. We show that another restarted method, the restarted Hessenberg method [M. Heyouni, M\'ethode de Hessenberg G\'en\'eralis\'ee et Applications, Ph.D. Thesis, Universit\'e des Sciences et Technologies de Lille, France, 1996] based on Hessenberg procedure, can effectively be employed, which can provide accelerating convergence rate with respect to the number of restarts. Theoretical analysis shows that the new residual of shifted restarted Hessenberg method is still collinear with each other. In these cases where the proposed algorithm needs less enough CPU time elapsed to converge than the earlier established restarted shifted FOM, weighted restarted shifted FOM, and some other popular shifted iterative solvers based on the short-term vector recurrence, as shown via extensive numerical experiments involving the recent popular applications of handling the time fractional differential equations.

Keywords

Cite

@article{arxiv.1507.08141,
  title  = {Restarted Hessenberg method for solving shifted nonsymmetric linear systems},
  author = {Xian-Ming Gu and Ting-Zhu Huang and Guojian Yin and Bruno Carpentieri and Chun Wen and Lei Du},
  journal= {arXiv preprint arXiv:1507.08141},
  year   = {2021}
}

Comments

19 pages, 7 tables. Some corrections for updating the references

R2 v1 2026-06-22T10:21:32.352Z