Twisted conjugacy classes in unitriangular groups

Abstract

Let R be an integral domain of zero characteristic. In this note we study the Reidemeister spectrum of the group UTn(R) of unitriangular matrices over R. We prove that if R+ is finitely generated and n>2|R*|, then UTn(R) possesses the R∞-property, i. e. the Reidemeister spectrum of UTn(R) contains only ∞, however, if n≤|R*|, then the Reidemeister spectrum of UTn(R) has nonempty intersection with N. If R is a field, then we prove that the Reidemeister spectrum of UTn(R) coincides with \1,∞\, i. e. in this case UTn(R) does not possess the R∞-property.