Geodesic
The largest crossing number of tanglegrams
Éva Czabarka1 ; Junsheng Liu1 ; László Székely1
1University of South Carolina
The electronic journal of combinatorics, Tome 31 (2024) no. 1
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A tanglegram $\mathcal{T}$ consists of two rooted binary trees with the same number of leaves, and a perfect matching between the two leaf sets. In a layout, the tanglegrams is drawn with the leaves on two parallel lines, the trees on either side of the strip created by these lines are drawn as plane trees, and the perfect matching is drawn in straight line segments inside the strip. The tanglegram crossing number ${\rm cr}({\mathcal{T}})$ of $\mathcal{T}$ is the smallest number of crossings of pairs of matching edges, over all possible layouts of $\mathcal{T}$. The size of the tanglegram is the number of matching edges, say $n$. An earlier paper showed that the maximum of the tanglegram crossing number of size $n$ tanglegrams is $<\frac{1}{2}\binom{n}{2}$; but is at least $\frac{1}{2}\binom{n}{2}-\frac{n^{3/2}-n}{2}$ for infinitely many $n$. Now we make better bounds: the maximum crossing number of a size $n$ tanglegram is at most $\frac{1}{2}\binom{n}{2}-\frac{n}{4}$, but for infinitely many $n$, at least $\frac{1}{2}\binom{n}{2}-\frac{n\log_2 n}{4}$. The problem shows analogy with the Unbalancing Lights Problem of Gale and Berlekamp.
DOI : 10.37236/12194
Classification : 05C10, 05C05, 05C62, 92B10
Mots-clés : maximum crossing number, unbalancing lights problem

Éva Czabarka  1   ; Junsheng Liu  1   ; László Székely  1

1 University of South Carolina 
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Éva Czabarka; Junsheng Liu; László Székely. The largest crossing number of tanglegrams. The electronic journal of combinatorics, Tome 31 (2024) no. 1. doi: 10.37236/12194

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