Matrices of simple spectrum in irreducible representations of cyclic extensions of simple algebraic groups

Abstract

Let H be a linear algebraic group whose connected component G≠ 1 is simple and H/G is cyclic. We determine the irreducible projective representations φ of H such that φ(G) is irreducible and φ(h) has simple spectrum for some h∈ H. The latter means that all irreducible constituents of the group φ( h) are of multiplicity 1. (Here h is the subgroup of H generated by h.) This extends an earlier known result for H=G.