On global linearization of planar involutions

Abstract

Let φ:22 be an orientation--preserving C1 involution such that φ(0)=0 and let Spc\,(φ)=\ Eigenvalues\,\,of\,\, Dφ(p) p∈2\. We prove that if Spc\,(φ)⊂ or Spc\,(φ) [1,1+ε)= for some ε>0 then φ is globally C1 conjugate to the linear involution Dφ(0) via the conjugacy h=(I+Dφ(0)φ)/2, where I:22 is the identity map. Similarly, if φ is an orientation-reversing C1 involution such that φ(0)=0 and Trace\,(Dφ(0)Dφ(p))>-1 for all p∈2 then φ is globally C1 conjugate to the linear involution Dφ(0) via the conjugacy h. Finally, we show that h may fail to be a global linearization of φ if the above conditions are not fulfilled.