A new transcendence measure for the values of the exponential function at algebraic arguments

Abstract: Let $P\in \mathbb Z[X]\setminus{0}$ be of degree $\delta\ge 1$ and usual height $H\ge 1$, and let $\alpha\in \overline{\mathbb Q}^*$ be of degree $d\ge 2$. Mahler proved in 1931 the following transcendence measure for $e^\alpha$: for any $\varepsilon>0$, there exists $c>0$ such that $\vert P(e^\alpha)\vert>c/H^{\mu(d,\delta)+\varepsilon}$ where the exponent $\mu(d,\delta)=(4d^2-2d)\delta+2d-1$. Zheng obtained a better result in 1991 with $\mu(d,\delta)=(4d^2-2d)\delta-1$. In this paper, we provide a new explicit exponent $\mu(d,\delta)$ which improves on Zheng's transcendence measure for all $\delta\ge 2$ and all $d\ge 2$. When $\delta=1$, we recover his bound for all $d\ge 2$, which had in fact already been obtained by Kappe in 1966. Our improvement rests upon the optimization of an accessory parameter in Siegel's classical determinant method applied to Hermite-Pad{\'e} approximants to powers of the exponential function.