Zhicong Lin
Published 2017-06-22Version 1
We prove a conjecture due independently to Yan and Martinez-Savage that asserts inversion sequences with no weakly decreasing subsequence of length $3$ and enhanced $3$-noncrossing partitions have the same cardinality. Our approach applies both the generating tree technique and the so-called obstinate kernel method developed by Bousquet-M\'elou. One application of this equinumerosity is a discovery of an intriguing identity involving numbers of classical and enhanced $3$-noncrossing partitions.
Comments: 10 pages, presented at the S\'eminaire de Combinatoire et Th\'eorie des Nombres at Institut Camille Jordan in 21 March, 2017. This version was submitted to Eur-JC in March, 2017
Identities Derived from Noncrossing Partitions of Type B
Bijections for restricted inversion sequences and permutations with fixed points
Star factorizations and noncrossing partitions
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