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Computational Methods for Quantitative Finance: Finite Element Methods for Derivative Pricing: Springer Finance

Autor Norbert Hilber, Oleg Reichmann, Christoph Schwab, Christoph Winter
en Limba Engleză Hardback – 27 feb 2013
Many mathematical assumptions on which classical derivative pricing methods are based have come under scrutiny in recent years. The present volume offers an introduction to deterministic algorithms for the fast and accurate pricing of derivative contracts in modern finance. This unified, non-Monte-Carlo computational pricing methodology is capable of handling rather general classes of stochastic market models with jumps, including, in particular, all currently used Lévy and stochastic volatility models. It allows us e.g. to quantify model risk in computed prices on plain vanilla, as well as on various types of exotic contracts. The algorithms are developed in classical Black-Scholes markets, and then extended to market models based on multiscale stochastic volatility, to Lévy, additive and certain classes of Feller processes. 
This book is intended for graduate students and researchers, as well as for practitioners in the fields of quantitative finance and applied and computational mathematics with a solid background in mathematics, statistics or economics.​
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Specificații

ISBN-13: 9783642354007
ISBN-10: 3642354009
Pagini: 316
Ilustrații: XIII, 299 p. 56 illus., 47 illus. in color.
Dimensiuni: 155 x 235 x 23 mm
Greutate: 0.59 kg
Ediția:2013
Editura: Springer Berlin, Heidelberg
Colecția Springer
Seria Springer Finance

Locul publicării:Berlin, Heidelberg, Germany

Public țintă

Professional/practitioner

Cuprins

1.Introduction.- Part I.Basic techniques and models: 2.Notions of mathematical finance.- 3.Elements of numerical methods for PDEs.- 4.Finite element methods for parabolic problems.- 5.European options in BS markets.- 6.American options.- 7.Exotic options.- 8.Interest rate models.- 9.Multi-asset options.- 10.Stochastic volatility models-. 11.Lévy models.- 12.Sensitivities and Greeks.- Part II.Advanced techniques and models: 13.Wavelet methods.- 14.Multidimensional diffusion models.- 15.Multidimensional Lévy models.- 16.Stochastic volatility models with jumps.- 17.Multidimensional Feller processes.- Apendices: A.Elliptic variational inequalities.- B.Parabolic variational inequalities.- References.​- Index.

Recenzii

From the book reviews:
“This book … covers mainly finite element methods for derivative pricing. The book is divided into two parts: ‘Basic Techniques and Models’ and ‘Advanced Techniques and Models’. This partition makes the book useful to a large number of readers, from beginners in the subject to more advanced students and researchers, specializing not only in applied mathematics but also in mathematical finance.” (Javier de Frutos, Mathematical Reviews, July, 2014)

Textul de pe ultima copertă

Many mathematical assumptions on which classical derivative pricing methods are based have come under scrutiny in recent years. The present volume offers an introduction to deterministic algorithms for the fast and accurate pricing of derivative contracts in modern finance. This unified, non-Monte-Carlo computational pricing methodology is capable of handling rather general classes of stochastic market models with jumps, including, in particular, all currently used Lévy and stochastic volatility models. It allows us e.g. to quantify model risk in computed prices on plain vanilla, as well as on various types of exotic contracts. The algorithms are developed in classical Black-Scholes markets, and then extended to market models based on multiscale stochastic volatility, to Lévy, additive and certain classes of Feller processes. 
The volume is intended for graduate students and researchers, as well as for practitioners in the fields of quantitative finance and applied and computational mathematics with a solid background in mathematics, statistics or economics.​

Caracteristici

Offers an accessible introduction to modern deterministic numerical methods of option pricing Presents methods for all standard European plain vanilla option as well as for widely used exotic derivative contracts, such as Barrier, American and multiperiod contracts Includes a large section on methods for pricing derivatives on baskets, such as Lévy Copula models ? Includes supplementary material: sn.pub/extras