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Your search keyword '"Lars Hesselholt"' showing total 8 results
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8 results on '"Lars Hesselholt"'

1. Dirac geometry II: coherent cohomology

Author

Lars Hesselholt and Piotr Pstrągowski

Subjects
14A20, 18F20, 55N22, Mathematics, QA1-939
Abstract

Dirac rings are commutative algebras in the symmetric monoidal category of $\mathbb {Z}$ -graded abelian groups with the Koszul sign in the symmetry isomorphism. In the prequel to this paper, we developed the commutative algebra of Dirac rings and defined the category of Dirac schemes. Here, we embed this category in the larger $\infty $ -category of Dirac stacks, which also contains formal Dirac schemes, and develop the coherent cohomology of Dirac stacks. We apply the general theory to stable homotopy theory and use Quillen’s theorem on complex cobordism and Milnor’s theorem on the dual Steenrod algebra to identify the Dirac stacks corresponding to $\operatorname {MU}$ and $\mathbb {F}_p$ in terms of their functors of points. Finally, in an appendix, we develop a rudimentary theory of accessible presheaves.

Published
2024
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4. On the K-theory of division algebras over local fields

Author

Ayelet Lindenstrauss, Michael Larsen, and Lars Hesselholt

Subjects
General Mathematics, 010102 general mathematics, Cyclic homology, Prime number, K-Theory and Homology (math.KT), Trace map, 01 natural sciences, Combinatorics, Residue field, Mathematics - K-Theory and Homology, 0103 physical sciences, FOS: Mathematics, Division algebra, Homomorphism, 010307 mathematical physics, 0101 mathematics, Discrete valuation, Mathematics::Representation Theory, Mathematics
Abstract

Let $K$ be a complete discrete valuation field with finite residue field of characteristic $p$, and let $D$ be a central division algebra over $K$ of finite index $d$. Thirty years ago, Suslin and Yufryakov showed that for all prime numbers $\ell$ different from $p$ and integers $j \geq 1$ , there exists a "reduced norm" isomorphism of $\ell$-adic $K$-groups $\operatorname{Nrd}_{D/K} \colon K_j(D,\mathbb{Z}_{\ell}) \to K_j(K,\mathbb{Z}_{\ell})$ such that $d \cdot \operatorname{Nrd}_{D/K}$ is equal to the norm homomorphism $N_{D/K}$. The purpose of this paper is to prove the analogous result for the $p$-adic $K$-groups. To do so, we employ the cyclotomic trace map to topological cyclic homology and show that there exists a "reduced trace" equivalence $\operatorname{Trd}_{A/S} \colon \operatorname{THH}(A\,|\,D,\mathbb{Z}_p) \to \operatorname{THH}(S\,|\,K,\mathbb{Z}_p)$ between two $p$-complete cyclotomic spectra associated with $D$ and $K$, respectively. Interestingly, we show that if $p$ divides $d$, then it is not possible to choose said equivalence such that, as maps of cyclotomic spectra, $d \cdot \operatorname{Trd}_{A/S}$ agrees with the trace $\operatorname{Tr}_{A/S}$, although this is possible as maps of spectra with $\mathbb{T}$-action.

Published
2019
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7. Topological Hochschild homology and the Hasse-Weil zeta function

Author

Lars Hesselholt

Subjects
Mathematics - Number Theory, Hochschild homology, Mathematics::Number Theory, K-Theory and Homology (math.KT), Hasse–Weil zeta function, Topology, Mathematics::Algebraic Topology, Cohomology, Interpretation (model theory), Circle group, Riemann zeta function, symbols.namesake, Finite field, Mathematics::K-Theory and Homology, Scheme (mathematics), Mathematics - K-Theory and Homology, FOS: Mathematics, symbols, Number Theory (math.NT), Primary 11S40, 19D55, Secondary 14F30, Mathematics
Abstract

We consider the Tate cohomology of the circle group acting on the topological Hochschild homology of schemes. We show that in the case of a scheme smooth and proper over a finite field, this cohomology theory naturally gives rise to the cohomological interpretation of the Hasse-Weil zeta function by regularized determinants envisioned by Deninger. In this case, the periodicity of the zeta function is reflected by the periodicity of said cohomology theory, whereas neither is periodic in general.

Published
2018
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