Model theory of Steiner triple systems
Abstract
A Steiner triple system is a set S together with a collection B of subsets of S of size 3 such that any two elements of S belong to exactly one element of B. It is well known that the class of finite Steiner triple systems has a Fra\"ss\'e limit MF. Here we show that the theory TSq of MF is the model completion of the theory of Steiner triple systems. We also prove that TSq is not small and it has quantifier elimination, TP2, NSOP1, elimination of hyperimaginaries and weak elimination of imaginaries.
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