MacMahon's sums-of-divisors and allied q-series
Abstract
Here we investigate the q-series align* Ua(q)&=Σn=0∞ MO(a;n)qn&:=Σ0< k1<k2<·s<ka qk1+k2+·s+ka(1-qk1)2(1-qk2)2·s(1-qka)2,\\ Ua(q)&=Σn=0∞M(a;n)qn&:=Σ1≤ k1≤ k2≤·s≤ ka qk1+k2+·s+ka(1-qk1)2(1-qk2)2·s(1-qka)2. align* MacMahon introduced the Ua(q) in his seminal work on partitions and divisor functions. Recent works show that these series are sums of quasimodular forms with weights ≤ 2a. We make this explicit by describing them in terms of Eisenstein series. We use these formulas to obtain explicit and general congruences for the coefficients MO(a;n) and M(a;n). Notably, we prove the conjecture of Amdeberhan-Andrews-Tauraso as the m=0 special case of the infinite family of congruences MO(11m+10; 11n+7) 011, and we prove that MO(17m+16; 17n+15) 017. We obtain further formulae using the limiting behavior of these series. For n≤ a+a+12, we obtain a ``hook length'' formulae for MO(a;n), and for n≤ 2a, we find that M(a;n)=a+n-1n-a+a+n-2n-a-1.
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