Simultaneous Embedding of Two Paths on the Grid

Abstract

We study the problem of simultaneous geometric embedding of two paths without self-intersections on an integer grid. We show that minimizing the length of the longest edge of such an embedding is NP-hard. We also show that we can minimize in O(n3/2) time the perimeter of an integer grid containing such an embedding if one path is x-monotone and the other is y-monotone.

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