Thompson-like groups, Reidemeister numbers, and fixed points
Abstract
We investigate fixed-point properties of automorphisms of groups similar to R. Thompson's group F. Revisiting work of Goncalves-Kochloukova, we deduce a cohomological criterion to detect infinite fixed-point sets in the abelianization, implying the so-called property R∞. Using the BNS -invariant and drawing from works of Goncalves-Sankaran-Strebel and Zaremsky, we show that our tool applies to many F-like groups, including Stein's F2,3, Cleary's Fτ, the Lodha-Moore groups, and the braided version of F.
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