We study the notions of the positive cone, characteristic and C-characteristic in (Krasner) hyperfields. We demonstrate how these interact in order to produce interesting results in the theory of hyperfields. For instance, we provide a criterion for deciding whether certain hyperfields cannot be obtained via Krasner’s quotient construction. We prove that any positive integer (larger than 1) can be realized as the characteristic of some infinite hyperfield and an analogous result for the C-characteristic. Finally, we study the (directed) graph associated with the strict partial order induced by a positive cone in a hyperfield in various examples
AbstractWe revisit hyperderivatives to build on the integral theory of calculus in positive characte...
We propose and study a generalised Kawada--Satake method for Mackey functors in the class field theo...
We introduce and study the notions of conical and spherical graphs. We show that these mutually excl...
The main part of this thesis comprises a study of quasilinear p-forms (i.e., Fermat-type forms of de...
This dissertation is intended to give a systematic treatment of hypersurface singularities in arbitr...
International audienceWe study some aspects of modular generalized Springer theory for a complex red...
This thesis investigates class field theory for one dimensional fields and higher dimensional fields...
AbstractWe show how to express any Hasse–Schmidt derivation of an algebra in terms of a finite numbe...
This paper investigates the Castelnuovo-Mumford regularity of the generic hyperplane section of proj...
Abstract. We study some aspects of modular generalized Springer theory for a complex reductive group...
The hyperfield came into being due to a mathematical necessity that appeared during the study of the...
A classical result in birational geometry, Mori’s Cone Theorem, implies that if the canonical bundle...
AbstractThis paper investigates the Castelnuovo–Mumford regularity of the generic hyperplane section...
International audienceAdditive polynomials play an important role in the local study of singularitie...
Abstract. In the paper we investigate the hyperbolicity, semi-hyperbolicity and cone field condition...
AbstractWe revisit hyperderivatives to build on the integral theory of calculus in positive characte...
We propose and study a generalised Kawada--Satake method for Mackey functors in the class field theo...
We introduce and study the notions of conical and spherical graphs. We show that these mutually excl...
The main part of this thesis comprises a study of quasilinear p-forms (i.e., Fermat-type forms of de...
This dissertation is intended to give a systematic treatment of hypersurface singularities in arbitr...
International audienceWe study some aspects of modular generalized Springer theory for a complex red...
This thesis investigates class field theory for one dimensional fields and higher dimensional fields...
AbstractWe show how to express any Hasse–Schmidt derivation of an algebra in terms of a finite numbe...
This paper investigates the Castelnuovo-Mumford regularity of the generic hyperplane section of proj...
Abstract. We study some aspects of modular generalized Springer theory for a complex reductive group...
The hyperfield came into being due to a mathematical necessity that appeared during the study of the...
A classical result in birational geometry, Mori’s Cone Theorem, implies that if the canonical bundle...
AbstractThis paper investigates the Castelnuovo–Mumford regularity of the generic hyperplane section...
International audienceAdditive polynomials play an important role in the local study of singularitie...
Abstract. In the paper we investigate the hyperbolicity, semi-hyperbolicity and cone field condition...
AbstractWe revisit hyperderivatives to build on the integral theory of calculus in positive characte...
We propose and study a generalised Kawada--Satake method for Mackey functors in the class field theo...
We introduce and study the notions of conical and spherical graphs. We show that these mutually excl...