An Acceleration Process for Iterated Vectors Generated by a Real Symmetric Matrix
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概要
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We define an acceleration process for iterated vectors generated by a matrix iterative process. We consider here an algorithm in which the acceleration process is applied once after every m+2 iterations of a matrix iterative process. Then our aim is to determine the number m (precisely m+2) required for each application of the acceleration process to be effective. Two examples are given to demonstrate the analytical results and to compare then with Jennings'acceleration process.
- 一般社団法人情報処理学会の論文
- 1995-03-15
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関連論文
- Convergence Property of Aitken's Δ^2-Process and the Applicable Acceleration Process
- Acceleration Process for a Positive Definite Iterative Matrix
- An Algorithm of an Acceleration Process Covering the Aitken's δ^2-process
- An Acceleration Process for Iterated Vectors Generated by a Real Symmetric Matrix
- On the Aitken's δ^2-process