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Mathematical logic, algebra and number theory
On unit group of a finite local rings with 4-nilpotent radical of Jacobson
E. V. Zhuravlev Altai State University,
pr. Lenina, 61,
656049, Barnaul, Russia
Abstract:
We describe the structure of the unit group of a commutative finite local rings $R$ of characteristic $p$
with Jacobson radical $J$ such that ${\dim_F J/J^2=2}$, ${\dim_F J^2/J^3=2}$, ${\dim_F J^3=1}$, $J^4=(0)$ and $F=R/J\cong GF(p^r)$, the finite field of $p^r$ elements.
Keywords:
local rings, finite rings, unit group of a ring.
Received April 8, 2017, published June 13, 2017
Citation:
E. V. Zhuravlev, “On unit group of a finite local rings with 4-nilpotent radical of Jacobson”, Sib. Èlektron. Mat. Izv., 14 (2017), 552–567
Linking options:
https://www.mathnet.ru/eng/semr805 https://www.mathnet.ru/eng/semr/v14/p552
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