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Higher resonance schemes and Koszul modules of simplicial complexes. [PDF]
J Algebr Comb (Dordr)Aprodu M +4 more
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Poincaré inequality for one-forms on four manifolds with bounded Ricci curvature. [PDF]
Arch MathHonda S, Mondino A.
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Computing the alpha complex using dual active set quadratic programming. [PDF]
Sci RepCarlsson E, Carlsson J.
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"In Mathematical Language": On Mathematical Foundations of Quantum Foundations. [PDF]
Entropy (Basel)Plotnitsky A.
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Khovanov Laplacian and Khovanov Dirac for knots and links. [PDF]
J Phys ComplexJones B, Wei GW.
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Automorphisms of O'Grady's Sixdimensional Manifold Acting Trivially on Cohomology
, 2014 Malte Wandel
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Stability of Homomorphisms, Coverings and Cocycles I: Equivalence
Chapman M, Lubotzky A.
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Translations of Mathematical Monographs, 2018
1 Introduction In this thesis we study the basics ofétale cohomology. It is a vast and extremely rich area of mathematics, with plenty of applications. The theory is originally developed by Alexander Grothendieck and his numerous collaborators.
Qing Liu +2 more
semanticscholar +1 more source
1 Introduction In this thesis we study the basics ofétale cohomology. It is a vast and extremely rich area of mathematics, with plenty of applications. The theory is originally developed by Alexander Grothendieck and his numerous collaborators.
Qing Liu +2 more
semanticscholar +1 more source
The Norm Residue Theorem in Motivic Cohomology, 2019
This chapter concerns cohomology operations. Although motivic cohomology was originally defined for smooth varieties over the perfect field 𝑘, it is more useful to view it as a functor defined on the pointed 𝔸1-homotopy category Ho ·, discussed ...
Christian Haesemeyer, Charles A. Weibel
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This chapter concerns cohomology operations. Although motivic cohomology was originally defined for smooth varieties over the perfect field 𝑘, it is more useful to view it as a functor defined on the pointed 𝔸1-homotopy category Ho ·, discussed ...
Christian Haesemeyer, Charles A. Weibel
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Annals of Mathematics, 2019
We establish the flat cohomology version of the Gabber-Thomason purity for etale cohomology: for a complete intersection Noetherian local ring $(R, \mathfrak{m})$ and a commutative, finite, flat $R$-group $G$, the flat cohomology $H^i_{\mathfrak{m}}(R, G)
Kęstutis Česnavičius, P. Scholze
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We establish the flat cohomology version of the Gabber-Thomason purity for etale cohomology: for a complete intersection Noetherian local ring $(R, \mathfrak{m})$ and a commutative, finite, flat $R$-group $G$, the flat cohomology $H^i_{\mathfrak{m}}(R, G)
Kęstutis Česnavičius, P. Scholze
semanticscholar +1 more source