Groups of $C^{r,s}$-diffeomorphisms related to a foliation

Jacek Lech, and Tomasz Rybicki. "Groups of $C^{r,s}$-diffeomorphisms related to a foliation." Banach Center Publications 76.1 (2007): 437-450. <http://eudml.org/doc/281737>.

@article{JacekLech2007,
abstract = {The notion of a $C^\{r,s\}$-diffeomorphism related to a foliation is introduced. A perfectness theorem for the group of $C^\{r,s\}$-diffeomorphisms is proved. A remark on $C^\{n+1\}$-diffeomorphisms is given.},
author = {Jacek Lech, Tomasz Rybicki},
journal = {Banach Center Publications},
keywords = {group of -diffeomorphisms; ; s; foliation; commutator; perfectness},
language = {eng},
number = {1},
pages = {437-450},
title = {Groups of $C^\{r,s\}$-diffeomorphisms related to a foliation},
url = {http://eudml.org/doc/281737},
volume = {76},
year = {2007},
}

TY - JOUR
AU - Jacek Lech
AU - Tomasz Rybicki
TI - Groups of $C^{r,s}$-diffeomorphisms related to a foliation
JO - Banach Center Publications
PY - 2007
VL - 76
IS - 1
SP - 437
EP - 450
AB - The notion of a $C^{r,s}$-diffeomorphism related to a foliation is introduced. A perfectness theorem for the group of $C^{r,s}$-diffeomorphisms is proved. A remark on $C^{n+1}$-diffeomorphisms is given.
LA - eng
KW - group of -diffeomorphisms; ; s; foliation; commutator; perfectness
UR - http://eudml.org/doc/281737
ER -