Normal forms of reversible dynamical systems

The problem of this article is the characterization of equivalence classes and their versal deformations for reversible and reversible Hamiltonian matrices. In both cases the admissible transformations form a subgroup G of Gl(m). Therefore the Gl(m)-orbits of a given matrix may split into several G-

It is shown on an integrable example in the plane, that normal form solutions need not converge over the full basin of attraction of fixed points of dissipative dynamical systems. Their convergence breaks down at a singularity in the complex time plane of the exact solutions of the problem. However,

R&xIMB. -Dans cet article on donne des formes normales de germes a I'origine de diffkomorphismes rkversibles du plan dont la partie 1inCaire est unipotente 9 valeurs propres positives. Le calcul de ces formes normales est bask sur des algorithmes de gComCtrie algtbrique effective. On Ctudie aussi de