Contact Schwarzian Derivatives
摘要
H. Sato introduced a Schwarzian derivative of a contactomorphism of three-dimensional Euclidean space and with T. Ozawa described its basic properties. In this note their construction is extended to all odd dimensions and to non-flat contact projective structures. The contact projective Schwarzian derivative of a contact projective structure is defined to be a cocycle of the contactomorphism group measuring the extent to which a contactomorphism fails to be an automorphism of the contact projective structure. For the flat model contact projective structure this gives a contact Schwarzian derivative associating to a contactomorphism of Euclidean space a tensor which vanishes if and only if the given contactomorphism is an element of the linear symplectic group acting by linear fractional transformations.
引用
@article{arxiv.math/0405369,
title = {Contact Schwarzian Derivatives},
author = {Daniel J. F. Fox},
journal= {arXiv preprint arXiv:math/0405369},
year = {2010}
}
备注
15 pages. One recurrent notational error and garbled formula corrected; typos corrected