Arithmetic properties of certain $t$-regular partitions
Abstract
For a positive integer , let denote the number of -regular partitions of a nonnegative integer . Motivated by some recent conjectures of Keith and Zanello, we establish infinite families of congruences modulo for and . We prove some specific cases of two conjectures of Keith and Zanello on self-similarities of and modulo . We also relate to the ordinary partition function, and prove that satisfies the Ramanujan's famous congruences for some infinite families of . For , Keith and Zanello conjectured that there are no integers and for which for all . We prove that, for any and prime , there are infinitely many arithmetic progressions for which . Next, we obtain quantitative estimates for the distributions of and modulo 2. We further study the odd densities of certain infinite families of eta-quotients related to the 7-regular and -regular partition functions.
Cite
@article{arxiv.2209.01639,
title = {Arithmetic properties of certain $t$-regular partitions},
author = {Rupam Barman and Ajit Singh and Gurinder Singh},
journal= {arXiv preprint arXiv:2209.01639},
year = {2022}
}
Comments
17 pages