<--- Back to Details
First PageDocument Content
Joseph Fourier / Representation theory / Applied mathematics / Sipser–Lautemann theorem / Structural complexity theory / Μ operator / Probabilistic complexity theory / Mathematics / Operator theory
Date: 2012-11-16 00:22:59
Joseph Fourier
Representation theory
Applied mathematics
Sipser–Lautemann theorem
Structural complexity theory
Μ operator
Probabilistic complexity theory
Mathematics
Operator theory

Communication Complexity 23 Sept, 2011 (@ TIFR)

Add to Reading List

Source URL: www.tcs.tifr.res.in

Download Document from Source Website

File Size: 251,38 KB

Share Document on Facebook

Similar Documents

Algebra / Conformal field theory / Abstract algebra / Theoretical physics / Lie algebras / Vertex operator algebra / Virasoro algebra / Von Neumann algebra / Representation theory / Two-dimensional conformal field theory / Planar algebra / Monstrous moonshine

Proc. Int. Cong. of Math. – 2018 Rio de Janeiro, Vol–2602) CONFORMAL FIELD THEORY, VERTEX OPERATOR ALGEBRAS AND OPERATOR ALGEBRAS Yasuyuki Kawahigashi (河東泰之)

DocID: 1xVLK - View Document

Week 5 (due Feb. 12) Reading: Srednicki, sections 43,It follows from eqthat the propagator for the free Dirac field is the Green’s function for the Dirac wave operator. Derive this result in a differen

DocID: 1v0ZY - View Document

J. OPERATOR THEORY), 321–334 c Copyright by Theta, 2004 °

DocID: 1uWbW - View Document

Noah Snyder: Research Statement Quantum Algebra and Quantum Topology I work in an area at the intersection of representation theory, low-dimensional topology, higher category theory, and operator algebras which is often

DocID: 1uTPa - View Document

Operator Theoretic Aspects of Ergodic Theory 2 Monday, 13 June 2016, CAU Kiel, WSP3–Seminarraum 2 9:45 Welcome 10:00 Zolt´an Buczolich Convergence of ergodic averages for many group rotations 11:05 Tanja Eisner

DocID: 1uQWO - View Document