On primary pseudo-polynomials (Around Ruzsa's Conjecture)
Abstract
Every polynomial satisfies the congruences for all integers . An integer valued sequence is called a pseudo-polynomial when it satisfies these congruences. Hall characterized pseudo-polynomials and proved that they are not necessarily polynomials. A long standing conjecture of Ruzsa says that a pseudo-polynomial is a polynomial as soon as . Under this growth assumption, Perelli and Zannier proved that the generating series is a -function. A primary pseudo-polynomial is an integer valued sequence such that for all integers and all prime numbers . The same conjecture has been formulated for them, which implies Ruzsa's, and this paper revolves around this conjecture. We obtain a Hall type characterization of primary pseudo-polynomials and draw various consequences from it. We give a new proof and generalize a result due to Zannier that any primary pseudo-polynomial with an algebraic generating series is a polynomial. This leads us to formulate a conjecture on diagonals of rational fractions and primary pseudo-polynomials, which is related to classic conjectures of Christol and van der Poorten. We make the Perelli-Zannier Theorem effective. We prove a P\'olya type result: if there exists a function analytic in a right-half plane with not too large exponential growth (in a precise sense) and such that for all large the primary pseudo-polynomial , then is a polynomial. Finally, we show how to construct a non-polynomial primary pseudo-polynomial starting from any primary pseudo-polynomial generated by a -function different of .
Keywords
Cite
@article{arxiv.2102.01534,
title = {On primary pseudo-polynomials (Around Ruzsa's Conjecture)},
author = {Delaygue Eric and Rivoal Tanguy},
journal= {arXiv preprint arXiv:2102.01534},
year = {2021}
}