On groups with a strongly embedded unitary subgroup

Abstract

The proper subgroup B of the group G is called strongly embedded, if 2∈π(B) and 2π(B Bg) for any element g ∈ G B and, therefore, NG(X) ≤ B for any 2-subgroup X ≤ B . An element a of a group G is called finite if for all g∈ G the subgroups a, ag are finite. In the paper, it is proved that the group with finite element of order 4 and strongly embedded subgroup isomorphic to the Borel subgroup of U3(Q) over a locally finite field Q of characteristic 2 is locally finite and isomorphic to the group U3(Q). Keywords: A strongly embedded subgroup of a unitary type, subgroups of Borel, Cartan, involution, finite element.