This document is a short user’s guide to the theory of motives and homotopy theory in the setting of logarithmic geometry. We review some of the basic ideas and results in relation to other works on motives with modulus, motivic homotopy theory, and reciprocity sheaves
Vladimir Voevodsky constructed a triangulated category of motives to “universally linearize the geom...
Abstract. A report on recent results and outstanding problems concerning motives associated to graph...
We study the semitopologization functor of Friedlander and Walker from the perspective of motivic ho...
This document is a short user’s guide to the theory of motives and homotopy theory in the setting of...
Building upon recent work by Binda, Park, and Østvær we construct a theory of motives with compact s...
In this thesis, we use logarithmic methods to study motivic objects. Let R be a complete discrete va...
2. What is logarithmic geometry? 1 3. Applications to moduli theory and enumerative geometry
This thesis introduces two notions of motive associated to a log scheme. We introduce a category of...
This is an \u201celementary\u201d introduction to the conjectural theory of motives along the lines ...
A paraître aux Annals of K-theory.We construct and study a triangulated category of motives with mod...
In this work, I extend the theory of motives, as developed by Voevodsky and Morel-Voevodsky, to the ...
We survey certain accessible aspects of Grothendieck’s theory of motives in arithmetic algebraic geo...
In this thesis, we use logarithmic methods to study motivic objects. Let R be a complete discrete va...
International audienceThe aim of this work is to construct certain homotopy t-structures on various ...
The theory of motives was created by Grothendieck in the 1960s as he searched for a universal cohomo...
Vladimir Voevodsky constructed a triangulated category of motives to “universally linearize the geom...
Abstract. A report on recent results and outstanding problems concerning motives associated to graph...
We study the semitopologization functor of Friedlander and Walker from the perspective of motivic ho...
This document is a short user’s guide to the theory of motives and homotopy theory in the setting of...
Building upon recent work by Binda, Park, and Østvær we construct a theory of motives with compact s...
In this thesis, we use logarithmic methods to study motivic objects. Let R be a complete discrete va...
2. What is logarithmic geometry? 1 3. Applications to moduli theory and enumerative geometry
This thesis introduces two notions of motive associated to a log scheme. We introduce a category of...
This is an \u201celementary\u201d introduction to the conjectural theory of motives along the lines ...
A paraître aux Annals of K-theory.We construct and study a triangulated category of motives with mod...
In this work, I extend the theory of motives, as developed by Voevodsky and Morel-Voevodsky, to the ...
We survey certain accessible aspects of Grothendieck’s theory of motives in arithmetic algebraic geo...
In this thesis, we use logarithmic methods to study motivic objects. Let R be a complete discrete va...
International audienceThe aim of this work is to construct certain homotopy t-structures on various ...
The theory of motives was created by Grothendieck in the 1960s as he searched for a universal cohomo...
Vladimir Voevodsky constructed a triangulated category of motives to “universally linearize the geom...
Abstract. A report on recent results and outstanding problems concerning motives associated to graph...
We study the semitopologization functor of Friedlander and Walker from the perspective of motivic ho...
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