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Paper detail

RSK-Complete Cycle Decompositions

We characterize the class of cycle decompositions that can achieve all Young tableau shapes (except the trivial ones with a single row or a single column) under the Robinson--Schensted--Knuth (RSK) correspondence, a property that we call RSK-completeness. We prove that for even $n$, cyclic permutations comprise the only fixed cycle decomposition that is RSK-complete. For odd $n$, cyclic permutations and almost cyclic permutations which have a cycle of length $n-1$ are the only RSK-complete cycle decompositions.

preprint2023arXivOpen access
Agastya GoelSimon Rubinstein-Salzedo
math.CO
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Agastya GoelSimon Rubinstein-Salzedo

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