Borel completeness of Tits buildings with no rank 3 residues of spherical type

Abstract

We prove that, for every Coxeter diagram D with no rank 3 residues of spherical type and such that D has not only edges labelled by 2, the space of countable (Tits) buildings of type D is Borel complete, that is, classifying countable buildings of type D up to isomorphism is as hard as classifying countable graphs up to isomorphism. In particular, for every n≥ 3, the space of countable generalised n-gons is Borel complete.

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