Polynomial entropy for the circle homeomorphisms and for C¹ nonvanishing vector fields on T²
classification
🧮 math.DS
keywords
entropypolynomialprovecircleconjugateequalsflowhomeomorphism
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We prove that the polynomial entropy of an orientation preserving homeomorphism of the circle equals 1 when the homeomorphism is not conjugate to a rotation and that it is 0 otherwise. In a second part we prove that the polynomial entropy of a flow on the two dimensional torus associated with a $C^1$ nonvanishing vector field is less that $1$. We moreover prove that when the flow possesses periodic orbits its polynomial entropy equals 1 unless it is conjugate to a rotation (in this last case, the polynomial entropy is zero).
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