Further Applications of Cubic q-Binomial Transformations

Abstract

Consider align* G(N,M;α,β,K,q) = Σj∈Z(-1)jq12Kj((α+β)j+α-β)[matrixM+N\-Kjmatrix]q. align* In this paper, we prove the non-negativity of coefficients of some cases of G(N,M;α,β,K,q). For instance, for non-negative integers n and t, we prove that\\ align* G(n,n;43+3(3t-1)2,53+3(3t-1)2,3t+1,q) align* and align* G(n-3t-12,n+3t+12;83+2(3t-1),43-(3t-1),3t+1,q)\\ align* are polynomials in q with non-negative coefficients. Using cubic positivity preserving transformations of Berkovich and Warnaar and some known formulae arising from Rogers-Szeg\"o polynomials, we establish new identities such as\\ align* Σ0 3j n(q3;q3)n-j-1(1-q2n)q3j2(q;q)n-3j(q6;q6)j = Σj=-∞∞(-1)jq6j22n n-3jq. align*