Extreme Value Theory and Applications
Editat de J. Galambos, James Lechner, Emil Simiuen Limba Engleză Hardback – 31 iul 1994
Preț: 1220.30 lei
Preț vechi: 1488.17 lei
-18%
Puncte Express: 1830
Carte tipărită la comandă
Livrare economică 17-31 august
Livrare prin curier în România Termenul estimat este afișat lângă disponibilitate.
Transport gratuit pentru acest produs Plată online sau ramburs, în funcție de opțiunile comenzii.
Retur gratuit în 14 zile Comandă securizată și suport în română.
Specificații
ISBN-13: 9780792328650
ISBN-10: 0792328655
Pagini: 520
Ilustrații: XIV, 520 p.
Dimensiuni: 156 x 234 x 30 mm
Greutate: 0.92 kg
Ediția:1994 edition
Editura: Springer Us
Locul publicării:New York, NY, United States
ISBN-10: 0792328655
Pagini: 520
Ilustrații: XIV, 520 p.
Dimensiuni: 156 x 234 x 30 mm
Greutate: 0.92 kg
Ediția:1994 edition
Editura: Springer Us
Locul publicării:New York, NY, United States
Public țintă
ResearchCuprins
Inaugural Address.- Extreme Value Theory for Applications.- I: Engineering Applications.- Extremes in engineering applications.- The Poisson-Weibull flaw model for brittle fiber strength.- Extreme value distributions for linear and non-linear systems and applications to marine structures.- Extreme value theory for fibre bundles.- II: Univariate Statistical Inference.- Extreme value statistics.- Bayes quantile estimation and threshold selection for the Generalized Pareto family.- Novel extreme value estimation procedures: Application to extreme wind data.- On testing the exponential and Gumbel distribution.- III: Computer Programs, Computations.- XTREMES: Extreme value analysis and robustness.- Simulations for the extreme statistics.- Analytical and empirical study of the tails of probability distributions.- IV: Multivariate Theory and Applications.- Concomitants of extreme order statistics.- Multivariate threshold methods.- Applications of multivariate extremes.- Some aspects of spatial extremes.- V: Nonclassical Models.- Extremes: Limit results for univariate and multivariate nonstationary sequences.- Extreme value limit theory with nonlinear normalization.- VI: Point Processes and Extremes.- Extreme values and choice theory.- Functional laws for small numbers.- Record statistics from point process models.- VII: Continuous Time.- Extremes and exceedance measures for continuous parameter stationary processes.- A new class of random fields and their extreme values.- VIII: Special Topics for the Classical Model.- Penultimate behaviour of the extremes.- Weak convergence of the Hill estimator process.- On the limiting distribution of fractional parts of extreme order statistics.- IX: Probabilistic Number Theory.- On the largest prime divisors of an integer.- X: Astronomy.-Probing the nature of the brightest galaxies using extreme value theory.- XI: Business.- Safety first portfolio selection, extreme value theory and long run asset risks.- Extremes in non-life insurance.