Prime degree irreducible representations of simple algebraic groups and finite simple groups of Lie type

Abstract

We show that finite quasisimple groups of Lie type in characteristic p with an irreducible representation of prime degree r over a finite field of characteristic p have orders bounded above by a function of r, independent of p. We also bound the number of such groups in terms of r. Apart from being notable in their own right, these results have a significant application in a computational version of the strong approximation theorem for finitely generated Zariski-dense subgroups of SLr(P), where P is a number field.

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