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Heterodimensional cycles derived from homoclinic tangencies via Hopf bifurcations
Published 19 May 2025 in math.DS | (2505.12596v1)
Abstract: We analyze three-dimensional $C{r}$ diffeomorphisms ($r\ge 5$) exhibiting a quadratic focus-saddle homoclinic tangency whose multipliers satisfy $|\lambda\gamma| = 1$. For a proper three-parameter unfolding that splits the tangency, varies the argument of the stable multipliers, and controls the modulus $|\lambda\gamma|$, we show that a Hopf bifurcation occurs on this curve and that a homoclinic point to the bifurcating periodic orbit is present. As a consequence, the original map $f$ can be $C{r}$-approximated by a diffeomorphism exhibiting a coindex-one heterodimensional cycle in the saddle case.
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