Unbounded regions in an arrangement of lines in the plane

Alan West

Abstract: We take a set $\Omega$ of $n$ points and an arrangement $\Sigma$ of $m$ lines in the plane which avoid these points but separate any two of them. We suppose these satisfy the following unboundedness property: for each point $x \in \Omega$ there is a homotopy from $\Sigma$ to ${\Sigma}'$ avoiding $\Omega$ so that $x$ is in an unbounded component of the complement of ${\Sigma}'$. It is proved that then $n \leq 2m$. This result is required to partially solve a problem in differential geometry which is described briefly.

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