Abstract
This paper aims to study feasible Barzilai–Borwein (BB)-like methods for extreme symmetric eigenvalue problems. For the two-dimensional case, we establish the local superlinear convergence result of FLBB, FSBB, FABB, and FADBB algorithms. A counter-example is also given, showing that the algorithms may cycle or stop at a non-stationary point. In order to circumvent the difficulty, we propose a safeguard in choosing the stepsize. We also adopt an adaptive non-monotone line search with an improved line search to ensure the global convergence of AFBB-like methods. Numerical experiments on a set of test problems from UF Sparse Matrix Collection demonstrate that, comparing several available codes including eigs, irbleigs and jdcg, AFBB-like methods are very useful for large-scale sparse extreme symmetric eigenvalue problems.
Acknowledgements
The authors thank the two anonymous referees for their many useful comments, which improves the quality of this paper greatly. This work was partly supported by the Chinese NSF grant (no. 10831106), the CAS grant (no. kjcx-yw-s7-03) and the China National Funds for Distinguished Young Scientists (no. 11125107).
Notes
The irbleigs code is available at http://www.math.uri.edu/ jbaglama/# Software.
The jdcg code is available at http://mntek3.ulb.ac.be/pub/docs/jdcg/.