Projective representations of real reductive Lie groups and the gradient map
Abstract
Let G be a connected semisimple noncompact real Lie group and let : G SL(V) be a representation on a finite dimensional vector space V over R, with (G) closed in SL(V). Identifying G with (G), we assume there exists a K-invariant scalar product g such that G=K( p), where K=SO(V, g) G, p=Symo (V, g) g and g denotes the Lie algebra of G. Here Symo (V, g) denotes the set of symmetric endomorphisms with trace zero. Using the G-gradient map techniques we analyze the natural projective representation of G on P(V).
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