Publication date
January 2016
DOIAbstract
We prove that two natural isomorphisms between the first mod m Suslin homology and the mod m abelianized etale fundamental group agree for connected smooth projective schemes over algebraically closed fields
We prove that two natural isomorphisms between the first mod m Suslin homology and the mod m abelianized etale fundamental group agree for connected smooth projective schemes over algebraically closed fields
We study pairs of non-constant maps between two integral schemes of finite type over two (possibly d...
This thesis is about higher dimensional class field theory of varieties over local and finite fields...
Let $K$ be a finite extension of the $p$-adic numbers $\mathbb Q_p$ with ring of integers $\mathcal ...
This thesis is about higher dimensional class field theory of varieties over local and finite fields...
This thesis is about higher dimensional class field theory of varieties over local and finite fields...
For a smooth and proper variety Y over a finite field k the reciprocity map ρY:\CH0(Y)→π\ab1(Y) is i...
For a smooth and proper variety Y over a finite field k the reciprocity map ρY:\CH0(Y)→π\ab1(Y) is i...
For a smooth and proper variety Y over a finite field k the reciprocity map ρY:\CH0(Y)→π\ab1(Y) is i...
For a quasi-projective scheme $X$ admitting a smooth compactification over a local field of residue ...
G. Wiesend [W1] established a class field theory for arithmetic schemes, solely based on data attach...
AbstractFor a connected regular scheme X, flat and of finite type over Spec(Z), we construct a recip...
G. Wiesend [W1] established a class field theory for arithmetic schemes, solely based on data attach...
We use non-abelian fundamental groups to define a sequence of higher reciprocity maps on the adelic ...
G. Wiesend [W1] established a class field theory for arithmetic schemes, solely based on data attach...
We define and study the 2-category of torsors over a Picard groupoid, a central extension of a grou...
We study pairs of non-constant maps between two integral schemes of finite type over two (possibly d...
This thesis is about higher dimensional class field theory of varieties over local and finite fields...
Let $K$ be a finite extension of the $p$-adic numbers $\mathbb Q_p$ with ring of integers $\mathcal ...
This thesis is about higher dimensional class field theory of varieties over local and finite fields...
This thesis is about higher dimensional class field theory of varieties over local and finite fields...
For a smooth and proper variety Y over a finite field k the reciprocity map ρY:\CH0(Y)→π\ab1(Y) is i...
For a smooth and proper variety Y over a finite field k the reciprocity map ρY:\CH0(Y)→π\ab1(Y) is i...
For a smooth and proper variety Y over a finite field k the reciprocity map ρY:\CH0(Y)→π\ab1(Y) is i...
For a quasi-projective scheme $X$ admitting a smooth compactification over a local field of residue ...
G. Wiesend [W1] established a class field theory for arithmetic schemes, solely based on data attach...
AbstractFor a connected regular scheme X, flat and of finite type over Spec(Z), we construct a recip...
G. Wiesend [W1] established a class field theory for arithmetic schemes, solely based on data attach...
We use non-abelian fundamental groups to define a sequence of higher reciprocity maps on the adelic ...
G. Wiesend [W1] established a class field theory for arithmetic schemes, solely based on data attach...
We define and study the 2-category of torsors over a Picard groupoid, a central extension of a grou...
We study pairs of non-constant maps between two integral schemes of finite type over two (possibly d...
This thesis is about higher dimensional class field theory of varieties over local and finite fields...
Let $K$ be a finite extension of the $p$-adic numbers $\mathbb Q_p$ with ring of integers $\mathcal ...
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