Diameters of Homogeneous Spaces
Copyright policy )Diameters of Homogeneous Spaces
Let G be a compact connected Lie group with trivial center. Using the action of G on its Lie algebra, we define an operator norm | |_{G} which induces a bi-invariant metric d_G(x,y)=|Ad(yx^{-1})|_{G} on G. We prove the existence of a constant ��\approx .12 (independent of G) such that for any closed subgroup H \subsetneq G, the diameter of the quotient G/H (in the induced metric) is \geq ��.
- California Institute of Technology United States
- Massachusetts Institute of Technology United States
- Microsoft (United States) United States
Semisimple Lie groups and their representations, operator norm, Quantum Physics, Differential geometry of homogeneous manifolds, FOS: Physical sciences, compact groups, Quantum Physics (quant-ph), Compact groups, discrete subgroups, Homogeneous spaces
Semisimple Lie groups and their representations, operator norm, Quantum Physics, Differential geometry of homogeneous manifolds, FOS: Physical sciences, compact groups, Quantum Physics (quant-ph), Compact groups, discrete subgroups, Homogeneous spaces
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