We consider germs of analytic singular vector fields in dimension three, called doubly-resonant saddle-nodes. These vector fields correspond to irregular two-dimensional systems with a pair of two opposite non-zero eigenvalues. This king of singularity appears for instance at infinity in Painlevé equations PI,...,PV, after a weighted compactifcation, for generic values of the parameters. Since Boutroux, the study of these singularities has generated many researches. Recently, several authors provided new informations, by studying for instance the associated non-linear and quasi-lineair Stokes phenomenas and by giving connection formulas. Quasi-linéaire Stokes coefficients are invariant under local analytic change of coordinates, but do not ...
This paper is concerned with the dynamics near an equilibrium point of reversible systems. For a lar...
This research monograph provides a geometric description of holonomic differential systems in one or...
This thesis consits of two parts. The first part deals with theorthogonal projections of piecewise s...
On considère des germes de champs de vecteurs holomorphes singuliers trimimensionnels, appelés noeud...
International audienceIn this work, we consider germs of analytic singular vector elds in (C^3,0) wi...
The thesis is composed of a chapter of preliminaries and two articles on the theme ofunfolding of si...
Présidente: Anne DUVAL (Université de Lille I) Rapporteur: Michel BERTHIER (Université de La Rochell...
This thesis falls within the context of global and local geometric classification of q-difference eq...
We derive simple formsfor saddle-node singular points of analytic foliations in the real or complex ...
Abstract. In this paper, we give a complete system of analytic invariants for the unfoldings of nonr...
We study certain confluences of equations with two Fuchsian singularities which produce an irregular...
Nonlinear vector fields have two important types of singularities: the fixed points in phase space a...
The investigation objects are the special points of the holomorphic vector fields on the complex pla...
International audienceAmong all bifurcation behaviors of analytic parametric families of real planar...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
This paper is concerned with the dynamics near an equilibrium point of reversible systems. For a lar...
This research monograph provides a geometric description of holonomic differential systems in one or...
This thesis consits of two parts. The first part deals with theorthogonal projections of piecewise s...
On considère des germes de champs de vecteurs holomorphes singuliers trimimensionnels, appelés noeud...
International audienceIn this work, we consider germs of analytic singular vector elds in (C^3,0) wi...
The thesis is composed of a chapter of preliminaries and two articles on the theme ofunfolding of si...
Présidente: Anne DUVAL (Université de Lille I) Rapporteur: Michel BERTHIER (Université de La Rochell...
This thesis falls within the context of global and local geometric classification of q-difference eq...
We derive simple formsfor saddle-node singular points of analytic foliations in the real or complex ...
Abstract. In this paper, we give a complete system of analytic invariants for the unfoldings of nonr...
We study certain confluences of equations with two Fuchsian singularities which produce an irregular...
Nonlinear vector fields have two important types of singularities: the fixed points in phase space a...
The investigation objects are the special points of the holomorphic vector fields on the complex pla...
International audienceAmong all bifurcation behaviors of analytic parametric families of real planar...
A systematic construction of isomonodromic families of connections of rank two on the Riemarm sphere...
This paper is concerned with the dynamics near an equilibrium point of reversible systems. For a lar...
This research monograph provides a geometric description of holonomic differential systems in one or...
This thesis consits of two parts. The first part deals with theorthogonal projections of piecewise s...