Add to ORKGThese are the notes of a course for the summer school Model Theory in Bilbao hosted by the Basque Center for Applied Mathematics (BCAM) and the Universidad del Pa\'is Vasco/Euskal Herriko Unibertsitatea in September 2023. The goal of this course is to prove the Ax-Kochen-Ershov (AKE) theorem. This classical result in model theory was proven by Ax and Kochen and independently by Ershov in 1965-1966. The AKE theorem is considered as the starting point of the model theory of valued fields and witnessed numerous refinements and extensions. To a certain measure, motivic integration can be considered as such. The AKE theorem is not only an important result in model theory, it yields a striking application to $p$-adic arithmetics. Artin conjectu...
We show Poincar\'e Duality for $\mathbf{F}_p$-\'etale cohomology of a smooth proper rigid space over...
We show that a system of r quadratic forms over a -adic field in at least 4r+1 variables will have a...
The thesis addresses certain problems in the model theory of henselian fields, with a special focus ...
This thesis is concerned with developing a model theoretic understanding of henselian valued fields....
Dedicated to the memory of Professor Jun-ichi Igusa Abstract. We give an algebraic geometric proof o...
Valuacija je homomorfizem, ki slika multiplikativno grupo obrnljivih elementov polja v urejeno abelo...
In this work we begin with a brief survey of set theory and arithmetic to provide background for a l...
We study the domination monoid in various classes of structures arising from the model theory of hen...
AbstractThe p-adic analogue of the real holomorphy ring is defined. With the introduction of the Koc...
In this bachelor's thesis we give a complete proof of the Kronecker-Weber theorem, which states that...
Let M denote the maximal ideal of the ring of integers of a non-Archimedean field K with residue cla...
Let $K$ be a discrete valuation field with perfect residue field, we study the functor from weakly a...
O presente trabalho tem por objetivo apresentar a prova de um teorema de James Ax e Simon B. Kochen ...
O presente trabalho tem por objetivo apresentar a prova de um teorema de James Ax e Simon B. Kochen ...
ABSTRACT. We transpose Delon’s analysis of types in valued fields to unramified henselian valued fie...
We show Poincar\'e Duality for $\mathbf{F}_p$-\'etale cohomology of a smooth proper rigid space over...
We show that a system of r quadratic forms over a -adic field in at least 4r+1 variables will have a...
The thesis addresses certain problems in the model theory of henselian fields, with a special focus ...
This thesis is concerned with developing a model theoretic understanding of henselian valued fields....
Dedicated to the memory of Professor Jun-ichi Igusa Abstract. We give an algebraic geometric proof o...
Valuacija je homomorfizem, ki slika multiplikativno grupo obrnljivih elementov polja v urejeno abelo...
In this work we begin with a brief survey of set theory and arithmetic to provide background for a l...
We study the domination monoid in various classes of structures arising from the model theory of hen...
AbstractThe p-adic analogue of the real holomorphy ring is defined. With the introduction of the Koc...
In this bachelor's thesis we give a complete proof of the Kronecker-Weber theorem, which states that...
Let M denote the maximal ideal of the ring of integers of a non-Archimedean field K with residue cla...
Let $K$ be a discrete valuation field with perfect residue field, we study the functor from weakly a...
O presente trabalho tem por objetivo apresentar a prova de um teorema de James Ax e Simon B. Kochen ...
O presente trabalho tem por objetivo apresentar a prova de um teorema de James Ax e Simon B. Kochen ...
ABSTRACT. We transpose Delon’s analysis of types in valued fields to unramified henselian valued fie...
We show Poincar\'e Duality for $\mathbf{F}_p$-\'etale cohomology of a smooth proper rigid space over...
We show that a system of r quadratic forms over a -adic field in at least 4r+1 variables will have a...
The thesis addresses certain problems in the model theory of henselian fields, with a special focus ...