Seminars
RUS  ENG    JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB  
Calendar
Search
Add a seminar

RSS
Forthcoming seminars




Steklov Mathematical Institute Seminar
September 16, 2010 16:00, Moscow, Steklov Mathematical Institute of RAS, Conference Hall (8 Gubkina)
 


The structure of unital maps and the asymptotic quantum Birkhoff conjecture

Peter Shor
Video records:
Windows Media 448.2 Mb
Flash Video 750.2 Mb
MP4 471.0 Mb

Number of views:
This page:1430
Video files:419
Youtube:

Peter Shor
Photo Gallery




Abstract: Birkhoff's theorem states that every doubly stochastic map is a convex combination of permutation matrices. The quantum analog of a stochastic map is a quantum channel, which is a completely positive trace preserving map taking Hermitian matrices to Hermitian matrices. One can ask whether Birkhoff's theorem generalizes to quantum channels. The quantum analog of a doubly stochastic map is a unital channel, i.e. a channel which maps the identity matrix to the identity matrix. The natural generalization of Birkhoff's theorem to quantum channels would be the statement that every unital channel is a convex combination of unitaries. This is false. The weaker “asymptotic Birkhoff conjecture” is that as $n\to\infty$, the tensor product of $n$ copies of a quantum channel is approximated well by a convex combination of unitaries. We show that this is also false, and give a classification of unital maps related to this conjecture.

Language: English
 
  Contact us:
 Terms of Use  Registration to the website  Logotypes © Steklov Mathematical Institute RAS, 2024