Some of the completely integrable hamiltonian systems obtained through Adler-Kostant-Symes theorem rely on two distinct Lie algebra structures on the same underlying vector space. We study here the cases when two structures are linned together by deformations
Moduli spaces are mathematical objects that often appear as solutions of classification problems. Th...
We check Sakellaridis-Venkatesh conjectures about the discrete spectrum of a spherical variety $\mat...
We study symplectic rigidity properties in both finite and infinite dimension. In finite dimension, ...
This memoir studies the polynomiality of the invariant algebra of the polynomial algebra on the dual...
In this thesis, we study several problems from symplectic topology, where C°-topology interfere. We ...
We offer a different proof of E. Ambrosi's reduction of the Tate conjecture in codimension $1$ from ...
RésuméA Kähler Lie algebra is a real Lie algebra carrying a symplectic 2-cocycle ω and an integrable...
We reconstruct the eigenvariety for GSp(2g) using an overconvergent Igusa tower trivializing the ove...
Our research concerns the homological algebra and deformation theory of infinite dimensional Lie alg...
22 pagesInternational audienceIn this paper, we classify all (complete) non elementary algebraic sol...
AbstractWe study the possibility of covering some graphs with Hamiltonian chains. The results are ap...
RésuméOn démontre une équation fonctionelle satisfaite par la fonction génératrice double des arbore...
Over the function field of a complex algebraic curve, strong approximation off a non-empty finite se...
This thesis investigates the complex symplectic geometry of the deformation space of complex project...
In this thesis, we consider several aspects of over-extended and very-extended Kac-Moody algebras in...
Moduli spaces are mathematical objects that often appear as solutions of classification problems. Th...
We check Sakellaridis-Venkatesh conjectures about the discrete spectrum of a spherical variety $\mat...
We study symplectic rigidity properties in both finite and infinite dimension. In finite dimension, ...
This memoir studies the polynomiality of the invariant algebra of the polynomial algebra on the dual...
In this thesis, we study several problems from symplectic topology, where C°-topology interfere. We ...
We offer a different proof of E. Ambrosi's reduction of the Tate conjecture in codimension $1$ from ...
RésuméA Kähler Lie algebra is a real Lie algebra carrying a symplectic 2-cocycle ω and an integrable...
We reconstruct the eigenvariety for GSp(2g) using an overconvergent Igusa tower trivializing the ove...
Our research concerns the homological algebra and deformation theory of infinite dimensional Lie alg...
22 pagesInternational audienceIn this paper, we classify all (complete) non elementary algebraic sol...
AbstractWe study the possibility of covering some graphs with Hamiltonian chains. The results are ap...
RésuméOn démontre une équation fonctionelle satisfaite par la fonction génératrice double des arbore...
Over the function field of a complex algebraic curve, strong approximation off a non-empty finite se...
This thesis investigates the complex symplectic geometry of the deformation space of complex project...
In this thesis, we consider several aspects of over-extended and very-extended Kac-Moody algebras in...
Moduli spaces are mathematical objects that often appear as solutions of classification problems. Th...
We check Sakellaridis-Venkatesh conjectures about the discrete spectrum of a spherical variety $\mat...
We study symplectic rigidity properties in both finite and infinite dimension. In finite dimension, ...