Sigma theory and twisted conjugacy. II: Houghton groups and pure symmetric automorphism groups
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Publication:906126
DOI10.2140/pjm.2016.280.349zbMath1383.20026arXiv1412.8048OpenAlexW2963622391MaRDI QIDQ906126
Parameswaran Sankaran, Daciberg Lima Gonçalves
Publication date: 29 January 2016
Published in: Pacific Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1412.8048
twisted conjugacyHoughton groupsinfinite symmetric groupsigma theoryReidemeister numberpure symmetric automorphism groups
Conjugacy classes for groups (20E45) Geometric group theory (20F65) Homological methods in group theory (20J05) Automorphisms of infinite groups (20E36)
Related Items (10)
The \(R_\infty\) and \(S_\infty\) properties for linear algebraic groups ⋮ Twisted conjugacy in classical Chevalley groups over certain domains of positive characteristic ⋮ Invariable generation and the Houghton groups ⋮ Structure and automorphisms of pure virtual twin groups ⋮ A note on the R∞ property for groups FAlt(X)⩽G⩽Sym(X) ⋮ Twisted conjugacy in PL-homeomorphism groups of the circle ⋮ Some remarks on twin groups ⋮ Twisted conjugacy and commensurability invariance ⋮ On the finite index subgroups of Houghton's groups ⋮ Twisted conjugacy in \(\mathrm{GL}_2\) and \(\mathrm{SL}_2\) over polynomial algebras over finite fields
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