We reduce the approximation factor for Vertex Cover to 2 - ⊖(1/√log n) (instead of the previous 2 - ⊖(log log n/log n), obtained by BarYehuda and Even [3], and by Monien and Speckenmeyer [11]). The improvement of the vanishing factor comes as an application of the recent results of Arora, Rao, and Vazirani [2] that improved the approximation factor of the sparsest cut and balanced cut problems. In particular, we use the existence of two big and well-separated sets of nodes in the solution of the semidefinite relaxation for balanced cut, proven in [2]. We observe that a solution of the semidefinite relaxation for vertex cover, when strengthened with the triangle inequalities, can be transformed into a solution of a balanced cut problem, and therefore the existence of big well-separated sets in the sense of [2] translates into the existence of a big independent set. © Springer-Verlag Berlin Heidelberg 2005.
CITATION STYLE
Karakostas, G. (2005). A better approximation ratio for the Vertex Cover problem. In Lecture Notes in Computer Science (Vol. 3580, pp. 1043–1050). Springer Verlag. https://doi.org/10.1007/11523468_84
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