On Automorphisms of Some Finite p-groups
Abstract
We give a sufficient condition on a finite p-group G of nilpotency class 2 so that c(G) = (G), where c(G) and (G) denote the group of all class preserving automorphisms and inner automorphisms of G respectively. Next we prove that if G and H are two isoclinic finite groups (in the sense of P. Hall), then c(G) c(H). Finally we study class preserving automorphisms of groups of order p5 and prove that c(G) = (G) for all the groups of order p5 except two isoclinism families.
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