Bertuel Ndawa Tangue
Publications:
Ndawa Tangue B.
Cherry Maps with Different Critical Exponents: Bifurcation of Geometry
2020, Vol. 16, no. 4, pp. 651-672
Abstract
We consider order-preserving $C^3$ circle maps with a flat piece, irrational rotation number
and critical exponents $(l_1, l_2)$.
We detect a change in the geometry of the system. For $(l_1, l_2) \in [1, 2]^2$ the geometry is
degenerate and becomes bounded for $(l_1, l_2) \in [2, \infty)^2 \backslash \{(2, 2)\}$. When the rotation number is
of the form $[abab \ldots]$; for some $a, b \in \mathbb{N}^*$, the geometry is bounded for $(l_1, l_2)$ belonging above
a curve defined on $]1, +\infty[^2$. As a consequence, we estimate the Hausdorff dimension of the
nonwandering set $K_f=\mathcal{S}^1\backslash \bigcup^\infty_{i=0}f^{-i}(U)$. Precisely, the Hausdorff dimension of this set is equal
to zero when the geometry is degenerate and it is strictly positive when the geometry is bounded.
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