Alain Connes - Entropy and the spectral action
This is joint work with A. Chamseddine and W. van Suijlekom. We compute the information theoretic von Neumann entropy of the state associated to the fermionic second quantization of a spectral triple. We show that this entropy is given by the spectral action of the spectral triple for a specific universal function. The main result is the surprising relation between this function and the Riemann zeta function.
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Pierre Emmanuel Caprace - Groups with irreducibly unfaithful subsets for unitary representations
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Alain Connes: On the Notion of Space
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Alain Connes | Noncommutative Geometry, the Spectral Aspect
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Langage mathématique - Alain Connes
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6. Electron Shell Model, Quantum Numbers, and PES (Intro to Solid-State Chemistry)
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Bourbaki, the years 1945-75 - Jean-Pierre Serre, Pierre Cartier, Jacques Dixmier & Alain Connes
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This is not the AI we were promised | The Royal Society
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Shannon Entropy and Information Gain
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Dirac's belt trick, Topology, and Spin ½ particles
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Alain Connes, « Why Four Dimensions and the Standard Model Coupled to Gravity ... »
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ICTP Colloquium - Alain Connes
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The concepts of time and truth. Dialogue between Alain Connes & Daniel Sibony.
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Alain Connes: Extremal Eigenvectors, the Spectral Action, and the Zeta Spectral Triple
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Mikhail Gromov - 1/4 Generation, Transformation, Transmission, Memorization, Storage and (...)
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Alain Connes, Les Mathématiques et la pensée en mouvement : conférence CPES
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The problem with pretending quantum mechanics makes sense | Sean Carroll
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Nigel Higson: A rapid tour through noncommutative geometry
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Scott Aaronson - The TRUTH About Quantum Computing
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Un topo sur les topos - A. Connes
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