114 research outputs found
Quantum Isometry Group for Spectral Triples with Real Structure
Given a spectral triple of compact type with a real structure in the sense of
[Dabrowski L., J. Geom. Phys. 56 (2006), 86-107] (which is a modification of
Connes' original definition to accommodate examples coming from quantum group
theory) and references therein, we prove that there is always a universal
object in the category of compact quantum group acting by orientation
preserving isometries (in the sense of [Bhowmick J., Goswami D., J. Funct.
Anal. 257 (2009), 2530-2572]) and also preserving the real structure of the
spectral triple. This gives a natural definition of quantum isometry group in
the context of real spectral triples without fixing a choice of 'volume form'
as in [Bhowmick J., Goswami D., J. Funct. Anal. 257 (2009), 2530-2572]
An averaging trick for smooth actions of compact quantum groups on manifolds
We prove that, given any smooth action of a compact quantum group (in the
sense of \cite{rigidity}) on a compact smooth manifold satisfying some more
natural conditions, one can get a Riemannian structure on the manifold for
which the corresponding -valued inner product on the space of
one-forms is preserved by the action
Quantum Isometry Groups: Examples and Computations
In this follow-up of the article: Quantum Group of Isometries in Classical
and Noncommutative Geometry(arXiv:0704.0041) by Goswami, where quantum isometry
group of a noncommutative manifold has been defined, we explicitly compute such
quantum groups for a number of classical as well as noncommutative manifolds
including the spheres and the tori. It is also proved that the quantum isometry
group of an isospectral deformation of a (classical or noncommutative) manifold
is a suitable deformation of the quantum isometry group of the original
(undeformed) manifold.Comment: minor corrections and notational changes made; results of section 3
strengthened by relaxing the assumption of nuclearit
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