Jordan blocks of unipotent elements in some irreducible representations of classical groups in good characteristic
Abstract
Let G be a classical group with natural module V over an algebraically closed field of good characteristic. For every unipotent element u of G, we describe the Jordan block sizes of u on the irreducible G-modules which occur as composition factors of V V*, 2(V), and S2(V). Our description is given in terms of the Jordan block sizes of the tensor square, exterior square, and the symmetric square of u, for which recursive formulae are known.
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