On Ruzsa's conjecture on congruence preserving functions
Abstract
Ruzsa's conjecture asserts that any sequence (an)n ≥ 0 of integers that preserves congruences, i.e., satisfies an+k an k , and has the growth condition n +∞ |an|1/n < e, must be a polynomial sequence. While previous results by Hall, Ruzsa, Perelli, and Zannier have confirmed this conjecture under stricter growth bounds, the general case remains open. In this paper, we establish a new partial result by proving that if in addition the generating series f = Σn ≥ 0 an xn has at most two singular directions at x = 0 , then (an)n ≥ 0 is necessarily a polynomial sequence. Our approach is based on an adaptation of Carlson's method, originally developed for the P\'olya-Carlson dichotomy, combined with a refined analysis of Hankel determinants. Specifically, we derive an upper bound on these determinants using P\'olya's inequality and a transfinite diameter argument of Dubinin, while a non-Archimedean divisibility condition on Hankel determinants yields a lower bound, ultimately leading to the rationality of f . This confirms that counterexamples to Ruzsa's conjecture, if they exist, must exhibit at least three singular directions.
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