Skew hook formula for d-complete posets
Abstract
Peterson and Proctor obtained a formula which expresses the multivariate generating function for P-partitions on a d-complete poset P as a product in terms of hooks in P. In this paper, we give a skew generalization of Peterson--Proctor's hook formula, i.e., a formula for the generating function for (P F)-partitions for a d-complete poset P and its order filter F, by using the notion of excited diagrams. Our proof uses the Billey-type formula and the Chevalley-type formula in the equivariant K-theory of Kac--Moody partial flag varieties. This generalization provides an alternate proof of Peterson--Proctor's hook formula.
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