Approximation algorithms for non-sequential star packing problems

Abstract

For a positive integer k 1, a k-star (k+-star, k--star, respectively) is a connected graph containing a degree- vertex and degree-1 vertices, where = k ( k, 1 k, respectively). The k+-star packing problem is to cover as many vertices of an input graph G as possible using vertex-disjoint k+-stars in G; and given k > t 1, the k-/t-star packing problem is to cover as many vertices of G as possible using vertex-disjoint k--stars but no t-stars in G. Both problems are NP-hard for any fixed k 2. We present a (1 + k22k+1)- and a 32-approximation algorithms for the k+-star packing problem when k 3 and k = 2, respectively, and a (1 + 1t + 1 + 1/k)-approximation algorithm for the k-/t-star packing problem when k > t 2. They are all local search algorithms and they improve the best known approximation algorithms for the problems, respectively.

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