Rational elements in representations of simple algebraic groups, I
Abstract
A finite order element g of a group G is called rational if g is conjugate to gi for every integer i coprime to the order g. We determine all triples (G,g,φ), where G is a simple algebraic group of type An,Bn or Cn over an algebraically closed field of characteristic p≥ 0, g∈ G is a rational odd order semisimple element and φ is an irreducible representation of G such that φ(g) has eigenvalue 1.
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