| Popis: |
We determine the action of the outer automorphism group Out$(G)$ on the set of irreducible characters Irr$(G)$ for all finite quasi-simple groups $G$. For groups of Lie type, this includes the construction of an Out$(G)$-equivariant Jordan decomposition of characters (Theorem B). We also prove an extendibility statement, called condition $A(\infty)$, see Theorem A. Among the methods used here in the case of groups of type D and $^2$D, we blend the Shintani descent ideas introduced in [CS19, \S~3] and an analysis of semisimple classes in the dual group $G^*$ from [CS22]. This enables us to control the action of graph and field automorphisms within Lusztig's rational series of characters and to count extendible characters. Condition $A(\infty)$ originates in the program to prove the McKay conjecture using the classification of finite simple groups, see [IMN07]. Using the local results from [MS16], our main theorem implies the McKay conjecture for the prime 3 and all finite groups. |
