On equality of central and class preserving automorphisms of finite p-groups

Abstract

Let G be a finite non-abelian p-group, where p is a prime. Let Autc(G) and Autz(G) respectively denote the group of all class preserving and central automorphisms of G. We give a necessary condition for G such that Autc(G)=Autz(G) and give necessary and sufficient conditions for G with elementary abelian or cyclic center such that Autc(G)=Autz(G). We also characterize all finite p-groups G of order ≤ p7 such that Autc(G)=Autz(G) and complete the classification of all finite p-groups of order p5 for which there exist non-inner class preserving automorphisms.