On the algebraic independence of G-functions and E-functions (2502.00768v1)

Abstract: Let $f_1(z),\ldots, f_m(z)$ be power series in $\mathbb{Q}_p[[z]]$ such that, for every $1\leq i\leq m$, $f_i(z)$ is solution of a differential operator $\mathcal{L}_i\in E_p[d/dz]$, where $E_p$ is the field of analytic elements. We prove that if, for every $1\leq i\leq m$, $\mathcal{L}_i$ has a strong Frobenius structure and has maximal order multplicity at zero (MOM) then $f_1(z),\ldots, f_m(z)$ are algebraically dependent over $E_p$ if and only if there are integers $a_1,\ldots, a_m$ not all zero, such that $f^{a_1}_1(z)\cdots f^{a_m}_m(z)\in E_p$. The main consequence of this result is that it allows us to study the algebraic independence of a large class of $G$\nobreakdash-functions and certain $E$\nobreakdash-functions.