Prym-Tjurin varieties and the Hitchin map.
Quantum deformations and superintegrable motions on spaces with variable curvature.
Quantum integrable systems
Quantum super-integrable systems as exactly solvable models.
Rational invariant tori, phase space tunneling, and spectra for non-selfadjoint operators in dimension
We study spectral asymptotics and resolvent bounds for non-selfadjoint perturbations of selfadjoint -pseudodifferential operators in dimension 2, assuming that the classical flow of the unperturbed part is completely integrable. Spectral contributions coming from rational invariant Lagrangian tori are analyzed. Estimating the tunnel effect between strongly irrational (Diophantine) and rational tori, we obtain an accurate description of the spectrum in a suitable complex window, provided that the...
Reidemeister torsion and integrable Hamiltonian systems.
Resonant normal form for even periodic FPU chains
Scalar-flat Kähler metrics with SU (2) symmetry.
Second order superintegrable systems in three dimensions.
Separation of variables and the geometry of Jacobians.
Singularities of momentum maps of integrable Hamiltonian systems with two degrees of freedom.
Solvability of the super KP equation and a generalization of the Birkhoff decomposition.
Some orthogonal polynomials in four variables.
Structure theory for second order 2D superintegrable systems with 1-parameter potentials.
Summability of first integrals of a -non-integrable resonant Hamiltonian system
This article studies the summability of first integrals of a -non-integrable resonant Hamiltonian system. The first integrals are expressed in terms of formal exponential transseries and their Borel sums. Smooth Liouville integrability and a relation to the Birkhoff transformation are discussed from the point of view of the summability.
Superintegrability and time-dependent integrals
While looking for additional integrals of motion of several minimally superintegrable systems in static electric and magnetic fields, we have realized that in some cases Lie point symmetries of Euler-Lagrange equations imply existence of explicitly time-dependent integrals of motion through Noether’s theorem. These integrals can be combined to get an additional time-independent integral for some values of the parameters of the considered systems, thus implying maximal superintegrability. Even for...
Superintegrability on three-dimensional Riemannian and relativistic spaces of constant curvature.
Superintegrable oscillator and Kepler systems on spaces of nonconstant curvature via the Stäckel transform.
Superintegrable Potentials and superposition of Higgs Oscillators on the Sphere S²
The spherical version of the two-dimensional central harmonic oscillator, as well as the spherical Kepler (Schrödinger) potential, are superintegrable systems with quadratic constants of motion. They belong to two different spherical "Smorodinski-Winternitz" families of superintegrable potentials. A new superintegrable oscillator have been recently found in S². It represents the spherical version of the nonisotropic 2:1 oscillator and it also belongs to a spherical family of quadratic superintegrable...
Sur le spectre semi-classique d’un système intégrable de dimension 1 autour d’une singularité hyperbolique
Dans cet article on décrit le spectre semi-classique d’un opérateur de Schrödinger sur avec un potentiel type double puits. La description qu’on donne est celle du spectre autour du maximum local du potentiel. Dans la classification des singularités de l’application moment d’un système intégrable, le double puits représente le cas des singularités non-dégénérées de type hyperbolique.