Two Proofs of a Conjecture of Amdeberhan, Andrews and Ballantine for double Lambert series and a new Representation for E2(q)
Abstract
In this note, we prove a recent conjecture of Amdeberhan, Andrews and Ballantine concerning a double Lambert series (J. Combin. Theory Series A 221 (2026), Paper No. 106154). More precisely, they conjectured that \[ [qN2a] Σm,k≥ 1 qmk2a(1+qk2a-1)(1-q2m-1) =σ1(N), \] where σ1(N) is the sum of all the positive divisors of N. We provide two proofs of this conjecture. One of the approach leads us to derive a new representation of quasi-modular forms E2(q).
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