On character tables for fusion systems

Abstract

A character table X for a saturated fusion system F on a finite p-group S is the square matrix of values associated to a basis of the lattice of virtual F-stable ordinary characters of S. We investigate a conjecture of the second author which equates the determinant of X X (the square of the volume of this lattice) with the product of the orders of S-centralisers of fully F-centralised F-class representatives. This statement is exactly column orthogonality for the character table of S when F=FS(S). We prove the conjecture when F=FS(G) is realised by some finite group G with Sylow p-subgroup S, and for all simple fusion systems when |S| p4. We also put forward a potential strategy for the general case, which would exploit properties of the characteristic idempotent of F.