J. Aust. Math. Soc.  73 (2002), 377-392
Strong duality for metacyclic groups

R. Quackenbush
  Department of Mathematics
  University of Manitoba
  Winnipeg, Manitoba R3T 2N2
  Canada
  qbush@cc.umanitoba.ca
and
Cs. Szabó
  Department of Algebra and Number Theory
  ELTE
  Budapest
  Hungary
  csaba@cs.elte.hu


Abstract
Davey and Quackenbush proved a strong duality for each dihedral group $\mathbf{D}_m$ with $m$ odd. In this paper we extend this to a strong duality for each finite group with cyclic Sylow subgroups (such groups are known to be metacyclic).
Download the article in PDF format (size 149 Kb)
TeXAdel Scientific Publishing ©  Australian MS