Polynomiality of the q,t-Kostka Revisited
Abstract
Let K(q,t)= \|Kμ(q,t)\|,μ be the Macdonald q,t-Kostka matrix and K(t)=K(0,t) be the matrix of the Kostka-Foulkes polynomials Kμ(t). In this paper we present a new proof of the polynomiality of the q,t-Kostka coefficients that is both short and elementary. More precisely, we derive that K(q,t) has entries in [q,t] directly from the fact that the matrix K(t)-1 has entries in [t]. The proof uses only identities that can be found in the original paper [7] of Macdonald.
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