Some New Congruences For Overpartition Function With -Regular Non-Overlined Parts

Abstract

Alanzi et al. (2022) investigated overpartition of a positive integer n with -regular non-overlined parts denoted by R (n), and proved some results for the case =3. As extension to the results of Alanzi et al., Sellers (2024) proved some new congruences for R3 (n). In this paper, we prove some new infinite families and particular congruences for R (n) for =4, 5k, 6, and 8, where k is any positive integer. We also offer some congruences connecting R (n) with some other partition functions.

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