Orbits of antichains in certain root posets. (English) Zbl 1439.06003
Summary: Building everything from scratch, we give another proof of J. Propp and T. Roby’s [Electron. J. Comb. 22, No. 3, Research Paper P3.4, 29 p. (2015; Zbl 1319.05151)] theorem saying that the average antichain size in any reverse operator orbit of the poset \([m]\times [n]\) is \(\frac{mn}{m+n}\). It is conceivable that our method should work for other situations. As a demonstration, we show that the average size of antichains in any reverse operator orbit of \([m]\times K_{n-1}\) equals \(\frac{2mn}{m+2n-1}\). Here \(K_{n-1}\) is the minuscule poset \([n-1]\oplus ([1] \sqcup [1]) \oplus [n-1]\). Note that \([m]\times [n]\) and \([m]\times K_{n-1}\) can be interpreted as sub-families of certain root posets. We guess these root posets should provide a unified setting to exhibit the homomesy phenomenon defined by Propp and Roby [loc. cit.].
MSC:
| 06A07 | Combinatorics of partially ordered sets |
Citations:
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