Units of Burnside Rings of Elementary Abelian 2-Groups

for spurring me to write these observations, and I thank Halvard Fausk and Gaunce Lewis for careful readings of several drafts and many helpful comments. I thank Madhav Nori and Hyman Bass for help with the ring theory examples and Peter Freyd, Michael Boardman, and Neil Strickland for facts about c

Let µ I denote the minimal number of generators of an ideal I of a local ring R M . The Dilworth number d R = max µ I I an ideal of R and Sperner number sp R = max µ M i i ≥ 0 are determined in the case that R = A G , where G = Z/pZ k is an elementary abelian p-group, A zA is a principal local ring

In this paper we prove that Z 4 p is a CI-group; i.e., two Cayley graphs over the elementary abelian group Z 4 p are isomorphic if and only if their connecting sets are conjugate by an automorphism of the group Z 4 p .