A combinatorial proof for the positivity of the normalized Jacobi triple product tails

Abstract

For k≥ 1, we prove that \[ [qn zs]Jk(z,q)≥ 0, (n≥ 0,\ s∈ Z) \] for the normalized Jacobi triple product tails \[ Jk(z,q) = Σj=k∞(-1)j-k qj+12(z-j+·s+zj) (zq,q/z;q)∞. \] This result not only implies Merca's stronger nonnegativity conjecture on truncated Jacobi triple product series in full generality, but also yields infinite families of linear inequalities for two-colored partitions and partitions with parts in the residue classes S R. We present a combinatorial proof wherein a sign-reversing involution reduces the normalized Jacobi triple product tails to the invariant subsets according to the generalized minimal-excludant of partitions. Furthermore, by combing an invertible lift operator on Frobenius arms with Konan's size- and length-preserving bijection, an injection is constructed between the consecutive invariant subsets, which implies the coefficientwise positivity of the normalized Jacobi triple product tails.