with Alin Bostan and Kilian Raschel, American Journal of Mathematics, vol. 146, no. 6, pp. 1577-1615, 2024. 
Abstract:
We show that Klazar's results on the differential transcendence of the ordinary generating function of the Bell numbers over the field $\mathbb C(\{t\})$ of meromorphic functions at $0$ is an instance of a general phenomenon that can be proven in a compact way using difference Galois theory. We present the main principles of this theory in order to prove a general result of differential transcendence over $\mathbb C(\{t\})$, that we apply to many other (infinite classes of) examples of generating functions, including as very special cases the ones considered by~Klazar. Most of our examples belong to Sheffer's class, well studied notably in umbral calculus. They all bring concrete evidence in support to the Pak-Yeliussizov conjecture according to which {a sequence whose both ordinary and exponential generating functions satisfy nonlinear differential equations with polynomial coefficients necessarily satisfies a \emph{linear} recurrence with polynomial coefficients.
ArXiv: 2012.15292
HAL: hal-03091272