Irreducible representations of simple algebraic groups in which a unipotent element is represented by a matrix with single non-trivial Jordan block

Abstract

In this paper we prove the following result. Let G be a simply connected simple linear algebraic group of exceptional Lie type over an algebraically closed field F of characteristic p≥ 0, and let u∈ G be a nonidentity unipotent element. Let φ be a non-trivial irreducible representation of G. Then the Jordan normal form of φ(u) contains at most one non-trivial block if and only if G is of type G2, u is a regular unipotent element and φ≤ 7. Note that the irreducible representations of the simple classical algebraic groups in which a non-trivial unipotent element is represented by a matrix whose Jordan form has a single non-trivial block were determined by I.D. Suprunenko (Unipotent elements of non-prime order in representations of the classical algebraic groups: two big Jordan blocks, J. Math. Sci. 199(2014), 350 -- 374.