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Functionality of box intersection graphs
Published 23 Jan 2023 in math.CO and cs.DM | (2301.09493v2)
Abstract: Functionality is a graph complexity measure that extends a variety of parameters, such as vertex degree, degeneracy, clique-width, or twin-width. In the present paper, we show that functionality is bounded for box intersection graphs in $\mathbb{R}1$, i.e. for interval graphs, and unbounded for box intersection graphs in $\mathbb{R}3$. We also study a parameter known as symmetric difference, which is intermediate between twin-width and functionality, and show that this parameter is unbounded both for interval graphs and for unit box intersection graphs in $\mathbb{R}2$.
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