Geometric classification of semidirect products in the maximal parabolic subgroup of Sp(2,R)
Abstract
We classify up to conjugation by GL(2,R) (more precisely, block diagonal symplectic matrices) all the semidirect products inside the maximal parabolic of Sp(2,R) by means of an essentially geometric argument. This classification has already been established without geometry, under a stricter notion of equivalence, namely conjugation by arbitrary symplectic matrices. The present approach might be useful in higher dimensions and provides some insight.
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