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Roger M. Cooke - Fat-Tailed Distributions: Data, Diagnostics and Dependence, Volume 1 - 9781848217928 - V9781848217928
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Fat-Tailed Distributions: Data, Diagnostics and Dependence, Volume 1

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Description for Fat-Tailed Distributions: Data, Diagnostics and Dependence, Volume 1 Hardback. Num Pages: 144 pages, black & white illustrations. BIC Classification: PBT; PBWH. Category: (P) Professional & Vocational. Dimension: 236 x 166 x 14. Weight in Grams: 368.

This title is written for the numerate nonspecialist, and hopes to serve three purposes. First it gathers mathematical material from diverse but related fields of order statistics, records, extreme value theory, majorization, regular variation and subexponentiality. All of these are relevant for understanding fat tails, but they are not, to our knowledge, brought together in a single source for the target readership. Proofs that give insight are included, but for most fussy calculations the reader is referred to the excellent sources referenced in the text. Multivariate extremes are not treated. This allows us to present material spread over hundreds of ... Read more

Second, it presents a new measure of obesity. The most popular definitions in terms of regular variation and subexponentiality invoke putative properties that hold at infinity, and this complicates any empirical estimate. Each definition captures some but not all of the intuitions associated with tail heaviness. Chapter 5 studies two candidate indices of tail heaviness based on the tendency of the mean excess plot to collapse as data are aggregated. The probability that the largest value is more than twice the second largest has intuitive appeal but its estimator has very poor accuracy. The Obesity index is defined for a positive random variable X as:

Ob(X) = P (X1 +X4 > X2 +X3|X1 ≤ X2 ≤ X3 ≤ X4), Xi independent copies of X.

For empirical distributions, obesity is defined by bootstrapping. This index reasonably captures intuitions of tail heaviness. Among its properties, if α > 1 then Ob(X) < Ob(Xα). However, it does not completely mimic the tail index of regularly varying distributions, or the extreme value index. A Weibull distribution with shape 1/4 is more obese than a Pareto distribution with tail index 1, even though this Pareto has infinite mean and the Weibull’s moments are all finite. Chapter 5 explores properties of the Obesity index.

Third and most important, we hope to convince the reader that fat tail phenomena pose real problems; they are really out there and they seriously challenge our usual ways of thinking about historical averages, outliers, trends, regression coefficients and confidence bounds among many other things. Data on flood insurance claims, crop loss claims, hospital discharge bills, precipitation and damages and fatalities from natural catastrophes drive this point home. While most fat tailed distributions are ”bad”, research in fat tails is one distribution whose tail will hopefully get fatter.

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Product Details

Format
Hardback
Publication date
2014
Publisher
ISTE Ltd and John Wiley & Sons Inc United Kingdom
Number of pages
144
Condition
New
Number of Pages
144
Place of Publication
London, United Kingdom
ISBN
9781848217928
SKU
V9781848217928
Shipping Time
Usually ships in 15 to 20 working days
Ref
99-15

About Roger M. Cooke
Roger M. Cooke, Chauncey Starr Chair for Risk Analysis Resources for the Future, USA and Dept. Math. TU Delft, Netherlands  Daan Nieboer, Erasmus Universiteit Rotterdam, Department of Public Health (MGZ), Netherlands  Jolanta Misiewicz, Professor (Full), Warsaw University of Technology, Faculty of Mathematics and Information Science, Mazowieckie, Poland

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