We study representations (G,V), where G is a compact and connected Lie group acting by isometries on the finite dimensional real euclidean vector space V, such that the orbit space V/G is isometric to the orbit spave W/H of a representation (H,W) where H is a finite extension of a torus. In particular we classify such representations (G,V) when G is simple.
Representations admitting a toric reduction / Francesco Panelli. - (2018).
Representations admitting a toric reduction
Francesco Panelli
2018
Abstract
We study representations (G,V), where G is a compact and connected Lie group acting by isometries on the finite dimensional real euclidean vector space V, such that the orbit space V/G is isometric to the orbit spave W/H of a representation (H,W) where H is a finite extension of a torus. In particular we classify such representations (G,V) when G is simple.
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