The Limits of Local Search for the Maximum Weight Independent Set Problem in d-Claw Free Graphs

Abstract

We consider the Maximum Weight Independent Set Problem (MWIS) in d-claw free graphs, i.e. the task of computing an independent set of maximum weight in a given d-claw free graph G=(V,E) equipped with a positive weight function w:V→R>0. For k≥ 1, the MWIS in k+1-claw free graphs generalizes the weighted k-Set Packing Problem. Given that for k≥ 3, this problem does not permit a polynomial time o(k k)-approximation unless P=NP, most previous algorithms for both weighted k-Set Packing and the MWIS in d-claw free graphs rely on local search. For the last twenty years, Berman's algorithm SquareImp, which yields a d2+ε-approximation for the MWIS in d-claw free graphs, has remained unchallenged for both problems. Recently, it was improved by Neuwohner, obtaining an approximation guarantee slightly below d2, and inevitably raising the question of how far one can get by using local search. In this paper, we finally answer this question asymptotically in the following sense: By considering local improvements of logarithmic size, we obtain approximation ratios of d-1+εd2 for the MWIS in d-claw free graphs for d≥ 3 in quasi-polynomial time, where 0≤ εd≤ 1 and d→∞εd = 0. By employing the color coding technique, we can use the previous result to obtain a polynomial time k+εk+12-approximation for weighted k-Set Packing. On the other hand, we provide examples showing that no local improvement algorithm considering local improvements of size O((|S|)) with respect to some power wα of the weight function, where α∈R is chosen arbitrarily, but fixed, can yield an approximation guarantee better than k2 for the weighted k-Set Packing Problem with k≥ 3.

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