English

Approximating set multi-covers

Combinatorics 2017-09-11 v2 Computational Complexity Metric Geometry

Abstract

Johnson and Lov\'asz and Stein proved independently that any hypergraph satisfies τ(1+lnΔ)τ\tau\leq (1+\ln \Delta)\tau^{\ast}, where τ\tau is the transversal number, τ\tau^{\ast} is its fractional version, and Δ\Delta denotes the maximum degree. We prove τfcτmax{lnΔ,f}\tau_f\leq c \tau^{\ast}\max\{\ln \Delta, f\} for the ff-fold transversal number τf\tau_f. Similarly to Johnson, Lov\'asz and Stein, we also show that this bound can be achieved non-probabilistically, using a greedy algorithm. As a combinatorial application, we prove an estimate on how fast τf/f\tau_f/f converges to τ\tau^{\ast}. As a geometric application, we obtain an upper bound on the minimal density of an ff-fold covering of the dd-dimensional Euclidean space by translates of any convex body.

Keywords

Cite

@article{arxiv.1608.01292,
  title  = {Approximating set multi-covers},
  author = {Márton Naszódi and Alexandr Polyanskii},
  journal= {arXiv preprint arXiv:1608.01292},
  year   = {2017}
}

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THE TITLE CHANGED! This is the final version. 7 pages

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