Add to ORKGCharges μ taking values in a field F and defined on orthomodular partially ordered sets (logics) of all projectors in some finite-dimensional linear space over F are considered. In the cases where F is the field of rational numbers or a residue field, the Gleason representation μ(P) = tr(T μP), where T μ is a linear operator, is proved. © 1999 Kluwcr Academic/Plenum Publishers
In this article we cover an episode in the representation theory of GL{n) defined over a p-adic fiel...
An algorithm is discussed to compute the exponential representation of principal units in a finite e...
Let F be a totally real field and p an odd prime. We prove an automorphy lifting theorem for geometr...
Charges μ taking values in a field F and defined on orthomodular partially ordered sets (logics) of ...
We prove an analog of the famous Gleason theorem for additive functions on the orthomodular poset of...
We consider some orthomodular posets which are not lattices and the Gleason-type theorems for signed...
The probelm of generalizing Gleason’s theorem to the non separable case arose in correspondence with...
AbstractLet K be any field which may not be algebraically closed, V a finite-dimensional vector spac...
This paper aims to present Gleason’s theorem and a full proof, by the most elementary methods of ana...
AbstractIn this article we study the Gleason problem locally. A new method for solving the Gleason A...
This thesis concerns the study of the density of rational and algebraic points in the transcendental...
Abstract. The SL(2)-type of any smooth, irreducible and unitarizable representation of GLn over a p-...
AbstractWe study Grothendieck rings (in the sense of model theory) of fields, extending previous wor...
In this article we cover an episode in the representation theory of GL(n) defined over a p-adic fiel...
We study abstract algebra and Hilbert's Irreducibility Theorem. We give an exposition of Galois theo...
In this article we cover an episode in the representation theory of GL{n) defined over a p-adic fiel...
An algorithm is discussed to compute the exponential representation of principal units in a finite e...
Let F be a totally real field and p an odd prime. We prove an automorphy lifting theorem for geometr...
Charges μ taking values in a field F and defined on orthomodular partially ordered sets (logics) of ...
We prove an analog of the famous Gleason theorem for additive functions on the orthomodular poset of...
We consider some orthomodular posets which are not lattices and the Gleason-type theorems for signed...
The probelm of generalizing Gleason’s theorem to the non separable case arose in correspondence with...
AbstractLet K be any field which may not be algebraically closed, V a finite-dimensional vector spac...
This paper aims to present Gleason’s theorem and a full proof, by the most elementary methods of ana...
AbstractIn this article we study the Gleason problem locally. A new method for solving the Gleason A...
This thesis concerns the study of the density of rational and algebraic points in the transcendental...
Abstract. The SL(2)-type of any smooth, irreducible and unitarizable representation of GLn over a p-...
AbstractWe study Grothendieck rings (in the sense of model theory) of fields, extending previous wor...
In this article we cover an episode in the representation theory of GL(n) defined over a p-adic fiel...
We study abstract algebra and Hilbert's Irreducibility Theorem. We give an exposition of Galois theo...
In this article we cover an episode in the representation theory of GL{n) defined over a p-adic fiel...
An algorithm is discussed to compute the exponential representation of principal units in a finite e...
Let F be a totally real field and p an odd prime. We prove an automorphy lifting theorem for geometr...