Congruences modulo cyclotomic polynomials and algebraic independence for $q$-series

Published 23 Jan 2017 in math.CO and math.NT | (1701.06378v1)

Abstract: We prove congruence relations modulo cyclotomic polynomials for multisums of $q$-factorial ratios, therefore generalizing many well-known $p$-Lucas congruences. Such congruences connect various classical generating series to their $q$-analogs. Using this, we prove a propagation phenomenon: when these generating series are algebraically independent, this is also the case for their $q$-analogs.