Abstract: | A group G is saturated with groups in a set X if every finite subgroup of G is embeddable in G into a subgroup L isomorphic
to some group in X. We show that a Shunkov group has a periodic part if the saturating set for it coincides with one of the
following: {L2(q)}, {Sz(q)}, {Re(q)}, or {U3(2n)}.
Translated fromAlgebra i Logika, Vol. 38, No. 1, pp. 96–125, January–February, 1999. |