Divisibility of certain -regular partitions by 2
Abstract
For a positive integer , let b(n) denote the number of -regular partitions of a nonnegative integer n. Motivated by some recent conjectures of Keith and Zanello, we establish infinite families of congruences modulo 2 for b3(n) and b21(n). We prove a specific case of a conjecture of Keith and Zanello on self-similarities of b3(n) modulo 2. We next prove that the series Σn=0∞b9(2n+1)qn is lacunary modulo arbitrary powers of 2. We also prove that the series Σn=0∞b9(4n)qn is lacunary modulo 2.
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