Simultaneous ping-pong for finite subgroups of reductive groups

Abstract

Let be a Zariski-dense subgroup of a reductive group G defined over a field F. Given a finite collection of finite subgroups Hi (i ∈ I) of G(F) avoiding the center, we establish a criterion to ensure that the set of elements of that form a free product with every Hi (the so-called simultaneous ping-pong partners for Hi) is both Zariski- and profinitely dense in . This criterion applies namely to direct products G of inner R-forms of (P)GLn, and gives a positive answer to this particular case of a question asked by Bekka, Cowling and de la Harpe. For torsion elements, a complication arises due to the fact that a finite cyclic group can split into a direct product. When G is the multiplicative group of a semisimple algebra, we also give a more explicit method to obtain free products between two given finite subgroups, via first-order deformations. In the second half, we investigate the case where G is the multiplicative group of the group algebra FG of a finite group G, and is the group of units of an order in FG. In this regard, we prove that the set of bicylic units that play ping-pong with a given shifted bicyclic unit, is Zariski- and profinitely dense, addressing a long-standing belief in the field of group rings. This result is deduced from the criterion above, combined with sharp existence results for well-behaved irreducible representations of G that are center-preserving on a given subgroup.

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