The variety of Lie algebra representations
Abstract
We study the affine variety Ln(g) of Lie algebra representations, the collection of all homomorphisms from an arbitrary n-dimensional Lie algebra into a fixed real semi-simple Lie algebra g. Using techniques from real Geometric Invariant Theory, we equip this variety with a natural moment map and associated energy functional arising from the action of the real reductive group GL(n,R) × Inn(g). We analyze the critical points of the energy functional and describe their structure. In particular, we prove that every semi-simple pair, that is representations of semi-simple Lie algebras, will globally minimize the energy in its orbit. As consequences, we obtain an elementary proof of the rigidity of semi-simple homomorphisms and derive a new proof of the Mostow theorem on the existence of compatible Cartan involutions for semi-simple subalgebras. Subsequent results concerning the structure of critical points of higher energy are also obtained.
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