A generalization of Szep's conjecture for almost simple groups
Abstract
We prove a natural generalization of Szep's conjecture. Given an almost simple group G with socle not isomorphic to an orthogonal group having Witt defect zero, we classify all possible group elements x,y∈ G\1\ with G= NG ( x) NG( y), where we are denoting by NG( x) and by NG( y) the normalizers of the cyclic subgroups x and y. As a consequence of this result, we classify all possible group elements x,y∈ G\1\ with G= CG(x) CG(y).
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