Color Spanning Annulus: Square, Rectangle and Equilateral Triangle

Abstract

In this paper, we study different variations of minimum width color-spanning annulus problem among a set of points P=\p1,p2,…,pn\ in I\!\!R2, where each point is assigned with a color in \1, 2, …, k\. We present algorithms for finding a minimum width color-spanning axis parallel square annulus (CSSA), minimum width color spanning axis parallel rectangular annulus (CSRA), and minimum width color-spanning equilateral triangular annulus of fixed orientation (CSETA). The time complexities of computing (i) a CSSA is O(n3+n2k k) which is an improvement by a factor n over the existing result on this problem, (ii) that for a CSRA is O(n4 n), and for (iii) a CSETA is O(n3k). The space complexity of all the algorithms is O(k).