Strongly real adjoint orbits of complex symplectic Lie group
Abstract
We consider the adjoint action of the symplectic Lie group Sp(2n,C) on its Lie algebra sp(2n,C). An element X ∈ sp(2n,C) is called AdSp(2n,C)-real if -X = Ad(g)X for some g ∈ Sp(2n,C). Moreover, if -X = Ad(h)X for some involution h ∈ Sp(2n,C), then X ∈ sp(2n,C) is called strongly AdSp(2n,C)-real. In this paper, we prove that for every element X ∈ sp(2n,C), there exists a skew-involution g ∈ Sp(2n,C) such that -X =Ad(g)X. Furthermore, we classify the strongly AdSp(2n,C)-real elements in sp(2n,C). We also classify skew-Hamiltonian matrices that are similar to their negatives via a symplectic involution.
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