Large girth approximate Steiner triple systems

Abstract

In 1973 Erdos asked whether there are n-vertex partial Steiner triple systems with arbitrary high girth and quadratically many triples. (Here girth is defined as the smallest integer g 4 for which some g-element vertex-set contains at least g-2 triples.) We answer this question, by showing existence of approximate Steiner triple systems with arbitrary high girth. More concretely, for any fixed 4 we show that a natural constrained random process typically produces a partial Steiner triple system with (1/6-o(1))n2 triples and girth larger than . The process iteratively adds random triples subject to the constraint that the girth remains larger than . Our result is best possible up to the o(1)-term, which is a negative power of n.