Results 251 to 260 of about 652,491 (276)
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The Annals of Mathematics, 1986
This is the second part of the article [for the first part see ibid. 124, 531-569 (1986; Zbl 0653.58035)] where authors consider weakly admissible manifolds - i.e. manifolds with pinched negative curvature, and admissible manifolds - i.e. weakly admissible manifolds with finite volume.
Farrell, F. T., Jones, L. E.
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This is the second part of the article [for the first part see ibid. 124, 531-569 (1986; Zbl 0653.58035)] where authors consider weakly admissible manifolds - i.e. manifolds with pinched negative curvature, and admissible manifolds - i.e. weakly admissible manifolds with finite volume.
Farrell, F. T., Jones, L. E.
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Multiplicative K-theory and K-theory of Functors
Mediterranean Journal of Mathematics, 2008In this article we give a construction of Max Karoubi’s multiplicative K-theory as the K-theory of an appropriate functor between two categories. We use this construction to explain why the two definitions of relative multiplicative K-theory for a compact pair of manifolds we give in the article agree.
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1998
Abstract Just as one goes from the (partial) semigroup {O, 1, 2, ... , N} to ℤ, we can form a group K0 (A) if we first turn the equivalence classes of projections into a semigroup. For inductive limits of finite dimensional C* -algebras, the AF algebras, these K0groups, or dimension groups are a complete invariant—just as they are for
David E Evans, Yasuyuki Kawahigashi
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Abstract Just as one goes from the (partial) semigroup {O, 1, 2, ... , N} to ℤ, we can form a group K0 (A) if we first turn the equivalence classes of projections into a semigroup. For inductive limits of finite dimensional C* -algebras, the AF algebras, these K0groups, or dimension groups are a complete invariant—just as they are for
David E Evans, Yasuyuki Kawahigashi
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2006
1st ed. ; K-theory was invented in the category of algebraic vector bundles over algebraic varieties by A Grothendieck, who was directly motivated by the Hirzebruch-Riemann-Roch theorem which he subsequently greatly generalized. He also defined K-homology in terms of coherent sheaves and established the basic properties of K-theory and K-homology ...
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1st ed. ; K-theory was invented in the category of algebraic vector bundles over algebraic varieties by A Grothendieck, who was directly motivated by the Hirzebruch-Riemann-Roch theorem which he subsequently greatly generalized. He also defined K-homology in terms of coherent sheaves and established the basic properties of K-theory and K-homology ...
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Transactions of the American Mathematical Society, 1980
Dayton, Barry H., Weibel, Charles A.
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Dayton, Barry H., Weibel, Charles A.
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Nuclear effective field theory: Status and perspectives
Reviews of Modern Physics, 2020H -W Hammer +2 more
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Power functional theory for many-body dynamics
Reviews of Modern Physics, 2022Matthias Schmidt
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A new era of cancer immunotherapy: converting theory to performance
Ca-A Cancer Journal for Clinicians, 1999Steven A Rosenberg
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Combining Wave Function Methods with Density Functional Theory for Excited States
Chemical Reviews, 2018Soumen Ghosh +2 more
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