Locally compact property A groups

Harsy Ramsay, Amanda R.

05 1900

Indiana University-Purdue University Indianapolis (IUPUI) / In 1970, Serge Novikov made a statement which is now called, "The Novikov Conjecture" and is considered to be one of the major open problems in topology. This statement was motivated by the endeavor to understand manifolds of arbitrary dimensions by relating the surgery map with the homology of the fundamental group of the manifold, which becomes diffi cult for manifolds of dimension greater than two. The Novikov Conjecture is interesting because it comes up in problems in many different branches of mathematics like algebra, analysis, K-theory, differential geometry, operator algebras and representation theory. Yu later proved the Novikov Conjecture holds for all closed manifolds with discrete fundamental groups that are coarsely embeddable into a Hilbert space. The class of groups that are uniformly embeddable into Hilbert Spaces includes groups of Property A which were introduced by Yu. In fact, Property A is generally a property of metric spaces and is stable under quasi-isometry. In this thesis, a new version of Yu's Property A in the case of locally compact groups is introduced. This new notion of Property A coincides with Yu's Property A in the case of discrete groups, but is different in the case of general locally compact groups. In particular, Gromov's locally compact hyperbolic groups is of Property A.

Property A

Locally compact groups

Novikov conjecture.

Manifolds (Mathematics)

K-theory

Noncommutative differential geometry

Differential topology

D-bar and Dirac Type Operators on Classical and Quantum Domains

McBride, Matthew Scott

29 August 2012

Indiana University-Purdue University Indianapolis (IUPUI) / I study d-bar and Dirac operators on classical and quantum domains subject to the APS boundary conditions, APS like boundary conditions, and other types of global boundary conditions. Moreover, the inverse or inverse modulo compact operators to these operators are computed. These inverses/parametrices are also shown to be bounded and are also shown to be compact, if possible. Also the index of some of the d-bar operators are computed when it doesn't have trivial index. Finally a certain type of limit statement can be said between the classical and quantum d-bar operators on specialized complex domains.

Dirac Operators

Noncommutative Geometry

Operator algebras

Geometric quantization

Noncommutative differential geometry

Dirac equation

Atiyah-Singer index theorem

Functions of several complex variables

Holomorphic mappings

Operator theory

Algebra, Abstract

Noncommutative manifolds and Seiberg-Witten-equations / Nichtkommutative Mannigfaltigkeiten und Seiberg-Witten-Gleichungen

Alekseev, Vadim

07 September 2011

No description available.

510 Mathematik

Mathematics and Computer Science

Nichtkommutative Mannigfaltigkeiten

Sobolevräume

Laplace-Operator

Seiberg Witten-Gleichungen

noncommutative manifolds

Sobolev spaces

Laplace operator

Seiberg-Witten-equations

31.46

31.49

31.55