Nonrealizability of certain representations in fusion systems

Abstract

For a finite abelian p-group A and a subgroup (A), we say that the pair (,A) is fusion realizable if there is a saturated fusion system F over a finite p-group S A such that CS(A)=A, AutF(A)= as subgroups of Aut(A), and A is not normal in F. In this paper, we develop tools to show that certain representations are not fusion realizable in this sense. For example, we show, for p=2 or 3 and one of the Mathieu groups, that the only Fp-modules that are fusion realizable (up to extensions by trivial modules) are the Todd modules and in some cases their duals.