Parallel transport in manifolds with density
When I spoke on Manifolds with Density (see Chapter 18 of the 2008 edition of my Geometric Measure Theory book) at PIMS at the University of Calgary in September, 2008, Larry Bates asked for a generalization of parallel transport to an n-dimensional manifold M with density . For n=2, the generalized curvature of a curve of Riemannian curvature involves the log of the density as well:
=
Since this describes the rate at which the unit tangent vector is turning, it can be used to define parallel transport.
For n > 2, the generalized curvature vector should be the Riemannian curvature vector minus the normal component of gradient of the log of the density. Along with the unit tangent, determines a plane. Infinitesimally, vectors normal to the plane are transported by classical parallel transport. For vectors in plane, parallel transport is determined by generalized curvature.
Are there any applications?
ReusPeareeDam:
Хм, отличная статья 😉
17 December 2008, 1:59 pm[outstanding article]
inviproro:
Спасибо за информацию.
18 December 2008, 3:09 pm[Thanks for the information.]
JabJeanttierm:
Статья помогла, спасибо!
19 December 2008, 11:53 am[Article helped, thanks!]
JabJeanttierm:
Отлично…
22 December 2008, 9:11 pm[It is excellent…]