Quantum gl-weight system and its average values
Abstract
We present a proof of a recent conjecture due to M. Kazarian, E. Krasilnikov, S. Lando, and M. Shapiro, which describes the average value of the universal gl-weight system on permutations. The proof uses a quantum analogue of the gl-weight system on Hecke algebras of type A, which leads to a one-parameter deformation of the average value of the universal gl-weight system. We show that the average value of the quantum weight system is a linear combination of one-part Schur functions, with coefficients being q-analogues of Bernoulli polynomials.
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