Translativity for Strong Borel Summability

Lee Lorch

doi:10.4153/CMB-1966-077-5

Translativity for Strong Borel Summability

Published online by Cambridge University Press: 20 November 2018

Lee Lorch

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Lee Lorch*: Affiliation:
Summer Research Institute, Canadian Mathematical Congress, University of Alberta, Edmonton, Alberta

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It is an obvious property of convergence that implies that sn+k exists and equals s for k = -1 (left translativity ) and for k = 1 (right translativity). Not so for sumrnability.

Type: Research Article
Information: Canadian Mathematical Bulletin , Volume 9 , Issue 5 , December 1966 , pp. 639 - 645

DOI: https://doi.org/10.4153/CMB-1966-077-5 [Opens in a new window]
Copyright: Copyright © Canadian Mathematical Society 1966

References

1. Gaier, D., Zur Frage der Indexverschiebung beim Borel-Verfahren, Math. Zeitschr. vol. 58 (1953), pages 453-455.Google Scholar

2. Garten, V., Űber den Einfluss endlich vieler Anderungen auf das Borelsche Limitierungsverfahren. Math. Zeitschr. vol. 40 (1936), pages 756-759.Google Scholar

3. Hardy, G. H., Divergent Series. (1949).Google Scholar

4. Karamata, J., Űber die Indexverschiebung beim Borelschen Limitierungsverfahren. Math. Zeitschr., vol. 45 (1939), pages 635-641.Google Scholar

5. Polya, G., Űber die kleinsten ganzen Funktionen, der en samtliche Derivierten im Punkte z=0 ganzzahlig sind. Tohoku Mathematical Journal, vol. 19 (1921), pages 65-69.Google Scholar

6. Szász, O., On the product of two summability methods. Ann. Soc. Polon. Math. vol. 25 (1952), pages 75-84.Google Scholar

7. Widder, D.V., Advanced Calculus. 2d. éd., (1961).Google Scholar

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Canadian Mathematical Bulletin , Volume 10 , Issue 1

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