Almost cyclic regular elements in irreducible representations of simple algebraic groups

Abstract

Let G be a simple linear algebraic group defined over an algebraically closed field of characteristic p≥ 0 and let φ be a p-restricted irreducible representation of G. Let T be a maximal torus of G and s∈ T. We say that s is strongly regular if α(s)β(s) for all distinct T-roots α and β of G. Our main result states that if all but one of the eigenvalues of φ(s) are of multiplicity 1 then, with a few specified exceptions, s is strongly regular. This can be viewed as an extension of our earlier result saying that under the same hypotheses, s must be regular and all non-zero weights of φ are of multiplicity 1.