Harald Hofstätter
Published 2020-10-07Version 1
For the computation of terms of the Baker-Campbell-Hausdorff series $H = \log(e^Ae^B})$ some a priori knowledge about the denominators of the coefficients of the series can be beneficial. In this paper an explicit formula for the computation of common denominators for the rational coefficients of the homogeneous components of the series is derived. Explicit computations up to degree 30 show that the common denominators obtained by this formula are as small as possible, which suggests that the formula is in a sense optimal. The sequence of integers defined by the formula seems to be interesting also from a number-theoretic point of view. There is, e.g., a connection with the denominators of the Bernoulli numbers and the Bernoulli polynomials.
Denominators of Bernoulli polynomials
Transcendence of values of logarithms of $E$-functions
On the finiteness of Bernoulli polynomials whose derivative has only integral coefficients
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