Topology change and the unity of space

Author:Callender, C; Weingard, R

Article Title:Topology change and the unity of space

Abstract:
Must space be a unity? This question, which exercised Aristotle, Descartes and Kant, is a specific instance of a more general one; namely, can the topology of physical space change with time? In this paper we show how the discussion of the unity of space has been altered but survives in contemporary research in theoretical physics. With a pedagogical review of the role played by the Euler characteristic in the mathematics of relativistic spacetimes, we explain how classical general relativity (modulo considerations about energy conditions) allows virtually unrestrained spatial topology change in four dimensions. We also survey the situation in many other dimensions of interest. However, topology change comes with a cost: a famous theorem by Robert Geroch shows that, for many interesting types of such change, transitions of spatial topology imply the existence of closed timelike curves or temporal non-orientability. Ways of living with this theorem and of evading it are discussed. (C) 2000 Elsevier Science Ltd. All rights reserved.

Keywords:  topology change; general relativity; unity of space; space-time; non-orientability Euler characteristic

DOI: 10.1016/S1355-2198(00)00003-4

Source:STUDIES IN HISTORY AND PHILOSOPHY OF MODERN PHYSICS

Welcome to correct the error, please contact email: humanisticspider@gmail.com