Phase transition for the existence of van Kampen 2-complexes in random groups

Abstract

Gromov showed that (1993) with high probability, every bounded and reduced van Kampen diagram D of a random group at density d satisfies the isoperimetric inequality |∂ D|≥ (1-2d-s)|D|. In this article, we adapt Gruber-Mackay's prove for random triangular groups, showing a non-reduced 2-complex version of this inequality. Moreover, for any 2-complex Y of a given geometric form, we exhibit a phase transition: we give explicitly a critical density dc depending only on Y such that, in a random group at density d, if d<dc then there is no reduced van Kampen 2-complex of the form Y; while if d>dc then there exists reduced van Kampen 2-complexes of the form Y. As an application, we show a phase transition for the C(p) small-cancellation condition: for a random group at density d, if d<1/(p+1) then it satisfies C(p); while if d>1/(p+1) then it does not satisfy C(p).