Kasparov’s operator K-theory and applications 2. KK-theory Georges Skandalis Universit´ e Paris-Diderot Paris 7 Institut de Math´

Source URL: www.math.vanderbilt.edu

• K-theory
• Linear algebra
• C*-algebras
• KK-theory
• Theoretical physics
• Hilbert C*-module
• Hilbert space
• Baum–Connes conjecture
• Vector space
• Algebra
• Mathematics
• Operator theory

DEFINITIONS: OPERADS, ALGEBRAS AND MODULES J. P. MAY Let S be a symmetric monoidal category with product ⊗ and unit object κ. Definition 1. An operad C in S consists of objects C (j), j ≥ 0, a unit map η : κ → C

Source URL: www.math.uchicago.edu

• Category theory
• Algebraic structures
• Operad theory
• Monoidal categories
• Algebraic topology
• Monoid
• E∞-operad
• Highly structured ring spectrum
• Algebra
• Abstract algebra
• Mathematics

arXiv:1101.0416v2 [math.RT] 24 Jun[removed]QUIVERS OF MONOIDS WITH BASIC ALGEBRAS STUART MARGOLIS AND BENJAMIN STEINBERG Abstract. We compute the quiver of any finite monoid that has a basic algebra over an algebraically c

Source URL: arxiv.org

• Semigroup
• Monoid
• Krohn–Rhodes theory
• Representation theory
• Regular semigroup
• Maximal subgroup
• Quiver
• Symmetric group
• Transformation semigroup
• Abstract algebra
• Algebra
• Semigroup theory

{\bf Title:} Quantum vertex $\C((t))$-algebras and their modules {\bf Abstract:} In this talk, I will present a theory of what we called (weak) quantum vertex $\C((t))$-algebras. First, I will give the basic definitions

Source URL: www4.ncsu.edu

Theory and Applications of Categories, Vol. 28, No. 16, 2013, pp. 435–475. BOUNDED ARCHIMEDEAN `-ALGEBRAS AND GELFAND-NEUMARK-STONE DUALITY GURAM BEZHANISHVILI, PATRICK J. MORANDI, BRUCE OLBERDING Abstract. By Gelfand

Source URL: www.emis.de

• Adjoint functors
• C*-algebras
• Reflective subcategory
• Spectrum of a ring
• Ideal
• Equivalence of categories
• Banach algebra
• Approximately finite dimensional C*-algebra
• Abstract algebra
• Algebra
• Algebraic structures

PROJECTIONS, COMMUTATORS AND LIE IDEALS IN C ∗ -ALGEBRAS L.W. Marcoux Department of Pure Mathematics University of Waterloo Waterloo, Ontario Canada N2L 3G1

Source URL: www.math.uwaterloo.ca

• Linear algebra
• Matrix theory
• Operator theory
• Banach algebra
• Fourier analysis
• Representation theory
• Lie algebra
• C*-algebra
• Trace
• Algebra
• Abstract algebra
• Mathematics

AN INVITATION TO THE SIMILARITY PROBLEMS (AFTER PISIER) NARUTAKA OZAWA Abstract. This note is intended as a handout for the minicourse given in RIMS workshop “Operator Space Theory and its Applications” on January 31

Source URL: www.kurims.kyoto-u.ac.jp

• Banach algebra
• Fourier analysis
• Algebras
• Monoidal categories
• Spectral theory
• C*-algebra
• Mathematical analysis
• Abstract algebra
• Functional analysis

C OMPOSITIO M ATHEMATICA R. W. C ARTER Conjugacy classes in the weyl group Compositio Mathematica, tome 25, no[removed]), p. 1-59.

Source URL: archive.numdam.org

• Algebra
• Lie algebras
• Weyl group
• Root system
• Dynkin diagram
• E8
• G2
• E7
• Character theory
• Abstract algebra
• Lie groups
• Group theory

ENLARGEABILITY AND INDEX THEORY: INFINITE COVERS BERNHARD HANKE AND THOMAS SCHICK Abstract. In [5] we showed non-vanishing of the universal index elements in the K-theory of the maximal C ∗ -algebras of the fundamental

Source URL: www.math.uni-augsburg.de

• Connection
• Operator theory
• Fiber bundles
• Differential topology
• Holonomy
• Connection form
• Vector bundle
• Chern class
• Compact operator
• Mathematical analysis
• Topology
• Differential geometry

The sentinel-journal (Pickens, S.C.).(Pickens, S.C[removed]p ].

Source URL: chroniclingamerica.loc.gov

• Lie algebras
• Lie groups