Stratifications of Inertia Spaces of Compact Lie Group Actions
Carla Farsi, Markus J. Pflaum, Christopher Seaton
Journal of Singularities
volume 13 (2015), 107-140
Received 24 October 2013. Received in revised form 8 April 2014.
Add a reference to this article to your citeulike library.
Abstract:
We study the topology of the inertia space of a smooth G-manifold M where G is a compact Lie group. We construct an explicit Whitney stratification of the inertia space, demonstrating that the inertia space is a triangulable differentiable stratified space. In addition, we demonstrate a de Rham theorem for differential forms defined on the inertia space with respect to this stratification.
Keywords:
Lie group, G-manifold, stratified space, differentiable space, inertia space
Mathematical Subject Classification:
57S15, 58A35; Secondary 22C05, 32S60, 57R18
Author(s) information:
| Carla Farsi | Markus J. Pflaum | Christopher Seaton |
| Department of Mathematics | Department of Mathematics | Dept. of Mathematics & Computer Science |
| University of Colorado at Boulder | University of Colorado at Boulder | Rhodes College |
| Campus Box 395 | Campus Box 395 | 2000 N. Parkway |
| Boulder, CO 80309-0395 | Boulder, CO 80309-0395 | Memphis, TN 38112 |
| email: farsi@euclid.colorado.edu | email: pflaum@Colorado.EDU | email: seatonc@rhodes.edu |
Copyright © 2015 Worldwide Center of Mathematics LLC, All Rights Reserved ®