A group $G$ is said to enjoy ``Hasse principle'' if every local coboundary of $G$ is a global coboundary. Let $G$ be a non-Abelian finite $p$-group of order $p^m$, $p$ prime and $m > 4$ having a normal cyclic subgroup of order $p^{m-2}$ but having no element of order $p^{m-1}$. We prove that $G$ enjoys ``Hasse principle'' if $p$ is odd but in the case $p = 2$, there are fourteen such groups twelve of which enjoy ``Hasse principle'' but the remaining two do not satisfy ``Hasse principle''. We also find all the conjugacy preserving outer automorphisms for these two groups.

Publié le : 2002-04-14
Classification:  Cocycle,  coboundary,  inner automorphism,  conjugacy preserving automorphism,  Hasse principle,  20D45,  20D15

@article{1148392731,
     author = {Kumar, Manoj and Vermani, Lekh Raj},
     title = {On automorphisms of some $p$-groups},
     journal = {Proc. Japan Acad. Ser. A Math. Sci.},
     volume = {78},
     number = {10},
     year = {2002},
     pages = { 46-50},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1148392731}
}

Kumar, Manoj; Vermani, Lekh Raj. On automorphisms of some $p$-groups. Proc. Japan Acad. Ser. A Math. Sci., Tome 78 (2002) no. 10, pp.  46-50. http://gdmltest.u-ga.fr/item/1148392731/