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Some Algebraic Properties Of Asymptotic Power Series

Published online by Cambridge University Press:  20 November 2018

T. E. Hull
T. E. Hull*
Affiliation:
University of British Columbia
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1. Introduction. Let us consider all power series of the form

It was shown first by Borel (1) that to each such series there corresponds a non-empty class of functions such that each function in the class has the given series as its asymptotic expansion about z = 0, the expansion being valid in a sector of the right half z-plane with vertex at the origin.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 8 , 1956 , pp. 220 - 224
Copyright
Copyright © Canadian Mathematical Society 1956

References

1. Carleman, T., Les fonctions quasianalytiques (Paris, 1926).Google Scholar
2. van der Corput, J. G., Asymptotic expansions I. Fundamental theorems of asymptotics (Univ.of California, Berkeley, 1954).Google Scholar
3. Erdélyi, A., Asymptotic expansions (Cal. Tech., Pasadena, 1955).Google Scholar
4. Poincaré, H., Sur les intégrales irregulières des équations linéaires, Acta Math., 8 (1886) 295344.Google Scholar
5. Popken, J., Asymptotic expansions from an algebraic standpoint, Nederl. Akad. Wetensch. Proc, Ser. A., 56 (Indagationes Math., 15 (1953), 131143).Google Scholar