Giacomo Cherubini, Pietro Mercuri
Published 2022-12-21Version 1
We give a complete characterization of the parity of $b_8(n)$, the number of $8$-regular partitions of $n$. Namely, we prove that $b_8(n)$ is odd or even depending on whether or not we have the factorisation $24n+7=p^{4a+1}m^2$, for some prime $p\nmid m$ and $a\ge 0$.
Generating Functions and Congruences for Some Partition Functions Related to Mock Theta Functions
Some congruences for $(\ell, k)$ and $(\ell, k, r)$-regular partitions
Distribution of certain $\ell$-regular partitions and triangular numbers
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