A new shift strategy for the implicitly restarted generalized second-order Arnoldi method
For researchers using the generalized second-order Arnoldi method, this work provides an incremental improvement to the restarting process by utilizing all available shifts without structural damage.
The paper proposes a new shift strategy for the implicitly restarted generalized second-order Arnoldi method that uses all 2p candidate shifts while preserving the special structure, enhancing overall efficiency. Numerical experiments demonstrate improved efficiency per restart.
In this paper, a new shift strategy for the implicitly restarted generalized second-order Arnoldi (GSOAR) method is proposed. In implicitly restarted processes, we can get a $k$-step GSOAR decomposition from a $m$-step GSOAR decomposition by performing $p = m-k$ implicit shifted QR iterations. The problem of the implicitly restarted GSOAR is the mismatch between the number of shifts and the dimension of the subspace. There are $2p$ shifts for $p$ QR iterations. We use the shifts to filter out the unwanted information in the current subspace; when more shifts are used, one obtains a better updated subspace. But, if we use more than $p$ shifts, the structure of the GSOAR decomposition will be destroyed. We propose a novel method which can use all $2p$ candidates and preserve the special structure. The new method vastly enhances the overall efficiency of the algorithm. Numerical experiments illustrate the efficiency of every restart process.