Reconfiguration of Polygonal Subdivisions via Recombination

Abstract

Motivated by the problem of redistricting, we study area-preserving reconfigurations of connected subdivisions of a simple polygon. A connected subdivision of a polygon ?, called a district map, is a set of interior disjoint connected polygons called districts whose union equals ?. We consider the recombination as the reconfiguration move which takes a subdivision and produces another by merging two adjacent districts, and by splitting them into two connected polygons of the same area as the original districts. The complexity of a map is the number of vertices in the boundaries of its districts. Given two maps with k districts, with complexity O(n), and a perfect matching between districts of the same area in the two maps, we show constructively that (log n)^O(log k) recombination moves are sufficient to reconfigure one into the other. We also show that ?(log n) recombination moves are sometimes necessary even when k = 3, thus providing a tight bound when k = 3