---
res:
  bibo_abstract:
  - We continue the previous article's discussion of bounds, for prevalent diffeomorphisms
    of smooth compact manifolds, on the growth of the number of periodic points and
    the decay of their hyperbolicity as a function of their period $n$. In that article
    we reduced the main results to a problem, for certain families of diffeomorphisms,
    of bounding the measure of parameter values for which the diffeomorphism has (for
    a given period $n$) an almost periodic point that is almost nonhyperbolic. We
    also formulated our results for $1$-dimensional endomorphisms on a compact interval.
    In this article we describe some of the main techniques involved and outline the
    rest of the proof. To simplify notation, we concentrate primarily on the $1$-dimensional
    case.@eng
  bibo_authorlist:
  - foaf_Person:
      foaf_givenName: Vadim
      foaf_name: Kaloshin, Vadim
      foaf_surname: Kaloshin
      foaf_workInfoHomepage: http://www.librecat.org/personId=FE553552-CDE8-11E9-B324-C0EBE5697425
    orcid: 0000-0002-6051-2628
  - foaf_Person:
      foaf_givenName: Brian R.
      foaf_name: Hunt, Brian R.
      foaf_surname: Hunt
  bibo_doi: 10.1090/s1079-6762-01-00091-9
  bibo_issue: '5'
  bibo_volume: 7
  dct_date: 2001^xs_gYear
  dct_isPartOf:
  - http://id.crossref.org/issn/1079-6762
  dct_language: eng
  dct_publisher: American Mathematical Society@
  dct_subject:
  - General Mathematics
  dct_title: A stretched exponential bound on the rate of growth of the number of
    periodic points for prevalent diffeomorphisms II@
...