Branimir Ćaćić

Department of Mathematics & Statistics · University of New Brunswick, Fredericton

Talks

Upcoming talks

06/2023
Some no-go theorems in noncommutative Riemannian geometry, Session on Noncommutative Geometry and Mathematical Physics, 2023 Canadian Mathematical Society Summer Meeting, University of Ottawa.
05/2023
Quantum principal U(1)-bundles: differential, Riemannian, and metric geometry, Canadian Operator Symposium 2023, University of Western Ontario.

Selected past talks

03/2022
Differentiable Cuntz–Pimsner constructions for Hermitian line modules with connection, Noncommutative Geometry and Topology Seminar, Charles University and the Institute of Mathematics of the Czech Academy of Science.
11/2021
Classical gauge theory on quantum principal bundles, Quantum Field Theory Seminar, Mathematical Institute, University of Oxford.
10/2021
Classical gauge theory on quantum principal bundles, Global ncg Seminar (Europe).
01/2021
Building blocks for gauge theory on quantum principal bundles, Noncommutative Geometry and Topology Seminar, Charles University and the Institute of Mathematics of the Czech Academy of Science.
06/2020
Principal bundles in noncommutative Riemannian geometry, Zagreb Workshop on Operator Theory, University of Zagreb.
05/2020
Gauge theory on noncommutative Riemannian principal bundles, 48th Canadian Operator Symposium, Fields Institute.
Gauge theory on quantum principal bundles, nyc Noncommutative Geometry Seminar, St. John's University.
09/2019
Principal bundles in noncommutative Riemannian geometry, Quantum Flag Manifolds in Prague, Charles University.
08/2019
Gauge theory on noncommutative Riemannian principal bundles, Workshop on New Geometry for Quantum Dynamics, Fields Institute.
11/2018
Noncommutative principal bundles in unbounded KK-theory, Thematic Programme on Bivariant K-Theory in Geometry and Physics, Erwin Schrödinger International Institute for Mathematics and Physics.
08/2017
Spectral triples for discrete groups, MCA 2017 Satellite Conference on Operator Algebras, Fields Institute for Research in Mathematical Sciences.