Idempotent states on locally compact quantum groups revisited Pekka Salmi (joint work with Adam Skalski) University of Oulu

Source URL: www.wiko-greifswald.de

• Topological groups
• Lie groups
• Abstract algebra
• Binary operations
• Fourier analysis
• Idempotence
• Idempotent
• Convolution
• Haar measure
• Compact group
• C*-algebra

UNIMODULARITY OF INVARIANT RANDOM SUBGROUPS IAN BIRINGER AND OMER TAMUZ Abstract. An invariant random subgroup H ≤ G is a random closed subgroup whose law is invariant to conjugation by all elements of G. When G is loc

Source URL: people.hss.caltech.edu

• Mathematics
• Algebra
• Mathematical analysis
• Topological groups
• Lie groups
• Geometric group theory
• Group theory
• Fourier analysis
• Amenable group
• Haar measure
• Coset
• Invariant measure

The Haar measure Bachelorprojekt i matematik. Institut for matematiske fag, Københavns Universitet Bachelor Thesis in Mathematics. Department of Mathematical Sciences, University of Copenhagen Marcus D. De Chiffre

Source URL: www.math.ku.dk

• Separation axioms
• Measure theory
• Support
• Locally compact space
• Radon measure
• Finite intersection property
• Haar measure
• Compact space
• Hausdorff space
• Topology
• General topology
• Mathematical analysis

Subject Information Guide Topological Groups MATH4102 Semester 2, 2015 Administration and contact details Host Department Host Institution

Source URL: research.amsi.org.au

• Lie groups
• Fourier analysis
• Symmetry
• Totally disconnected group
• Haar measure
• Compact group
• Locally compact group
• Totally disconnected space
• Group
• Topology
• General topology
• Topological groups

Analysis on compact Lie groups of large dimension and on connected compact groups L. Saloff-Coste∗ Department of mathematics Cornell University

Source URL: www.math.cornell.edu

• Mathematics
• Semigroup
• Convolution
• Compact group
• Haar measure
• Fourier transform
• Gaussian measure
• Mathematical analysis
• Abstract algebra
• Fourier analysis

BULLETIN(New Series) OF THE AMERICANMATHEMATICALSOCIETY Volume 28, Number 2, April 1993 BOREL ACTIONS OF POLISH GROUPS HOWARD BECKER AND ALEXANDER S. KECHRIS

Source URL: www.ams.org

• Descriptive set theory
• General topology
• Topology
• Measure theory
• Topological groups
• Borel set
• Borel equivalence relation
• Haar measure
• Spectrum of a C*-algebra
• Mathematics
• Mathematical analysis
• Mathematical logic

Convergence of random quantum circuits to approximate t-designs and to Haar measure

Source URL: www.lu.lv

• Physics
• Quantum circuit
• Random walk
• Qubit
• Haar measure
• Quantum information science
• Theoretical computer science
• Mathematical analysis

(August 3, [removed]Uniqueness of invariant distributions Paul Garrett [removed] http://www.math.umn.edu/˜garrett/ We give a very general uniqueness proof which gives as corollaries the uniqueness of G-invarian

Source URL: www.math.umn.edu

• Generalized functions
• Functional analysis
• Topological groups
• Distribution
• Dirac delta function
• Derivative
• Locally convex topological vector space
• Haar measure
• Continuous function
• Mathematical analysis
• Mathematics
• Fourier analysis

Discrete Locally Compact Second Countable Groups Sergey Gefter Let G be a non-discrete locally compact second countable group with left Haar measure µ, and Γ be a countable dense subgroup of G. Γ acts on the measure s

Source URL: www.math.iupui.edu

Discrete Locally Compact Second Countable Groups Sergey Gefter Let G be a non-discrete locally compact second countable group with left Haar measure µ, and Γ be a countable dense subgroup of G. Γ acts on the measure s

Source URL: www.imath.kiev.ua