This thesis consists of four chapters that are largely independent. Counting Functions as Hilbert Functions. Steingrímsson showed that the chromatic polynomial of a graph, shifted by one, is the Hilbert function of a relative Stanley-Reisner ideal. Dall and myself show that the modluar flow and tension polynomials as well as the integer valued flow and tension polynomials are Hilbert functions, and that the chromatic polynomial can be realized as a Hilbert polynomial without shifting. We have shown this by proving that the Ehrhart function of a relative polytopal complex with compressed faces is a Hilbert function of Steingrímsson's type. It is interesting how this problem can be approached from both a combinatorial and a geometric point of...
Abstract. We introduce a polynomial invariant of graphs on surfaces, PG, gener-alizing the classical...
We introduce modular (integral) complementary polynomial K (KZ) of two variables on a graph G by cou...
International audienceWe define a new topological polynomial extending the Bollobas-Riordan one, whi...
International audienceWe introduce a multiplicity Tutte polynomial $M(x,y)$, which generalizes the o...
Hilbert functions developed from classical mathematical concepts. In algebraic geometry, the coeffic...
A long-standing theme in algebraic combinatorics is to study bases of the rings of symmetric functio...
The present dissertation is concerned with the study of problems from toric and numerical algebraic ...
This thesis deals with structural results for translation invariant valuations on polytopes and cert...
AbstractThis paper describes how I became acquainted with the Tutte polynomial, and how I was led to...
We prove quasi-polynomiality for monotone and strictly monotone orbifold Hurwitz numbers. The second...
The main topic of this thesis is to study, thanks to simple combinatorial tools, various geometric s...
This thesis deals with the Tutte polynomial, studied from different points of view. In the first par...
In this article we explore some of the combinatorial consequences of recent results relating the iso...
In this thesis we will try to answer the question why specific polynomials have no small suspected a...
Combinatorial geometry is a broad and beautiful branch of mathematics. This PhD Thesis consists of t...
Abstract. We introduce a polynomial invariant of graphs on surfaces, PG, gener-alizing the classical...
We introduce modular (integral) complementary polynomial K (KZ) of two variables on a graph G by cou...
International audienceWe define a new topological polynomial extending the Bollobas-Riordan one, whi...
International audienceWe introduce a multiplicity Tutte polynomial $M(x,y)$, which generalizes the o...
Hilbert functions developed from classical mathematical concepts. In algebraic geometry, the coeffic...
A long-standing theme in algebraic combinatorics is to study bases of the rings of symmetric functio...
The present dissertation is concerned with the study of problems from toric and numerical algebraic ...
This thesis deals with structural results for translation invariant valuations on polytopes and cert...
AbstractThis paper describes how I became acquainted with the Tutte polynomial, and how I was led to...
We prove quasi-polynomiality for monotone and strictly monotone orbifold Hurwitz numbers. The second...
The main topic of this thesis is to study, thanks to simple combinatorial tools, various geometric s...
This thesis deals with the Tutte polynomial, studied from different points of view. In the first par...
In this article we explore some of the combinatorial consequences of recent results relating the iso...
In this thesis we will try to answer the question why specific polynomials have no small suspected a...
Combinatorial geometry is a broad and beautiful branch of mathematics. This PhD Thesis consists of t...
Abstract. We introduce a polynomial invariant of graphs on surfaces, PG, gener-alizing the classical...
We introduce modular (integral) complementary polynomial K (KZ) of two variables on a graph G by cou...
International audienceWe define a new topological polynomial extending the Bollobas-Riordan one, whi...