A staircase illumination theorem for orthogonal polygons

Marilyn Breen

Abstract: Let $S$ be a simply connected orthogonal polygon in the plane, and let $T$ be a horizontal (or vertical) segment such that $T'\cap S$ is connected for every translate $T '$ of $T$. If every two points of $S$ see via staircase paths a common translate of $T$, then there is a translate of $T$ seen via staircase paths by every point of $S$. That is, some translate of $T$ is a staircase illuminator for $S$. Clearly the number two is best possible. The result fails without the requirement that each set $T ' \cap S$ be connected.

Keywords: Orthogonal polygons, staircase illumination

Classification (MSC2000): 52A30, 52A35

Full text of the article:

• Compressed PostScript file (505 kilobytes)
• PDF file (180 kilobytes)