Improved bounds on a generalization of Tuza's conjecture
Abstract
For an r-uniform hypergraph H, let (m)(H) denote the maximum size of a set~M of edges in H such that every two edges in M intersect in less than m vertices, and let τ(m)(H) denote the minimum size of a collection C of m-sets of vertices such that every edge in H contains an element of C. The fractional analogues of these parameters are denoted by *(m)(H) and τ*(m)(H), respectively. Generalizing a famous conjecture of Tuza on covering triangles in a graph, Aharoni and Zerbib conjectured that for every r-uniform hypergraph H, τ(r-1)(H)/(r-1)(H) ≤ r+12. In this paper we prove bounds on the ratio between the parameters τ(m) and (m), and their fractional analogues. Our main result is that, for every r-uniform hypergraph~H, \[ τ*(r-1)(H)/(r-1)(H) cases 34r - r4(r+1) &for r even,\\ 34r - r4(r+2) &for r odd. \\ cases \] This improves the known bound of r-1. We also prove that, for every r-uniform hypergraph H, τ(m)(H)/*(m)(H) exm(r, m+1), where the Tur\'an number exr(n, k) is the maximum number of edges in an r-uniform hypergraph on n vertices that does not contain a copy of the complete r-uniform hypergraph on k vertices. Finally, we prove further bounds in the special cases (r,m)=(4,2) and (r,m)=(4,3).
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