| Theorem ( q-extension of (4.2) in [F2]): (2009) | |||||||||||||
Abstract | |||||||||||||
| As always in q-theory, (X; Q)n will stand for the product (1 − X)(1 − QX)...(1 − Q n−1 X), and when the ”base ” Q is q, we will abbreviate (X; q)n to (X)n. For any Laurent polynomial f in x1,..., xn, CT (f) denotes the coefficient of x 0 1..x 0 n. Throughout this paper t: = q a, s = q b, u = q c. | |||||||||||||
Publication details | |||||||||||||
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