Add to ORKGA well known argument by Serre shows that there is no Weil cohomology theory with real coefficients for smooth projective varieties over $\bar{\mathbb{F}}_p$. In this note we explain why no "Weil-"cohomology theory with real coefficients can exist for arithmetic schemes over spec $\mathbb{Z}$, even for spectra of number rings
Let $E\mathbb{R}$ be an even-periodic Real Landweber exact $C_2$-spectrum, and $ER$ its spectrum of ...
AbstractWe define, for a regular scheme S and a given field of characteristic zero K, the notion of ...
We compute the Chow-Witt rings of split quadrics over a field of characteristic not two. We even det...
We give a conjectural description of the vanishing order and leading Taylor coefficient of the Zeta ...
In a recent article, Lichtenbaum established the arithmetic utility of the Weil group of a finite fi...
We define and study a Weil-étale topos for any regular, proper scheme X over Spec(Z) which has some...
AbstractIn Section 1, if O is a c.d.v.r. with quotient field of characteristic zero and residue clas...
After a survey of the Weierstrass family and cohomology, we compute the lifted homology of the Weier...
After a survey of the Weierstrass family and cohomology, we compute the lifted homology of the Weier...
This work is dedicated to interpreting in cohomological terms the special values of zeta...
This paper explores analogies between the Weil proof of the Riemann hypothesis for function fields a...
Nekovar and Niziol have introduced in [arxiv:1309.7620] a version of syntomic cohomology valid for a...
AbstractA lot of good properties of étale cohomology only hold for torsion coefficients. We use ultr...
This paper explores analogies between the Weil proof of the Riemann hypothesis for function fields a...
AbstractA lot of good properties of étale cohomology only hold for torsion coefficients. We use ultr...
Let $E\mathbb{R}$ be an even-periodic Real Landweber exact $C_2$-spectrum, and $ER$ its spectrum of ...
AbstractWe define, for a regular scheme S and a given field of characteristic zero K, the notion of ...
We compute the Chow-Witt rings of split quadrics over a field of characteristic not two. We even det...
We give a conjectural description of the vanishing order and leading Taylor coefficient of the Zeta ...
In a recent article, Lichtenbaum established the arithmetic utility of the Weil group of a finite fi...
We define and study a Weil-étale topos for any regular, proper scheme X over Spec(Z) which has some...
AbstractIn Section 1, if O is a c.d.v.r. with quotient field of characteristic zero and residue clas...
After a survey of the Weierstrass family and cohomology, we compute the lifted homology of the Weier...
After a survey of the Weierstrass family and cohomology, we compute the lifted homology of the Weier...
This work is dedicated to interpreting in cohomological terms the special values of zeta...
This paper explores analogies between the Weil proof of the Riemann hypothesis for function fields a...
Nekovar and Niziol have introduced in [arxiv:1309.7620] a version of syntomic cohomology valid for a...
AbstractA lot of good properties of étale cohomology only hold for torsion coefficients. We use ultr...
This paper explores analogies between the Weil proof of the Riemann hypothesis for function fields a...
AbstractA lot of good properties of étale cohomology only hold for torsion coefficients. We use ultr...
Let $E\mathbb{R}$ be an even-periodic Real Landweber exact $C_2$-spectrum, and $ER$ its spectrum of ...
AbstractWe define, for a regular scheme S and a given field of characteristic zero K, the notion of ...
We compute the Chow-Witt rings of split quadrics over a field of characteristic not two. We even det...