A radius 1 irreducibility criterion for lattices in products of trees

Abstract

Let T1, T2 be regular trees of degrees d1, d2 ≥ 3. Let also ≤ Aut(T1) × Aut(T2) be a group acting freely and transitively on VT1 × VT2. For i=1 and 2, assume that the local action of on Ti is 2-transitive; if moreover di ≥ 7, assume that the local action contains Alt(di). We show that is irreducible, unless (d1, d2) belongs to an explicit small set of exceptional values. This yields an irreducibility criterion for that can be checked purely in terms of its local action on a ball of radius~1 in T1 and T2. Under the same hypotheses, we show moreover that if is irreducible, then it is hereditarily just-infinite, provided the local action on Ti is not the affine group F5 F5*. The proof of irreducibility relies, in several ways, on the Classification of the Finite Simple Groups.