On 1:3 resonance under reversible perturbations of conservative cubic H\'enon maps

Abstract

We consider reversible non-conservative perturbations of the conservative cubic H\'enon maps H3: x = y, y = -x + M1 + M2 y y3 and study their influence on the 1:3 resonance, i.e. bifurcations of fixed points with eigenvalues e i 2π/3. It follows from the work by Dullin and Meiss, this resonance is degenerate for M1=0, M2=-1 when the corresponding fixed point is elliptic. We show that bifurcations of this point under reversible perturbations give rise to four 3-periodic orbits, two of them are symmetric and conservative (saddles in the case of map H3+ and elliptic orbits in the case of map H3-), the other two orbits are nonsymmetric and they compose symmetric couples of dissipative orbits (attracting and repelling orbits in the case of map H3+ and saddles with the Jacobians less than 1 and greater than 1 in the case of map H3-). We show that these local symmetry-breaking bifurcations can lead to mixed dynamics due to accompanying global reversible bifurcations of symmetric non-transversal homo- and heteroclinic cycles. We also generalize the results of Dullin and Meiss to the case of the p:q resonances with odd q and show that all of them are also degenerate for the maps H3 with M1=0.