Add to ORKGBaumeister B, Bux K-U, Götze F, Kielak D, Krause H. Non-crossing partitions. arXiv:1903.01146. 2019.Non-crossing partitions have been a staple in combinatorics for quite some time. More recently, they have surfaced (sometimes unexpectedly) in various other contexts from free probability to classifying spaces of braid groups. Also, analogues of the non-crossing partition lattice have been introduced. Here, the classical non-crossing partitions are associated to Coxeter and Artin groups of type $\mathsf{A}_n$, which explains the tight connection to the symmetric groups and braid groups. We shall outline those developments
Differs slightly from the published version.International audienceWe introduce and study the model o...
AbstractIn this paper we shall give the generating functions for the enumeration of non-crossing par...
Abstract. Voiculescu’s free probability theory – which was introduced in an operator algebraic conte...
Baumeister B, Bux K-U, Götze F, Kielak D, Krause H. Non-crossing partitions. arXiv:1903.01146. 2019....
Dedicated to the memory of Rodica Simion Abstract. The poset of noncrossing partitions can be natura...
the most diverse of settings. Some obvious examples exhibiting this intrusive type of behavior inclu...
Hubery A, Krause H. A categorification of non-crossing partitions. Journal of the European Mathemati...
Hubery A, Krause H. A categorification of non-crossing partitions. Journal of the European Mathemati...
AbstractWe introduce analogues of the lattice of non-crossing set partitions for the classical refle...
AbstractWe investigate a new lattice of generalised non-crossing partitions, constructed using the g...
International audienceFor a fixed integer k, we consider the set of noncrossing partitions, where bo...
International audienceFor a fixed integer k, we consider the set of noncrossing partitions, where bo...
International audienceWe present $\textit{type preserving}$ bijections between noncrossing and nonne...
AbstractFour statistics, ls, rb, rs, and lb, previously studied on all partitions of {1, 2, …, n}, a...
Differs slightly from the published version.International audienceWe introduce and study the model o...
Differs slightly from the published version.International audienceWe introduce and study the model o...
AbstractIn this paper we shall give the generating functions for the enumeration of non-crossing par...
Abstract. Voiculescu’s free probability theory – which was introduced in an operator algebraic conte...
Baumeister B, Bux K-U, Götze F, Kielak D, Krause H. Non-crossing partitions. arXiv:1903.01146. 2019....
Dedicated to the memory of Rodica Simion Abstract. The poset of noncrossing partitions can be natura...
the most diverse of settings. Some obvious examples exhibiting this intrusive type of behavior inclu...
Hubery A, Krause H. A categorification of non-crossing partitions. Journal of the European Mathemati...
Hubery A, Krause H. A categorification of non-crossing partitions. Journal of the European Mathemati...
AbstractWe introduce analogues of the lattice of non-crossing set partitions for the classical refle...
AbstractWe investigate a new lattice of generalised non-crossing partitions, constructed using the g...
International audienceFor a fixed integer k, we consider the set of noncrossing partitions, where bo...
International audienceFor a fixed integer k, we consider the set of noncrossing partitions, where bo...
International audienceWe present $\textit{type preserving}$ bijections between noncrossing and nonne...
AbstractFour statistics, ls, rb, rs, and lb, previously studied on all partitions of {1, 2, …, n}, a...
Differs slightly from the published version.International audienceWe introduce and study the model o...
Differs slightly from the published version.International audienceWe introduce and study the model o...
AbstractIn this paper we shall give the generating functions for the enumeration of non-crossing par...
Abstract. Voiculescu’s free probability theory – which was introduced in an operator algebraic conte...