On some rational extension properties for GLn(q) and even-degree characters fixed by order-2 Galois automorphisms
Abstract
In this note, we prove that if every character of a finite group G fixed by an order-2 Galois automorphism has odd degree, then G has a normal Sylow 2-subgroup. On the way, we study extensions of characters of GLn(q), q odd, to the group extended by the transpose-inverse automorphism and prove that unipotent characters of PSLn(q) extend to rational characters of its automorphism group.
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