Rigid automorphisms of linking systems of finite groups of Lie type

Abstract

Let L be a centric linking system associated to a saturated fusion system on a finite p-group S. An automorphism of L is said to be rigid if it restricts to the identity on the fusion system. An inner rigid automorphism is conjugation by some element of the center of S. If L is the centric linking system of a finite group G, then rigid automorphisms of L are closely related to automorphisms of G that centralize S. For odd primes, all rigid automorphisms are known to be inner, but this fails for the prime 2. We determine which known quasisimple linking systems at the prime 2 have a noninner rigid automorphism. Based on previous results, this reduces to handling the case of the linking systems at the prime 2 of finite simple groups of Lie type in odd characteristic. These have no noninner rigid automorphisms with two families of exceptions: the 2-dimensional projective special linear groups and even-dimensional orthogonal groups for quadratic forms of nonsquare discriminant.