Add to ORKGWe associate to any given finite set of valuations on the polynomial ring in two variables over an algebraically closed field a numerical invariant whose positivity characterizes the case when the intersection of their valuation rings has maximal transcendence degree over the base fields. As an application, we give a criterion for when an analytic branch at infinity in the affine plane that is defined over a number field in a suitable sense is the branch of an algebraic curve
AbstractFor a Noetherian domain R (altitude R < ∞) with quotient field F, an overring I(R) of R is d...
AbstractThe theory of valuations on fields is developed in the constructive spirit of Errett Bishop....
This thesis is dedicated to the study of extensions of a valuation v on K to the ring of polynomials...
International audienceWe associate to any given finite set of valuations on the polynomial ring in t...
International audienceWe associate to any given finite set of valuations on the polynomial ring in t...
If R is a field on which all (non-archimedean) valuations are known, then all valuations on R[x], wh...
If R is a field on which all (non-archimedean) valuations are known, then all valuations on R[x], wh...
AbstractIf a valuation ring V on a simple transcendental field extension K0(X) is such that the resi...
Let K be a field with a valuation ν and let L = K(x) be a transcendental extension of K, then any va...
Let K be a field with a valuation ν and let L = K(x) be a transcendental extension of K, then any va...
Let K be a field with a valuation ν and let L = K(x) be a transcendental extension of K, then any va...
We present in this article several possibilities to approach the height of an algebraic curve define...
We present in this article several possibilities to approach the height of an algebraic curve define...
The book deals with the (elementary and introductory) theory of valuation rings. As explained in the...
AbstractIf a valuation ring V on a simple transcendental field extension K0(X) is such that the resi...
AbstractFor a Noetherian domain R (altitude R < ∞) with quotient field F, an overring I(R) of R is d...
AbstractThe theory of valuations on fields is developed in the constructive spirit of Errett Bishop....
This thesis is dedicated to the study of extensions of a valuation v on K to the ring of polynomials...
International audienceWe associate to any given finite set of valuations on the polynomial ring in t...
International audienceWe associate to any given finite set of valuations on the polynomial ring in t...
If R is a field on which all (non-archimedean) valuations are known, then all valuations on R[x], wh...
If R is a field on which all (non-archimedean) valuations are known, then all valuations on R[x], wh...
AbstractIf a valuation ring V on a simple transcendental field extension K0(X) is such that the resi...
Let K be a field with a valuation ν and let L = K(x) be a transcendental extension of K, then any va...
Let K be a field with a valuation ν and let L = K(x) be a transcendental extension of K, then any va...
Let K be a field with a valuation ν and let L = K(x) be a transcendental extension of K, then any va...
We present in this article several possibilities to approach the height of an algebraic curve define...
We present in this article several possibilities to approach the height of an algebraic curve define...
The book deals with the (elementary and introductory) theory of valuation rings. As explained in the...
AbstractIf a valuation ring V on a simple transcendental field extension K0(X) is such that the resi...
AbstractFor a Noetherian domain R (altitude R < ∞) with quotient field F, an overring I(R) of R is d...
AbstractThe theory of valuations on fields is developed in the constructive spirit of Errett Bishop....
This thesis is dedicated to the study of extensions of a valuation v on K to the ring of polynomials...