Recent progress in theory and applications : foundations, trees and numerical issues in finance
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Bibliographic Information
Recent progress in theory and applications : foundations, trees and numerical issues in finance
(Lecture notes in mathematics, 2001 . Lévy Matters ; 1)
Springer, c2010
- Other Title
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Lévy Matters 1 : a subseries on Lévy processes
Lévy Matters 1
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
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Note
Other authors: Oleg Reichmann, Ken-iti Sato, Christoph Schwab
Other editors: Jean Bertoin, Jean Jacod, Claudia Klüppelberg
"Bernoulli Society for Mathematical Statistics and Probability"--Cover
Includes bibliographical references and index
Description and Table of Contents
Description
Over the past 10-15 years, we have seen a revival of general Levy ' processes theory as well as a burst of new applications. In the past, Brownian motion or the Poisson process have been considered as appropriate models for most applications. Nowadays, the need for more realistic modelling of irregular behaviour of phen- ena in nature and society like jumps, bursts, and extremeshas led to a renaissance of the theory of general Levy ' processes. Theoretical and applied researchers in elds asdiverseas quantumtheory,statistical physics,meteorology,seismology,statistics, insurance, nance, and telecommunication have realised the enormous exibility of Lev ' y models in modelling jumps, tails, dependence and sample path behaviour. L' evy processes or Levy ' driven processes feature slow or rapid structural breaks, extremal behaviour, clustering, and clumping of points. Toolsandtechniquesfromrelatedbut disctinct mathematical elds, such as point processes, stochastic integration,probability theory in abstract spaces, and differ- tial geometry, have contributed to a better understanding of Le 'vy jump processes.
As in many other elds, the enormous power of modern computers has also changed the view of Levy ' processes. Simulation methods for paths of Levy ' p- cesses and realisations of their functionals have been developed. Monte Carlo simulation makes it possible to determine the distribution of functionals of sample paths of Levy ' processes to a high level of accuracy.
Table of Contents
Fractional Integrals and Extensions of Selfdecomposability.- Packing and Hausdorff Measures of Stable Trees.- Numerical Analysis of Additive, Levy and Feller Processes with Applications to Option Pricing.
by "Nielsen BookData"