Applications of Some Formulae by Hermite to the Approximation of Exponentials and Logarithms

  • K. Mahler

Abstract

While Liouville gave the first examples of transcendental numbers, the modern theory of proofs of transcendency started with Hermite’s beautiful paper “Sur la fonction exponentielle” (Hermite, 1873). In this paper, for a given system of distinct complex numbers ω 0, ω 1, ..., ω m , and of positive integers ϱ 0, ϱ 1,... , ϱ m with the sum σ, Hermite constructed a set of m + 1 polynomials
of degrees not exceeding σϱ 0, σϱ 1, ..., σϱ m , respectively, such that all the functions
vanish at z = 0 at least to the order σ + 1. On putting z = 1, these formulae produce simultaneous rational approximations of the numbers 1, e, e 2, ..., e m that are so good that they imply the linear independence of these numbers and hence the transcendency of e.

Keywords

Positive Integer Integral Coefficient Large Positive Integer Transcendental Number Gaussian Integer 
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.

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References

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Copyright information

© Springer Science+Business Media New York 1997

Authors and Affiliations

  • K. Mahler
    • 1
  1. 1.Institute of Advanced StudiesAustralian National UniversityCanberraAustralia

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