The (p,q) property in families of d-intervals and d-trees

Abstract

Given integers p q>1, a family of sets satisfies the (p,q) property if among any p members of it some q intersect. We prove that for any fixed integer constants p q>1, a family of d-intervals satisfying the (p,q) property can be pierced by O(dqq-1) points, with constants depending only on p and q. This extends results of Tardos, Kaiser and Alon for the case q=2, and of Kaiser and Rabinovich for the case p=q= log2(d+2) . We further show that similar bounds hold in families of subgraphs of a tree or a graph of bounded tree-width, each consisting of at most d connected components, extending results of Alon for the case q=2. Finally, we prove an upper bound of O(d1p-1) on the fractional piercing number in families of d-intervals satisfying the (p,p) property, and show that this bound is asymptotically sharp.