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BEGIN:VEVENT
UID:/NewsandEvents/Archives/2024/newsitem/15287/2-
December-2024-KdVI-General-Mathematics-Colloquium-
Matthias-Christandl
DTSTAMP:20241119T171401
SUMMARY:KdVI General Mathematics Colloquium, Matth
ias Christandl
ATTENDEE;ROLE=Speaker:Matthias Christandl
DTSTART;TZID=Europe/Amsterdam:20241202T160000
DTEND;TZID=Europe/Amsterdam:20241202T170000
LOCATION:Room L016, CWI, Science Park 123, Amsterd
am
DESCRIPTION:Quantum entropy (aka von Neumann entro
py) is the quantum generalization of Shannon entro
py. Its utility in quantum information theory para
llels that of Shannon entropy in traditional infor
mation theory, thereby being a foundational concep
t for the field. Of particular importance are the
relations of the quantum entropies of a larger sys
tem and its individual parts. Finding all of them
would be settling the 'laws of quantum information
theory' (Pippenger). So how far have we come? No
prior knowledge in quantum information or even cl
assical information theory is assumed. I will poin
t out some relations to linear algebra, functional
analysis, symplectic geometry and representation
theory. The closure of the mentioned relations for
m a cone. The patient listener will be looking for
ward to a filled version of one
X-ALT-DESC;FMTTYPE=text/html:\n Quantum entrop
y (aka von Neumann entropy) is the quantum general
ization of Shannon entropy. Its utility in quantum
information theory parallels that of Shannon entr
opy in traditional information theory, thereby bei
ng a foundational concept for the field. Of partic
ular importance are the relations of the quantum e
ntropies of a larger system and its individual par
ts. Finding all of them would be settling the 'law
s of quantum information theory' (Pippenger). So h
ow far have we come?
\n No prior knowledge
in quantum information or even classical informati
on theory is assumed. I will point out some relati
ons to linear algebra, functional analysis, symple
ctic geometry and representation theory. The closu
re of the mentioned relations form a cone. The pat
ient listener will be looking forward to a filled
version of one 
\n
URL:https://kdvi.uva.nl/news-and-events/colloquia/
general-mathematics-colloquium.html
CONTACT:Jeroen Zuiddam at j.zuiddam at uva.nl
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