A combinatorial proof of Buryak-Feigin-Nakajima

Abstract

Buryak, Feigin and Nakajima computed a generating function for a family of partition statistics by using the geometry of the Z/cZ fixed point sets in the Hilbert scheme of points on C2. Loehr and Warrington had already shown how a similar observation by Haiman using the geometry of the Hilbert scheme of points on C2 could be made purely combinatorial. We extend the techniques of Loehr and Warrington to also account for cores and quotients. In particular, we construct a multigraph Mr,s,c that is a direct refinement of Loehr and Warrington's multigraphs Mr,s, retains the relevant partition data, and is preserved by an involution Ir,s,c which we use to prove the equidistribution of a family of partition statistics. As a consequence, we obtain a purely combinatorial proof of a result of Buryak, Feigin, and Nakajima. More precisely, we define a family of partition statistics \hx,c+, x∈ [0,∞)\ and give a combinatorial proof that for all x and all positive integers c, equation* Σ q|λ|thx,c+(λ)=q|μ|Πi≥ 11(1-qic)c-1Πj≥ 111-qjct, equation* where the sum ranges over all partitions λ with c-core μ. Section 2 recalls background on partitions, cores and quotients and is written with those new to the subject in mind.