6 |
7 Noncommutative Geometry
Noncommutative Geometry Speaker: Ivan Dynov (York) "Introduction to von Neumann algebras I" Time: 14:30 Room: MC 106 This lecture series on von Neumann algebras consists of four
lectures. Von Neumann algebras were discovered by von Neumann (and
further developed together with Murray) in the thirties and were
intended to give a rigorous explanation behind quantum mechanics. In
the first lecture we present the definition of von Neumann algebras
and states and give some first properties. In the second lecture, we
continue with the first classification of factors (which are building
blocks of von Neumann algebras), due to Murray and von Neumann. We end
with a generalization of the semi-direct product (as in group theory)
to von Neumann algebras, the so-called crossed product. In the third
lecture we further explore the crossed product, in particular the
famous construction of Krieger, of crossed product of discrete abelian
dynamical systems. The final lecture deals with the Tomita-Takesaki
theory and the classification of type III factors due to Alain Connes.
|
8 Noncommutative Geometry
Noncommutative Geometry Speaker: Ivan Dynov (York) "Introduction to von Neumann algebras II" Time: 14:30 Room: MC 106 This lecture series on von Neumann algebras consists of four
lectures. Von Neumann algebras were discovered by von Neumann (and
further developed together with Murray) in the thirties and were
intended to give a rigorous explanation behind quantum mechanics. In
the first lecture we present the definition of von Neumann algebras
and states and give some first properties. In the second lecture, we
continue with the first classification of factors (which are building
blocks of von Neumann algebras), due to Murray and von Neumann. We end
with a generalization of the semi-direct product (as in group theory)
to von Neumann algebras, the so-called crossed product. In the third
lecture we further explore the crossed product, in particular the
famous construction of Krieger, of crossed product of discrete abelian
dynamical systems. The final lecture deals with the Tomita-Takesaki
theory and the classification of type III factors due to Alain Connes.
Pizza Seminar
Pizza Seminar Speaker: Emre Coskun (Western) "An elementary introduction to elliptic curves" Time: 17:00 Room: MC 108 The theory of elliptic curves is a fascinating field with many connections to algebraic geometry, number theory, complex analysis and even computational problems. In this talk, we introduce these objects in a very elementary manner, describe some of their properties and as an application, we show how they can be used to prove special cases of Fermat's Last Theorem.
|
9 Noncommutative Geometry
Noncommutative Geometry Speaker: Ivan Dynov (York) "Introduction to von Neumann algebras III" Time: 15:00 Room: MC 108 This lecture series on von Neumann algebras consists of four
lectures. Von Neumann algebras were discovered by von Neumann (and
further developed together with Murray) in the thirties and were
intended to give a rigorous explanation behind quantum mechanics. In
the first lecture we present the definition of von Neumann algebras
and states and give some first properties. In the second lecture, we
continue with the first classification of factors (which are building
blocks of von Neumann algebras), due to Murray and von Neumann. We end
with a generalization of the semi-direct product (as in group theory)
to von Neumann algebras, the so-called crossed product. In the third
lecture we further explore the crossed product, in particular the
famous construction of Krieger, of crossed product of discrete abelian
dynamical systems. The final lecture deals with the Tomita-Takesaki
theory and the classification of type III factors due to Alain Connes.
|
10 Stable Homotopy
Stable Homotopy Speaker: Enxin Wu (Western) "Freeness of modules over the Steenrod algebra: part 3" Time: 11:30 Room: MC 108 Noncommutative Geometry
Noncommutative Geometry Speaker: Ivan Dynov (York) "Introduction to von Neumann algebras IV" Time: 12:30 Room: MC 106 This lecture series on von Neumann algebras consists of four
lectures. Von Neumann algebras were discovered by von Neumann (and
further developed together with Murray) in the thirties and were
intended to give a rigorous explanation behind quantum mechanics. In
the first lecture we present the definition of von Neumann algebras
and states and give some first properties. In the second lecture, we
continue with the first classification of factors (which are building
blocks of von Neumann algebras), due to Murray and von Neumann. We end
with a generalization of the semi-direct product (as in group theory)
to von Neumann algebras, the so-called crossed product. In the third
lecture we further explore the crossed product, in particular the
famous construction of Krieger, of crossed product of discrete abelian
dynamical systems. The final lecture deals with the Tomita-Takesaki
theory and the classification of type III factors due to Alain Connes.
|
11 |
12 |
Mathematics Calendar 
Week of December 6, 2009
