Further results on the divisibility of q-trinomial coefficients
Abstract
We study divisibility for the q-trinomial coefficients τ0(n,m,q), T0(n,m,q) and T1(n,m,q), which were first introduced by Andrews and Baxter. In particular, we completely determine τ0(an,bn,q), T0(an,bn,q) and T1(an,bn,q) modulo the square of the cyclotomic polynomial n(q) for (a,b)=(m,m-1).
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