A new bijective proof of the q-Pfaff--Saalsch\"utz identity with applications to quantum groups
Abstract
We present a combinatorial proof of the q-Pfaff--Saalsch\"utz identity by a composition of explicit bijections, in which q-binomial coefficients are interpreted as counting subspaces of Fq-vector spaces. As a corollary, we obtain a new multiplication rule for quantum binomial coefficients and hence a new presentation of Lusztig's integral form UZ[q, q-1](sl2) of the Cartan subalgebra of the quantum group Uq(sl2).
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