On the Reidemeister spectrum and the R∞ property for some free nilpotent groups

Abstract

We describe the Reidemeister spectrum SpecRG for G = Nrc, the free nilpotent group of rank r and class c, in the cases: r ∈ N and c = 1; r = 2, 3 and c = 2; r = 2 and c = 3, and prove that any group N2c for c ≥ 4 satisfies to the R∞ property. As a consequence we obtain that every free solvable group S2t of rank 2 and class t ≥ 2 (in particular the free metabelian group M2 = S22 of rank 2) satisfies to the R∞ property. Moreover, we prove that any free solvable group Srt of rank r ≥ 2 and class t big enough also satisfies to the R∞ property.