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Absolutely closed semigroups. [PDF]
Rev R Acad Cienc Exactas Fis Nat A MatBanakh T, Bardyla S.
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Oberwolfach Reports, 2012
Noncommutative Geometry applies ideas from geometry to mathematical structures determined by noncommuting variables. This meeting emphasized the connections of Noncommutative Geometry to number theory and ergodic theory.
Alain Connes +3 more
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Noncommutative Geometry applies ideas from geometry to mathematical structures determined by noncommuting variables. This meeting emphasized the connections of Noncommutative Geometry to number theory and ergodic theory.
Alain Connes +3 more
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Oberwolfach Reports, 2016
These reports contain an account of 2015’s meeting on noncommutative geometry. Noncommutative geometry has developed itself over the years to a completely new branch of mathematics shedding light on many other areas as number theory, differential geometry and operator algebras.
Alain Connes +3 more
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These reports contain an account of 2015’s meeting on noncommutative geometry. Noncommutative geometry has developed itself over the years to a completely new branch of mathematics shedding light on many other areas as number theory, differential geometry and operator algebras.
Alain Connes +3 more
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2013
Noncommutative Geometry applies ideas from geometry to mathematical structures determined by noncommuting variables. This meeting emphasized the connections of Noncommutative Geometry to number theory and ergodic theory.
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Noncommutative Geometry applies ideas from geometry to mathematical structures determined by noncommuting variables. This meeting emphasized the connections of Noncommutative Geometry to number theory and ergodic theory.
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2003
Atti Convegno Martina Franca, 2000 Springer Lecture Notes in Mathematics 1831 Contributi di A.CONNES, J.CUNTZ, E.GUENTNER, N.HIGSON, J.KAMINKER, J.E ...
DOPLICHER, Sergio, R. LONGO EDITORS
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Atti Convegno Martina Franca, 2000 Springer Lecture Notes in Mathematics 1831 Contributi di A.CONNES, J.CUNTZ, E.GUENTNER, N.HIGSON, J.KAMINKER, J.E ...
DOPLICHER, Sergio, R. LONGO EDITORS
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2009
Many of the different aspects of Noncommutative Geometry were represented in the talks. The list of topics that were covered includes in particular new insight into the geometry of a noncommutative torus, local index formulae in various situations, C*-algebras and dynamical systems associated with number theoretic structures, new methods in K-theory for
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Many of the different aspects of Noncommutative Geometry were represented in the talks. The list of topics that were covered includes in particular new insight into the geometry of a noncommutative torus, local index formulae in various situations, C*-algebras and dynamical systems associated with number theoretic structures, new methods in K-theory for
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2011
Noncommutative Geometry applies ideas from geometry to mathematical structures determined by noncommuting variables. This meeting concentrated primarily on those aspects of Noncommutative Geometry that are related to index theory and on the connections between operator algebras and number theory.
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Noncommutative Geometry applies ideas from geometry to mathematical structures determined by noncommuting variables. This meeting concentrated primarily on those aspects of Noncommutative Geometry that are related to index theory and on the connections between operator algebras and number theory.
openaire +1 more source