Approximating MIS over equilateral B1-VPG graphs

Abstract

We present an approximation algorithm for the maximum independent set (MIS) problem over the class of equilateral B1-VPG graphs. These are intersection graphs of L-shaped planar objects % (and their rotations by multiples of 90o) with both arms of each object being equal. We obtain a 36( 2d)-approximate algorithm running in O(n( n)2) time for this problem, where d is the ratio dmax/dmin and dmax and dmin denote respectively the maximum and minimum length of any arm in the input equilateral L-representation of the graph. In particular, we obtain O(1)-factor approximation of MIS for B1-VPG -graphs for which the ratio d is bounded by a constant. % formed by unit length L-shapes. In fact, algorithm can be generalized to an O(n( n)2) time and a 36( 2dx)( 2dy)-approximate MIS algorithm over arbitrary B1-VPG graphs. Here, dx and dy denote respectively the analogues of d when restricted to only horizontal and vertical arms of members of the input. This is an improvement over the previously best nε-approximate algorithm FoxP (for some fixed ε>0), unless the ratio d is exponentially large in n. In particular, O(1)-approximation of MIS is achieved for graphs with \dx,dy\=O(1).