Abstract
Navarro has conjectured a necessary and sufficient condition for a finite group $G$ to have a self-normalizing Sylow $2$-subgroup, which is given in terms of the ordinary irreducible characters of $G$. In a previous article, Schaeffer Fry has reduced the proof of this conjecture to showing that certain related statements hold for simple groups. In this article, we describe the action of Galois automorphisms on the HowlettâLehrer parametrization of Harish-Chandra induced characters. We use this to complete the proof of the conjecture by showing that the remaining simple groups satisfy the required conditions.
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