Yu. N. Maltsev, E. V. Zhuravlev, “On finite strongly critical rings”, Sib. Èlektron. Mat. Izv., 2020, Volume 17,Pages <nobr>1722

Mathematical logic, algebra and number theory

On finite strongly critical rings

Yu. N. Maltsev^a, E. V. Zhuravlev^b

^a Altai State Pedagogical University, 55, Molodeghnaya str., Barnaul, 656031, Russia
^b Altai State University, 61, Lenina ave., Barnaul, 656049, Russia

Abstract: In the present paper, some properties of strongly critical rings are investigated. It is proved that every simple finite ring and each critical ring of order $ p ^ 2 $ ($ p $ is a prime) are strongly critical. There is an example of critical ring of order 8 which is not strongly critical. It is also proved that if $ R $ is a finite ring and $ M_n (R) $ is a strongly critical ring, then $ R $ is a strongly critical ring. For rings with unity, it is proved that: 1) if $ R $ is a finite ring, $ R / J (R) = M_n (GF (q)) $ and $ J (R) $ is a strongly critical ring, then $ R $ is a strongly critical ring; 2) $R$ is strongly critical ring iff $M_n(R)$ is a strongly critical ring (for any $n\geq 1$).

Keywords: finite ring, critical ring, strongly critical ring.

UDC: 512.552.4

MSC: 16R10

Received April 13, 2020, published October 26, 2020

DOI: 10.33048/semi.2020.17.117