English

Arithmetic properties of certain $t$-regular partitions

Number Theory 2022-09-07 v1

Abstract

For a positive integer t2t\geq 2, let bt(n)b_{t}(n) denote the number of tt-regular partitions of a nonnegative integer nn. Motivated by some recent conjectures of Keith and Zanello, we establish infinite families of congruences modulo 22 for b9(n)b_9(n) and b19(n)b_{19}(n). We prove some specific cases of two conjectures of Keith and Zanello on self-similarities of b9(n)b_9(n) and b19(n)b_{19}(n) modulo 22. We also relate bt(n)b_{t}(n) to the ordinary partition function, and prove that bt(n)b_{t}(n) satisfies the Ramanujan's famous congruences for some infinite families of tt. For t{6,10,14,15,18,20,22,26,27,28}t\in \{6,10,14,15,18,20,22,26,27,28\}, Keith and Zanello conjectured that there are no integers A>0A>0 and B0B\geq 0 for which bt(An+B)0(mod2)b_t(An+ B)\equiv 0\pmod 2 for all n0n\geq 0. We prove that, for any t2t\geq 2 and prime \ell, there are infinitely many arithmetic progressions An+BAn+B for which n=0bt(An+B)qn≢0(mod)\sum_{n=0}^{\infty}b_t(An+B)q^n\not\equiv0 \pmod{\ell}. Next, we obtain quantitative estimates for the distributions of b6(n),b10(n)b_{6}(n), b_{10}(n) and b14(n)b_{14}(n) modulo 2. We further study the odd densities of certain infinite families of eta-quotients related to the 7-regular and 1313-regular partition functions.

Keywords

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

R2 v1 2026-06-28T00:42:07.584Z