Kaplansky's conjectures
Giles Gardam (WWU Muenster)
22-Feb-2021, 09:00-10:00 (3 years ago)
Abstract: Kaplansky made various related conjectures about group rings, especially for torsion-free groups. For example, the zero divisors conjecture predicts that if K is a field and G is a torsion-free group, then the group ring K[G] has no zero divisors. I will survey what is known about the conjectures, including their relationships to each other and to other group properties such as orderability, and present some recent progress.
group theory
Audience: researchers in the discipline
Organizer: | Michal Ferov* |
*contact for this listing |
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