Group algebras whose group of units is powerful
classification
🧮 math.RA
math.GR
keywords
grouppowerfulwhenp-grouppowersproductunitsabelian
read the original abstract
A p-group is called powerful if every commutator is a product of pth powers when p is odd and a product of fourth powers when p=2. In the group algebra of a group G of p-power order over a finite field of characteristic p, the group of normalized units is always a p-group. We prove that it is never powerful except, of course, when G is abelian.
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