Descent equalities and the inductive McKay condition for types B and E

Abstract

We establish the inductive McKay condition introduced by Isaacs-Malle-Navarro IMN for finite simple groups of Lie types l (l≥ 2), 6, 26 and 7, thus leaving open only the types and 2. We bring to the methods previously used by the authors for type CS17C some descent arguments using Shintani's norm map. This provides for types different from , , 2 a uniform proof of the so-called global requirement of the criterion given by the second author in [2.12]S12. The local requirements from that criterion are verified through a detailed study of the normalizers of relevant Levi subgroups and their characters.