Stochastic Differential Equations Driven by Levy Processes: Numerical Weak Approximation - Changyong Zhang - Bøker - LAP LAMBERT Academic Publishing - 9783847306054 - 5. desember 2011
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Stochastic Differential Equations Driven by Levy Processes: Numerical Weak Approximation

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Stochastic differential equations driven by Levy processes are used as mathematical models for random dynamic phenomena in applications arising from fields such as finance and insurance, to capture continuous and discontinuous uncertainty. For many applications, a stochastic differential equation does not have a closed-form solution and the weak Euler approximation is applied. In such numerical treatment of stochastic differential equations, it is of theoretical and practical importance to estimate the rate of convergence of the discrete time approximation. In this book, it is systematically investigated the dependence of the rate of convergence on the regularity of the coefficients and driving processes. The model under consideration is of a more general form than existing ones, and hence is applicable to a broader range of processes, from the widely-studied diffusions and stochastic differential equations driven by spherically-symmetric stable processes to stochastic differential equations driven by more general Levy processes. These processes can be found in a variety of fields, including physics, engineering, economics, and finance.

Media Bøker     Pocketbok   (Bok med mykt omslag og limt rygg)
Utgitt 5. desember 2011
ISBN13 9783847306054
Utgivere LAP LAMBERT Academic Publishing
Antall sider 120
Mål 150 × 7 × 226 mm   ·   185 g
Språk Engelsk