Decomposition of exterior and symmetric squares in characteristic two
Abstract
Let V be a finite-dimensional vector space over a field of characteristic two. As the main result of this paper, for every nilpotent element e ∈ sl(V), we describe the Jordan normal form of e on the sl(V)-modules 2(V) and S2(V). In the case where e is a regular nilpotent element, we are able to give a closed formula. We also consider the closely related problem of describing, for every unipotent element u ∈ SL(V), the Jordan normal form of u on 2(V) and S2(V). A recursive formula for the Jordan block sizes of u on 2(V) was given by Gow and Laffey (J. Group Theory 9 (2006), 659-672). We show that their proof can be adapted to give a similar formula for the Jordan block sizes of u on S2(V).
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