Abstract:
We prove an estimate for the number of linear commuting symmetry fields of systems of differential equations reduced to the Poincaré–Dulac normal form. We also show that if there is a complete set of commuting analytic symmetry fields with independent linear parts, then the transformation to the normal form is given by convergent power series.
Keywords:resonant normal form, Poincaré–Dulac theorem, symmetry fields, Hamiltonian systems.
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