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return to viewing 'noncommutative geometry'
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2008-10-16 11:00:36
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Version 12 --> Version 13
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bci1
\textbf{Note:}
The Royal Swedish Academy of Sciences has awarded the 2001 Crafoord Prize in mathematics
to Professor Alain Connes of the Institut des Hautes Ãtudes Scientifiques (IHES) and the
Collège de France, Paris, ``for his penetrating work on the theory of... (quantum)... operator algebras
and for having been a founder of \emph{noncommutative geometry}".
\PMlinkexternal{Crafoord Prize in 2001 in Noncommutative Geometry and Quantum Operator Algebras}{http://www.ams.org/notices/200105/comm-crafoord.pdf}
Professor Alain Connes is also the 1983 recipient of the Field Medal. The following is a concise quote of his work
from the Crafoord Prize announcement in 2001: ``{\em Noncommutative geometry is a new field of mathematics, and
Connes played a decisive role in its creation. His work has also provided powerful new methods for treating renormalization theory and the standard model of quantum and particle physics...(SUSY)...
He has demonstrated that these new mathematical tools can be used for understanding and attacking the Riemann Hypothesis.}'' |
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2008-10-16 10:55:44
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Version 11 --> Version 12
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by
bci1
\textbf{Note:}
The Royal Swedish Academy of Sciences has awarded the 2001 Crafoord Prize in mathematics
to Professor Alain Connes of the Institut des Hautes Ãtudes Scientifiques (IHES) and the
Collège de France, Paris, ``for his penetrating work on the theory of... (quantum)... operator algebras
and for having been a founder of \emph{noncommutative geometry}".
\PMlinkexternal{Crafoord Prize in 2001 in Noncommutative Geometry and Quantum Operator Algebras}{http://www.ams.org/notices/200105/comm-crafoord.pdf} |
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2008-09-18 16:09:28
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Version 10 --> Version 11
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by
bci1
commutative 'spaces' (in fact {\em non-commutative} algebraic structures, or algebras of functions).
\emph{An alternative meaning |
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