School of Mathematics & Physics, University of Lincoln
On Wednesday 24 January, Dr Maurice Chiodo (University of Cambridge) visited Lincoln and gave a talk “Quotients of groups by torsion elements”.
Abstract: The quotient of a group by the normal closure of all its torsion elements need not be torsion-free. However, iterating this process a countably-infinite number of times yields the universal torsion-free quotient of . With this in mind, we define the Torsion Length of a group to be the minimum number of such quotients needed to yield a torsion-free group (or if no such number exists). Finding examples of groups with infinite torsion length is somewhat tricky, especially if one restricts to finitely presented, or even finitely generated groups. I’ll aim to discuss some of these examples, and give an overview of how the constructions work.
This is a joint work with Rishi Vyas.
Reblogged this on Maths & Physics News.