Burnside Rings of Fusions Systems and their Unit Groups

Abstract

For a saturated fusion system F on a p-group S, we study the Burnside ring of the fusion system B( F), as defined by Matthew Gelvin and Sune Reeh, which is a subring of the Burnside ring B(S). We give criteria for an element of B(S) to be in B( F) determined by the F-automorphism groups of essential subgroups of S. When F is the fusion system induced by a finite group G with S as a Sylow p-group, we show that the restriction of B(G) to B(S) has image equal to B( F). We also show that for p=2, we can gain information about the fusion system by studying the unit group B( F)×. When S is abelian, we completely determine this unit group.