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arxiv: 1506.03728 · v1 · pith:DSYH4PXKnew · submitted 2015-06-11 · 🧮 math.CO · cs.CG· cs.DM

Upper and Lower Bounds on Long Dual-Paths in Line Arrangements

classification 🧮 math.CO cs.CGcs.DM
keywords linearrangementlinespathalternatingarrangementslengthlower
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Given a line arrangement $\cal A$ with $n$ lines, we show that there exists a path of length $n^2/3 - O(n)$ in the dual graph of $\cal A$ formed by its faces. This bound is tight up to lower order terms. For the bicolored version, we describe an example of a line arrangement with $3k$ blue and $2k$ red lines with no alternating path longer than $14k$. Further, we show that any line arrangement with $n$ lines has a coloring such that it has an alternating path of length $\Omega (n^2/ \log n)$. Our results also hold for pseudoline arrangements.

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