Infinite families of congruences for the second order mock theta function B(q)

Abstract

The arithmetic properties of the second order mock theta function B(q), introduced by McIntosh, defined by equation* B(q) := Σn ≥ 0 qn (-q;q2)n(q;q2)n+1 = Σn ≥ 0b(n)qn, equation* have been extensively studied. For instance, for all n0, Kaur and Rana established congruences such as for all n0, align* b(12n+10) & 0 36, b(18n+16) 0 72, align* Chen and Mao proved that for all n0, align* b(4n+1) & 0 2, b(4n+2) 0 4, align* while Mao also showed that for all n0, align* b(6n+2) & 0 4, b(6n+4) 0 9. align* In this paper, we find new congruences and infinite families of congruences modulo 2, 4, 8, 36, 54, 72 for the function B(q). For example, let p ≥ 5 be a prime, if (-3p)L = -1, then for all n, k ≥ 0 with p n, we have equation* b( 3p2k+1n + p2k+2-12 ) 0 2. equation* Let p ≥ 5 be a prime and 1 ≤ ≤ p - 1 such that ( 12 + 9p )L = -1. Then for all n, k ≥ 0, we have equation* b(6p2k+3n + 3p2k+2(4+3)-12) 0 36. equation* Our techniques involve elementary q-series and Maple.