Abstract
We characterise finite unitary rings
$R$
such that all Sylow subgroups of the group of units
$R^{\ast }$
are cyclic. To be precise, we show that, up to isomorphism,
$R$
is one of the three types of rings in
$\{O,E,O\oplus E\}$
, where
$O\in \{GF(q),\mathbb{Z}_{p^{\unicode[STIX]{x1D6FC}}}\}$
is a ring of odd cardinality and
$E$
is a ring of cardinality
$2^{n}$
which is one of seven explicitly described types.
Publisher
Cambridge University Press (CUP)
Cited by
3 articles.
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