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- Spectral_triple abstract "In noncommutative geometry and related branches of mathematics and mathematical physics, a spectral triple is a set of data which encodes a geometric phenomenon in an analytic way. The definition typically involves a Hilbert space, an algebra of operators on it and an unbounded self-adjoint operator, endowed with supplemental structures. It was conceived by Alain Connes who was motivated by the Atiyah-Singer index theorem and sought its extension to 'noncommutative' spaces. Some authors refer to this notion as unbounded K-cycles or as unbounded Fredholm modules.".
- Spectral_triple wikiPageID "23856672".
- Spectral_triple wikiPageRevisionID "600093195".
- Spectral_triple hasPhotoCollection Spectral_triple.
- Spectral_triple subject Category:Noncommutative_geometry.
- Spectral_triple comment "In noncommutative geometry and related branches of mathematics and mathematical physics, a spectral triple is a set of data which encodes a geometric phenomenon in an analytic way. The definition typically involves a Hilbert space, an algebra of operators on it and an unbounded self-adjoint operator, endowed with supplemental structures. It was conceived by Alain Connes who was motivated by the Atiyah-Singer index theorem and sought its extension to 'noncommutative' spaces.".
- Spectral_triple label "Spectral triple".
- Spectral_triple sameAs m.06_ws74.
- Spectral_triple sameAs Q17103517.
- Spectral_triple sameAs Q17103517.
- Spectral_triple wasDerivedFrom Spectral_triple?oldid=600093195.
- Spectral_triple isPrimaryTopicOf Spectral_triple.