Noncommutative Geometry Seminar
Dirac Type Operators and Lie Groupoids
Pedram Hekmati,
Mathematics,
University of Adelaide,
A rigorous analytic definition of the Dirac operator
on loop spaces is a difficult open problem. When the target space
is a compact Lie group, it is possible to make sense of a Dirac
operator using methods from representation theory. In this talk,
I will briefly review this construction and its application to
twisted K-theory. I will then discuss the construction of a
universal Dirac operator, which leads to a Banach Lie group with
a highly non-trivial topology.
For more information, please contact Farzad Fathizadeh by email at [email protected].
Event Series
Noncommutative Geometry Seminar Series
Event Sponsors