Cherry Maps with Different Critical Exponents: Bifurcation of Geometry

Abstract

We consider order preserving C3 circle maps with a flat piece, irrational rotation number and critical exponents (1, 2). We detect a change in the geometry of the system. For (1, 2) ∈ [1,2]2 the geometry is degenerate and it becomes bounded for (1, 2) ∈ [2,∞)2 \(2,2)\. When the rotation number is of the form [abab·s]; for some a,b∈N*, the geometry is bounded for (1, 2) belonging above a curve defined on ]1, +∞ [2. As a consequence we estimate the Hausdorff dimension of the non-wandering set Kf= S1 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.