A 910-block explicit construction guaranteeing a triple intersection with every 6-subset of [60]

Abstract

We present a simple explicit family B of 910 6-subsets of [60]=\1,…,60\ such that every 6-subset S⊂[60] intersects at least one block B∈B in at least three elements, i.e.\ |S B| 3. Equivalently, B is a covering (dominating set) of the Johnson graph J(60,6) with covering radius 3 in the Johnson metric. The construction is purely combinatorial, based on a fixed split of [60] into two halves, a pairing of each half, and a pigeonhole argument. We also record a crude counting lower bound and a straightforward generalization to [2m] (with m even).