AbstractThis paper proves a generalization of Shafarevich's Conjecture, for fields of Laurent series in two variables over an arbitrary field. This result says that the absolute Galois group GK of such a field K is quasi-free of rank equal to the cardinality of K, i.e. every non-trivial finite split embedding problem for GK has exactly cardK proper solutions. We also strengthen a result of Pop and Haran–Jarden on the existence of proper regular solutions to split embedding problems for curves over large fields; our strengthening concerns integral models of curves, which are two-dimensional
In this thesis we give a description in terms of generators and relations of the Galois group of the...
We introduce a criterion on the presentation of finitely presented pro-$p$ groups which allows us to...
In this section we introduce a description of totally ramified Galois extensions of a local field wi...
We give an elementary self-contained proof of the following result, which Pop proved with methods of...
AbstractUsing the positive solution of the general Abhyankarʼs conjecture, we prove that the fundame...
Abstract. Let X be a curve over an algebraically closed field k of arbitrary char-acteristic, and le...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018.Cataloged fro...
International audienceLet K be a number field and let L/K be an infinite Galois extension with Galoi...
Assuming only basic algebra and Galois theory, this book develops the method of 'algebraic patching'...
Suppose that $K$ is an infinite field which is large (in the sense of Pop) and whose first order the...
Every field K admits proper projective extensions, that is, Galois extensions where the Galois group...
In this paper we will discuss the absolute Galois group, the Galois group of Q where Q is an algebra...
AbstractThe embedding problem, which is the problem of extending a given Galois extension K ⊃ k to a...
Every field K admits proper projective extensions, that is, Galois extensions where the Galois group...
We describe algorithms to compute fixed fields, splitting fields and towers of radical extensions wi...
In this thesis we give a description in terms of generators and relations of the Galois group of the...
We introduce a criterion on the presentation of finitely presented pro-$p$ groups which allows us to...
In this section we introduce a description of totally ramified Galois extensions of a local field wi...
We give an elementary self-contained proof of the following result, which Pop proved with methods of...
AbstractUsing the positive solution of the general Abhyankarʼs conjecture, we prove that the fundame...
Abstract. Let X be a curve over an algebraically closed field k of arbitrary char-acteristic, and le...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018.Cataloged fro...
International audienceLet K be a number field and let L/K be an infinite Galois extension with Galoi...
Assuming only basic algebra and Galois theory, this book develops the method of 'algebraic patching'...
Suppose that $K$ is an infinite field which is large (in the sense of Pop) and whose first order the...
Every field K admits proper projective extensions, that is, Galois extensions where the Galois group...
In this paper we will discuss the absolute Galois group, the Galois group of Q where Q is an algebra...
AbstractThe embedding problem, which is the problem of extending a given Galois extension K ⊃ k to a...
Every field K admits proper projective extensions, that is, Galois extensions where the Galois group...
We describe algorithms to compute fixed fields, splitting fields and towers of radical extensions wi...
In this thesis we give a description in terms of generators and relations of the Galois group of the...
We introduce a criterion on the presentation of finitely presented pro-$p$ groups which allows us to...
In this section we introduce a description of totally ramified Galois extensions of a local field wi...