Lorena López-Hernanz, Rudy Rosas
Published 2018-03-05Version 1
We prove that for each characteristic direction $[v]$ of a tangent to the identity diffeomorphism of order $k+1$ in $\mathbb{C}^2$ there exist either an analytic curve of fixed points tangent to $[v]$ or $k$ parabolic manifolds where all the orbits are tangent to $[v]$, and that at least one of these parabolic manifolds is or contains a parabolic curve.
Attracting domains of maps tangent to the identity whose only characteristic direction is non-degenerate
Parabolic curves of diffeomorphisms asymptotic to formal invariant curves
Boundness of intersection numbers for actions by two-dimensional biholomorphisms
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