On Siegel’s problem for $E$-functions

Stéphane Fischler; Tanguy Rivoal

doi:10.4171/rsmup/107

On Siegel’s problem for

E

-functions

Stéphane Fischler ; Tanguy Rivoal

Rendiconti del Seminario Matematico della Università di Padova, Tome 148 (2022), pp. 83-115.

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Résumé

Siegel defined in 1929 two classes of power series, the $E$ -functions and $G$ -functions, which generalize the Diophantine properties of the exponential and logarithmic functions respectively. He asked whether any $E$ -function can be represented as a polynomial with algebraic coefficients in a finite number of $E$ -functions of the form $_{p} F_{q} (λ z^{q - p + 1})$ , $q \geq p \geq 1$ , with rational parameters. The case of $E$ -functions of differential order less than or equal to 2 was settled in the affirmative by Gorelov in 2004, but Siegel's question is open for higher order. We prove here that if Siegel's question has a positive answer, then the ring $𝐆$ of values taken by analytic continuations of $G$ -functions at algebraic points must be a subring of the relatively “small” ring $𝐇$ generated by algebraic numbers, $1 / π$ and the values of the derivatives of the Gamma function at rational points. Because that inclusion seems unlikely (and contradicts standard conjectures), this points towards a negative answer to Siegel's question in general. As intermediate steps, we first prove that any element of $𝐆$ is a coefficient of the asymptotic expansion of a suitable $E$ -function, which completes previous results of ours. We then prove (in two steps) that the coefficients of the asymptotic expansion of a hypergeometric $E$ -function with rational parameters are in $𝐇$ . Finally, we prove a similar result for $G$ -functions.

Accepté le : 2020-11-15
Publié le : 2022-12-14

MR Zbl

DOI : 10.4171/rsmup/107

Classification : 33, 11, 41

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     title = {On {Siegel{\textquoteright}s} problem for $E$-functions},
     journal = {Rendiconti del Seminario Matematico della Universit\`a di Padova},
     pages = {83--115},
     volume = {148},
     year = {2022},
     doi = {10.4171/rsmup/107},
     mrnumber = {4542374},
     zbl = {1512.33011},
     language = {en},
     url = {http://archive.numdam.org/articles/10.4171/rsmup/107/}
}

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Stéphane Fischler; Tanguy Rivoal. On Siegel’s problem for $E$-functions. Rendiconti del Seminario Matematico della Università di Padova, Tome 148 (2022), pp. 83-115. doi : 10.4171/rsmup/107. http://archive.numdam.org/articles/10.4171/rsmup/107/

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