English

Conjugacies between P-homeomorphisms with several breaks

Dynamical Systems 2015-07-08 v1

Abstract

Let fi,i=1,2f_{i},i=1,2 be orientation preserving circle homeomorphisms with a finite number of break points, at which the first derivatives DfiDf_{i} have jumps, and with identical irrational rotation number ρ=ρf1=ρf2.\rho=\rho_{f_{1}}=\rho_{f_{2}}. The jump ratio of fif_{i} at the break point bb is denoted by σfi(b)\sigma_{f_{i}}(b), i.e. σfi(b):=Dfi(b0)Dfi(b+0)\sigma_{f_{i}}(b):=\frac{Df_{i}(b-0)}{Df_{i}(b+0)}. Denote by σfi,i=1,2,\sigma_{f_{i}}, i=1,2, the total jump ratio given by the product over all break points bb of the jump ratios σfi(b)\sigma_{f_{i}}(b) of fif_{i}. We prove, that for circle homeomorphisms fi,i=1,2f_{i}, i=1,2, which are C2+ε,ε>0C^{2+\varepsilon}, \varepsilon>0, on each interval of continuity of DfiDf_{i} and whose total jump ratios σf1\sigma_{f_{1}} and σf2\sigma_{f_{2}} do not coincide, the congugacy between f1f_{1} and f2f_{2} is a singular function.

Cite

@article{arxiv.1408.5732,
  title  = {Conjugacies between P-homeomorphisms with several breaks},
  author = {Akhtam Dzhalilov and Dieter Mayer and Utkir Safarov},
  journal= {arXiv preprint arXiv:1408.5732},
  year   = {2015}
}

Comments

22 pages

R2 v1 2026-06-22T05:38:32.830Z