The universality of Hughes-free division rings
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Publication:2047273
DOI10.1007/s00029-021-00691-wOpenAlexW3186974731MaRDI QIDQ2047273
Publication date: 19 August 2021
Published in: Selecta Mathematica. New Series (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00029-021-00691-w
crossed productslocally indicable groupsHughes-free division ringSylvester matrix rank functionsuniversal division ring of fractions
Group rings (16S34) Geometric group theory (20F65) Infinite-dimensional and general division rings (16K40) Twisted and skew group rings, crossed products (16S35) Skew fields, division rings (12E15)
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Cites Work
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- The virtual Haken conjecture (with an appendix by Ian Agol, Daniel Groves and Jason Manning).
- Right-ordered groups
- Homological and topological properties of locally indicable groups
- Amenable groups that act on the line.
- Determining homomorphisms to skew fields
- Homological methods applied to the derived series of groups
- Free division rings of fractions of crossed products of groups with Conradian left-orders
- Sylvester rank functions for amenable normal extensions
- The strong Atiyah and Lück approximation conjectures for one-relator groups
- The Hanna Neumann conjecture for Demushkin groups
- Algebraic entropy of amenable group actions
- On a Theorem of Ian Hughes About Division Rings of Fractions
- Criteria for virtual fibering
- Universal fields of fractions for polycyclic group algebras
- Bivariant and extended Sylvester rank functions
- A note on the vanishing of the 2nd $L^2$-Betti number
- Residually finite rationally solvable groups and virtual fibring
- Division Rings of Fractions for Group Rings
- Division rings of fractions for group rings, II
- On Ordered Division Rings
