Weighted partitions with interval restrictions: exact formulas and a bivariate master identity

Abstract

Let a2''(n) and b2''(n) be the signed partition functions introduced by Andrews and El Bachraoui for interval-restricted partitions whose parts greater than 1 are controlled by the smallest even part and by the number of ones. We prove two conjectures for these functions. The first gives the generating function for a2''(n) as an elementary rational term plus a false theta series with periodic signs; the second asserts that the companion coefficients b2''(n) take only the values -1,0,1,2. The central structural result introduces an auxiliary variable z recording the number of non-compulsory parts greater than 1. We obtain closed forms for the two resulting generating functions and prove the master identity (1+q2) B(z,q)-(1+q) A(z,q)=-q4/(1-q3) using both analytic and combinatorial techniques. At z=-1, this identity, together with a Rogers--Fine evaluation, gives the false theta formula for a2''(n) and an explicit generating function for b2''(n). The latter formula implies the asserted coefficient range and leads to an exact coefficient description of b2''(n). We also include a direct Heine--Rogers--Fine proof of the false theta formula, ordinary and fixed-refinement consequences of the master identity, and the resulting quantum modular interpretation.