Abstract
We present a general analysis of the bifurcation sequences of 2 : 2 resonant reversible Hamiltonian systems invariant under spatial symmetry. The rich structure of these systems is investigated by a singularity theory approach based on the construction of a universal deformation of the detuned Birkhoff normal form. The thresholds for the bifurcations are computed as asymptotic series also in terms of physical quantities for the original system.
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