Volume-preserving normal forms of Hopf-zero singularity (Q2857757)

The authors describe a method for computing the unique generator of the algebra of first integrals associated with a large class of Hopf-zero singularity. They introduce via a Lie algebra description the set of all volume-preserving classical normal forms of this singularity. This is a maximal vector space of classical normal forms with first integral. Systems with a non-zero condition on their quadratic parts are considered. The algebra of all first integrals for any such system has a unique (modulo scalar multiplication) generator. The infinite level volume-preserving parametric normal forms of any non-degenerate perturbation within the Lie algebra of any such system is computed.NEWLINENEWLINEThe authors also derive the associated unique generator of the algebra of first integrals. The symmetry group of the infinite level normal forms is also discussed. To demonstrate the applicability of the theoretical results presented, the authors apply their results to the modified Rössler and to the generalized Kuramoto-Sivashinsky equations. The numerically suggested radius of convergence (for the first integral) associated with a hypernormalization step is discussed for the truncated first level normal forms of the examples.