$C^{1,0}$ Foliation Theory
Abstract
Transverse one dimensional foliations play an important role in the study of codimension one foliations. In \cite{KR2}, the authors introduced the notion of flow box decomposition of a 3-manifold . This is a decomposition of that reflects both the structure of a given codimension one foliation and that of a given transverse flow. In this paper, flow box decompositions are used to extend some classical foliation results to foliations that are not . Enhancements of well-known results of Calegari on smoothing leaves, Dippolito on Denjoy blowup of leaves, and Tischler on approximations by fibrations are obtained. The methods developed are not intrinsically 3-dimensional techniques, and should generalize to prove corresponding results for codimension one foliations in -dimensional manifolds.
Keywords
Cite
@article{arxiv.1605.03020,
title = {$C^{1,0}$ Foliation Theory},
author = {William H. Kazez and Rachel Roberts},
journal= {arXiv preprint arXiv:1605.03020},
year = {2019}
}
Comments
31 pages, 2 figures