English

Algebraic power series and their automatic complexity modulo prime powers

Number Theory 2026-01-28 v3 Formal Languages and Automata Theory Symbolic Computation

Abstract

Christol and, independently, Denef and Lipshitz showed that an algebraic sequence of pp-adic integers (or integers) is pp-automatic when reduced modulo pαp^\alpha. Previously, the best known bound on the minimal automaton size for such a sequence was doubly exponential in α\alpha. Under mild conditions, we improve this bound to the order of pα3hdp^{\alpha^3 h d}, where hh and dd are the height and degree of the minimal annihilating polynomial modulo pp. We achieve this bound by showing that all states in the automaton are naturally represented in a new numeration system. This significantly restricts the set of possible states. Since our approach embeds algebraic sequences as diagonals of rational functions, we also obtain bounds more generally for diagonals of multivariate rational functions.

Keywords

Cite

@article{arxiv.2408.00750,
  title  = {Algebraic power series and their automatic complexity modulo prime powers},
  author = {Eric Rowland and Reem Yassawi},
  journal= {arXiv preprint arXiv:2408.00750},
  year   = {2026}
}

Comments

50 pages, 1 figure, 2 tables; includes new Section 10 on non-Furstenberg series

R2 v1 2026-06-28T18:01:08.718Z