prof. Skeide's seminar - change of time
Emanuele Tuillier Illingworth
tuillier at sissa.it
Tue Mar 31 09:05:15 CEST 2009
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MATHEMATICAL PHYSICS SECTOR ACTIVITIES
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Michael Skeide
Università del Molise
Titolo:
Bimodules over B(H) vs Bimodules over L^\infty --- or essentially
commutative
bimodules vs the most noncommutative bimodules that exist
Abstract
B(H), the algebra of all bounded operators on a Hilbert space H, is
often considered the most noncommutative object. However, when we
consider Hilbert bimodules (more precisely, von Neumann bimodules) over
B(H), they are all trivial in the sense that they have an orthnormal
bimodule basis. In other words, they appear as tensor products of B(H)
with a another Hilbert space. They are also centered in the sense that
they are generated by their central elements.
On the contrary, Hilbert or von Neumann bimodules over commutative
algebras are centered, if and only if left and right action coincide.
Although in commutative algebra it is sometimes a comon habit to
consider modules over a commutative ring as bimodules (with left action
equal to right action), in practise, such a behaviour happens almost
never in practical application. For instance, such natural objects as
Brownian motion or Ornstein-Uhlenbeck processes give naturally rise to
bimodules over commutative algebras that do not have a single nonzero
element that would commute with the algebra. Bimodules over commutative
algebras are, therefore, among the most noncommutative objects one can
imagine: Classical probability in terms of Hilbert modules reveals to be
true quantum probability.
Thu. 02 April 2009 at 14.00 in SISSA lecture room D
--
Dr. Emanuele Tuillier Illingworth
Secretary of Mathematical Physics and Elementary Particle sectors
(+39) 040 37 87 598
SISSA
Via Beirut 2-4
Trieste, ITALY
tuillier at sissa.it
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