This unique book develops the classical subjects of geometric probability and integral geometry, and the more modern one of stochastic geometry, in rather a novel way to provide a unifying framework in which they can be studied. The author focuses on factorisation properties of measures and probabilities implied by the assumption of their invariance with respect to a group, in order to investigate non-trivial factors. The study of these properties is the central theme of the book. Basic facts about integral geometry and random point process theory are developed in a simple geometric way, so that the whole approach is suitable for a non-specialist audience. Even in the later chapters, where the factorisation principles are applied to geometrical processes, the prerequisites are only standard courses on probability and analysis. The main ideas presented here have application to such areas as stereology and tomography, geometrical statistics, pattern and texture analysis. This book will be well suited as a starting point for individuals working in those areas to learn about the mathematical framework. It will also prove valuable as an introduction to geometric probability theory and integral geometry based on modern ideas.
Reviews & endorsements
Review of the hardback: 'The authors presented themselves with an enormous task in gathering material from widely scattered areas to illustrate a single theme. It is a measure of how well they have succeeded that everything now seems coherent and interwoven. For this they deserve our sincere thanks.' Bulletin of the London Mathematical SocietySee more reviews
Review of the hardback: 'An opera of real analysis…' Bulletin of the American Mathematical Society
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- Date Published: November 1990
- format: Hardback
- isbn: 9780521345354
- length: 300 pages
- dimensions: 234 x 156 x 21 mm
- weight: 0.585kg
- availability: Available
Table of Contents
1. Cavalieri principle and other prerequisites
2. Measures invariant with respect to translations
3. Measures invariant with respect to Euclidean motions
4. Haar measures on groups of affine transformations
5. Combinatorial integral geometry
6. Basic integrals
7. Stochastic point processes
8. Palm distributions of point processes
9. Poisson-generated geometrical processes
10. Section through planar geometrical processes
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