ASYMPTOTIC TECHNIQUES FOR USE IN STATISTICS
Written by O.E. Barndorff-Nielsen, D.R. Cox
Published by Chapman & Hall
in 1989
ISBN: 0412314002
- Categorised in:
- MATHS
- SCIENCE AND TECHNOLOGY
- STATISTICS
- TEXT BOOK (UNIVERSITY)
ASYMPTOTIC TECHNIQUES FOR USE IN STATISTICS
Written by O.E. Barndorff-Nielsen, D.R. Cox.
Stock no. 1830306
1990.
Hardback.
Very good condition.
Monographs on Statistics and Applied Probability 31. This book sets out in detail mathematical techniques valuable for giving useful approximate solutions to a wide range of problems in statistical theory and method and in applied probability. Glazed boards. x and 252 pages including index. ISBN: 0412314002. Reprint. Boards scuffed, a little grubby to edges of rear board. Minor foxing to top edge of text block. Name and date in ink to front endpaper. Contents clean.
Front cover
Contents
- Preface
- 1 Preliminary Notions
- 1.1 Introduction
- 1.2 Sums of independent random variables: standardization
- 1.3 Moments, cumulants and their generating functions
- 1.4 Properties of sums of independent random variables
- 1.5 Calculation of moments and cumulants
- 1.6 Appendix: Orthogonal polynomials
- Further results and exercises
- Bibliographic notes
- 2 Some basic limiting procedures
- 2.1 Introduction
- 2.2 A simple example
- 2.3 Some convergence concepts
- 2.4 Convergence after functional transformation
- 2.5 Approximate linearization
- 2.6 Direct calculations with density functions and moment generating functions
- 2.7 Multidimensional version
- 2.8 Convergence of movements
- 2.9 Appendix: Some basic limit theorems
- Further results and exercises
- Bibliographic notes
- 3 Asymptotic expansions
- 3.1 Introduction
- 3.2 Integration by parts
- 3.3 Laplace expansion
- 3.4 Summation of series
- 3.5 Inversion of series
- 3.6 Asymptotic expansions of distributions by direct methods
- 3.7 Asymptotic expansions of distributions via generating functions
- 3.8 Asymptotic expansions for random variables
- 3.9 Asymptotic expansion with a second parameter
- Further results and exercises
- Bibliographic notes
- 4 Edgeworth and allied expansions
- 4.1 Introduction
- 4.2 Direct Edgeworth expansion
- 4.3 Tilted Edgeworth expansion
- 4.4 Cornish-Fisher of sums
- 4.5 Nonlinear function of sums
- Further results and exercises
- Bibliographic notes
- 5 Miscellany on multivariate distributions
- 5.1 Introduction
- 5.2 Special properties
- 5.3 Index notation
- 5.4 The exlog relations
- 5.5 Cumulants and moments
- 5.6 Cumulants of power series
- 5.7 Appendix: Tensorial Hermite polynomials
- 5.8 Appendix: Partially ordered sets, partitions and Mobius inversion
- 5.9 Appendix: Proof of the exlog relations
- Further results and exercises
- Bibliographic notes
- 6 Multivariate asymptotic expansions
- 6.1 Introduction
- 6.2 Laplace's method
- 6.3 Edgeworth expansions
- 6.4 Exponential methods
- 6.5 Tiled expansions
- 6.6 Large deviations
- 6.7 Mixed tilted-direct Edgeworth expansions
- 6.8 The delta method
- 6.9 Generalized formal Edgeworth expansions
- 6.10 Inversion
- 6.11 Appendix: Fourier transformation
- 6.12 Appendix: Laplace's method: regularity conditions
- 6.13 Appendix: Direct and tilted Edgeworth expansions: regularity conditions
- 6.14 Appendix: Legendre transformation
- Further results and exercises
- Bibliographic notes
- 7 Expansions for conditional distributions
- 7.1 Introduction
- 7.2 Direct - direct expansion
- 7.3 Expansions for condition cumulants
- 7.4 Tiled - tiled expansions
- 7.5 Mixed expansions
- Further results and exercises
- Bibliographic notes
- Postscript
- References
- Author Index
- Subject Index