Flattening Functions on Flowers

Studies when a Lipschitz function on an expanding circle map can be 'flattened', made Lipschitz-cohomologous to a constant, on a flower, a geometric structure formed by the closure of a pre-image selector's image.

2007-01-01

Authors: E. O. Harriss, O. Jenkinson
Published in: Ergodic Theory and Dynamical Systems, 2007
Links: DOI arXiv

BibTeX

@article{flattening-functions-flowers,
  title   = {Flattening Functions on Flowers},
  author  = {E. O. Harriss and O. Jenkinson},
  journal = {Ergodic Theory and Dynamical Systems},
  year    = {2007},
  volume  = {27},
  number  = {6},
  pages   = {1865--1886},
  doi     = {10.1017/S0143385707000235},
  eprint  = {0711.0802},
  archivePrefix = {arXiv},
}