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Tuesday Seminar on Topology
Seminar information archive ~05/01|Next seminar|Future seminars 05/02~
| Date, time & place | Tuesday 17:00 - 18:30 056Room #056 (Graduate School of Math. Sci. Bldg.) |
|---|---|
| Organizer(s) | HABIRO Kazuo, KAWAZUMI Nariya, KITAYAMA Takahiro, SAKASAI Takuya |
2011/07/05
16:30-18:00 Room #056 (Graduate School of Math. Sci. Bldg.)
Catherine Oikonomides (The University of Tokyo, JSPS)
The C*-algebra of codimension one foliations which
are almost without holonomy (ENGLISH)
Catherine Oikonomides (The University of Tokyo, JSPS)
The C*-algebra of codimension one foliations which
are almost without holonomy (ENGLISH)
[ Abstract ]
Foliation C*-algebras have been defined abstractly by Alain Connes,
in the 1980s, as part of the theory of Noncommutative Geometry.
However, very few concrete examples of foliation C*-algebras
have been studied until now.
In this talk, we want to explain how to compute
the K-theory of the C*-algebra of codimension
one foliations which are "almost without holonomy",
meaning that the holonomy of all the noncompact leaves
of the foliation is trivial. Such foliations have a fairly
simple geometrical structure, which is well known thanks
to theorems by Imanishi, Hector and others. We will give some
concrete examples on 3-manifolds, in particular the 3-sphere
with the Reeb foliation, and also some slighty more
complicated examples.
Foliation C*-algebras have been defined abstractly by Alain Connes,
in the 1980s, as part of the theory of Noncommutative Geometry.
However, very few concrete examples of foliation C*-algebras
have been studied until now.
In this talk, we want to explain how to compute
the K-theory of the C*-algebra of codimension
one foliations which are "almost without holonomy",
meaning that the holonomy of all the noncompact leaves
of the foliation is trivial. Such foliations have a fairly
simple geometrical structure, which is well known thanks
to theorems by Imanishi, Hector and others. We will give some
concrete examples on 3-manifolds, in particular the 3-sphere
with the Reeb foliation, and also some slighty more
complicated examples.
