Congruences modulo powers of 2 and 3 for overpartition k-tuples

Abstract

Let pk(n) denote the number of overpartition k-tuples of n. In 2023, Saikia saikia conjectured the following congruences: align* pq(8n+2)& 0 4, pq(8n+3) 0 8, pq(8n+4) 0 2,\\ pq(8n+5)& 0 8, pq(8n+6) 0 8, pq(8n+7) 0 32, align* where n≥0 and q is prime. Recently, Sellers sellers2024elementary showed that these congruences hold for all odd integers q (not necessarily prime). In this paper, we show that the above congruences hold for all positive integers q (not necessarily odd). We also prove the following congruences on OPTk(n), the number of overpartition k-tuples with odd parts of n: For all i,j≥ 1, n≥ 0, r not a multiple of 2, k not a multiple of 2 or 3, and not a power of 2, nor a multiple of 2 or 3, we have align* OPT2i· r(8n+7)& 0 2i+4, OPT3i· 2j· k(3n+2)& 0 3i+1· 2j+2, OPT3i· 2j· k(3n+1)& 0 3i· 2j+1,\\ OPT3i· (3n+2)& 0 3i+1· 2, OPT3i· (3n+1)& 0 3i· 2,align* where the first congruence was posed as a conjecture by Sarma et al. saikiasarma and the latter four were conjectured by Das et al. DSS.