Reidemeister numbers for arithmetic Borel subgroups in type A

Abstract

The Reidemeister number R() of a group automorphism ∈ Aut(G) encodes the number of orbits of the -twisted conjugation action of G on itself, and the Reidemeister spectrum of G is defined as the set of Reidemeister numbers of all of its automorphisms. We obtain a sufficient criterion for some groups of triangular matrices over integral domains to have property R∞, which means that their Reidemeister spectrum equals \∞\. Using this criterion, we show that Reidemeister numbers for certain soluble S-arithmetic groups behave differently from their linear algebraic counterparts -- contrasting with results of Steinberg, Bhunia, and Bose.