Book contents
- Frontmatter
- Contents
- Preface
- Notes on the contributors
- Introduction
- PART 1 Cosmology and time's arrow
- PART 2 Quantum theory and time's arrow
- 3 Time's arrow and the quantum measurement problem
- 4 Time, decoherence, and ‘reversible’ measurements
- 5 Time flow, non-locality, and measurement in quantum mechanics
- 6 Stochastically branching spacetime topology
- PART 3 Thermodynamics and time's arrow
- PART 4 Time travel and time's arrow
- References
- Index
6 - Stochastically branching spacetime topology
Published online by Cambridge University Press: 26 January 2010
- Frontmatter
- Contents
- Preface
- Notes on the contributors
- Introduction
- PART 1 Cosmology and time's arrow
- PART 2 Quantum theory and time's arrow
- 3 Time's arrow and the quantum measurement problem
- 4 Time, decoherence, and ‘reversible’ measurements
- 5 Time flow, non-locality, and measurement in quantum mechanics
- 6 Stochastically branching spacetime topology
- PART 3 Thermodynamics and time's arrow
- PART 4 Time travel and time's arrow
- References
- Index
Summary
Introduction
In this chapter the modelling of spacetime is discussed, with the aim of maintaining a clear distinction between the local properties of a model and those attributes which are global. This separation of attributes (into local and global type) logically motivates the construction of the non-Hausdorff branched model for spacetime. Of course, much of the physical motivation for this construction is derived from the stochastic nature of quantum mechanics. The Many-World Interpretation is seen to be (at least, topologically) a consistent and complete interpretation of quantum mechanics.
In any serious inquiry into the nature of spacetime (on either the quantum or cosmological level), mathematical models will be constructed which are in substantial agreement with the collective empiricism of experimental physics. If such a mathematical model is to be more than just a prescription for prediction, then it is necessary to give careful consideration to the appropriate level of mathematical generality of the model. Common sense, as well as the history of science, appear to indicate the need to maintain as general (i.e., unrestricted) a model as possible, constrained only by empirical data on one side, and the limits of our mathematical sophistication and imagination on the other.
In the spirit of generalization, I will construct a model of the time parameter, which extends the usual concept of a time-line, and can be used to model spacetime locally, with the usual product structure of Minkowski spacetime. Our imagination will be constrained only by the mathematical discipline of topology and a clear view of all underlying assumptions.
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- Chapter
- Information
- Time's Arrows TodayRecent Physical and Philosophical Work on the Direction of Time, pp. 173 - 188Publisher: Cambridge University PressPrint publication year: 1995
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