Augmentation Quotients for Burnside Rings of some Finite p-Groups
Abstract
Let G be a finite group, (G) be its Burnside ring, and (G) its augmentation ideal. Denote by n(G) and Qn(G) the n-th power of (G) and the n-th consecutive quotient group n(G)/n+1(G), respectively. This paper provides an explicit Z-basis for n(H) and determine the isomorphism class of Qn(H) for each positive integer n, where H= g,h |\, gpm=hp=1, h-1gh=gpm-1+1, p is an odd prime.
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