Andrew Chamblin
Published 1995-09-25Version 1
Recently, there have been several applications of differential and algebraic topology to problems concerned with the global structure of spacetimes. In this paper, we derive obstructions to the existence of spin-Lorentz and pin-Lorentz cobordisms and we show that for compact spacetimes with non-empty boundary there is no relationship between the homotopy type of the Lorentz metric and the causal structure. We also point out that spin-Lorentz and tetrad cobordism are equivalent. Furthermore, because the original work [7] on metric homotopy and causality may not be known to a wide audience, we present an overview of the results here.
Comments: 24 pages LaTeX, 8 xfig figures available from A. Chamblin at H.A.Chamblin@amtp.cam.ac.uk, published in Jour. of Geometry and Physics, 13, pages 357-377 (1994)
Journal: J.Geom.Phys. 13 (1994) 357-377
Cheeger-Gromov Theory and Applications to General Relativity
A New Variable in General Relativity and Its Applications for Classic and Quantum Gravity
The Quasi-Maxwellian Equations of General Relativity: Applications to the Perturbation Theory
