Coloring and Maximum Weight Independent Set of Rectangles
Parinya Chalermsook, Bartosz Walczak
Abstract
In 1960, Asplund and Grünbaum proved that every intersection graph of axis-parallel rectangles in the plane admits an O(ω2)-coloring, where ω is the maximum size of a clique. We present the first asymptotic improvement over this six-decade-old bound, proving that every such graph is O(ω log ω)-colorable and presenting a polynomial-time algorithm that finds such a coloring. This improvement leads to a polynomial-time O(log log n)-approximation algorithm for the maximum weight independent set problem in axis-parallel rectangles, which improves on the previous approximation ratio of .
Topics & Concepts
CombinatoricsMathematicsIndependent setIntersection graphCliqueGraphIntersection (aeronautics)Upper and lower boundsPlane (geometry)Time complexityGraph coloringDiscrete mathematicsGeometryLine graphMathematical analysisAerospace engineeringEngineeringComputational Geometry and Mesh GenerationComplexity and Algorithms in GraphsAdvanced Graph Theory Research