Extending Recent Congruence Results on (,μ)-Regular Overpartitions
Abstract
Recently, Alanazi, Munagi, and Saikia employed the theory of modular forms to investigate the arithmetic properties of the function R,μ(n), which enumerates the overpartitions of n where no part is divisible by either or μ, for various integer pairs (, μ). In this paper, we substantially extend several of their results and establish infinitely many families of new congruences. Our proofs are entirely elementary, relying solely on classical q-series manipulations and dissection formulas.
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