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Coloring and Maximum Weight Independent Set of Rectangles

Parinya Chalermsook, Bartosz Walczak

2021Society for Industrial and Applied Mathematics eBooks17 citationsDOIOpen Access PDF

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
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