Representation Rings of Fusion Systems and Brauer Characters

Abstract

Let F be a fusion system over a p-group S. We study the complex character ring RC(F) of F by applying techniques from modular character theory to F-stable characters. We use these techniques to investigate a conjecture posed by Jason Semeraro concerning the volume of RC(F) as a Z-lattice. Proving it holds for all saturated fusion systems would allow for easy verification that a given set of linearly independent F-stable characters forms a Z-basis of RC(F). We prove that this conjecture holds for all non-exotic fusion systems and a weakened conjecture holds for all fusion systems. We also show that any minimal counter example must be indecomposable by describing the characters of a product of two fusion systems. As a byproduct of our proof method, we describe the modular character rings of F, provide analogues of the decomposition and Cartan matrices for F-stable characters, and give a method for decomposing the regular character of S into F-stable constituents.