Geodesic
The noncrossing bond poset of a graph
C. Matthew Farmer1 ; Joshua Hallam2 ; Clifford Smyth1
1University of North Carolina at Greensboro
2Wake Forest University
The electronic journal of combinatorics, Tome 27 (2020) no. 4
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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 partition lattice and the bond lattice have many nice combinatorial properties. We show that, for several families of graphs, the noncrossing bond poset also exhibits these properties. We present simple necessary and sufficient conditions on the graph to ensure the noncrossing bond poset is a lattice. Additionally, for several families of graphs, we give combinatorial descriptions of the Möbius function and characteristic polynomial of the noncrossing bond poset. These descriptions are in terms of a noncrossing analogue of non-broken circuit (NBC) sets of the graphs and can be thought of as a noncrossing version of Whitney's NBC theorem for the chromatic polynomial. We also consider the shellability and supersolvability of the noncrossing bond poset, providing sufficient conditions for both. We end with some open problems.
DOI : 10.37236/9253
Classification : 06A07, 05A18, 05A15, 05C30, 05C31

C. Matthew Farmer  1   ; Joshua Hallam  2   ; Clifford Smyth  1

1 University of North Carolina at Greensboro
2 Wake Forest University 
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C. Matthew  Farmer; Joshua Hallam; Clifford Smyth. The noncrossing bond poset of a graph. The electronic journal of combinatorics, Tome 27 (2020) no. 4. doi: 10.37236/9253

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