A 920-block explicit construction guaranteeing a triple intersection with every 6-subset of [60]
Abstract
We present an explicit family B of 920 subsets of size 6 of [60]=\1,…,60\ with the property that every 6-subset S⊂[60] intersects at least one block B∈B in at least three elements, i.e.\ |S B| 3. The construction is purely combinatorial, based on a partition of the ground set into pairs and a pigeonhole argument. We also record a simple counting lower bound and discuss how different partitions of the ten base blocks affect the emergence of triple intersections.
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