The Noncrossing Bond Poset of a Graph

Abstract: The partition lattice and noncrossing partition lattice are well studied objects in combinatorics. Given a graph $G$ on vertex set $\{1,2,\dots, n\}$, its bond lattice, $L_G$, is the subposet of the partition lattice formed by restricting to the partitions whose blocks induce connected subgraphs of $G$. In this article, we introduce a natural noncrossing analogue of the bond lattice, the noncrossing bond poset, $NC_G$, obtained by restricting to the noncrossing partitions of $L_G$. Both the noncrossing p… Show more

“…Some of these results appeared in an earlier version of this paper published in the Proceedings of Formal Power Series and Algebraic Combinatorics 2019 [14].…”

The Noncrossing Bond Poset of a Graph

“…Some of these results appeared in an earlier version of this paper published in the Proceedings of Formal Power Series and Algebraic Combinatorics 2019 [14].…”

The Noncrossing Bond Poset of a Graph