Name: Functional Distribution of Anomalous and Nonergodic Diffusion: From Stochastic Processes to Pdes (en Inglés)
Price: 1982.99 MXN
Availability: InStock
Author: Deng, Weihua ; Wang, Xudong ; Nie, Daxin
ISBN: 9789811250491

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portada Functional Distribution of Anomalous and Nonergodic Diffusion: From Stochastic Processes to Pdes (en Inglés)

Formato

Libro Físico

Autor

Weihua Deng

Xudong Wang

Daxin Nie

Editorial

World Scientific Publishing Company

Idioma

Inglés

N° páginas

260

Encuadernación

Tapa Dura

Dimensiones

22.9 x 15.2 x 1.6 cm

Peso

0.51 kg.

ISBN13

9789811250491

Categorías

Cálculo diferencial y ecuaciones
Análisis numérico
Estocástica

Functional Distribution of Anomalous and Nonergodic Diffusion: From Stochastic Processes to Pdes (en Inglés)

Weihua Deng (Autor) · Xudong Wang (Autor) · Daxin Nie (Autor) · World Scientific Publishing Company · Tapa Dura

Libro Físico

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Reseña del libro "Functional Distribution of Anomalous and Nonergodic Diffusion: From Stochastic Processes to Pdes (en Inglés)"

This volume presents a pedagogical review of the functional distribution of anomalous and nonergodic diffusion and its numerical simulations, starting from the studied stochastic processes to the deterministic partial differential equations governing the probability density function of the functionals. Since the remarkable theory of Brownian motion was proposed by Einstein in 1905, it had a sustained and broad impact on diverse fields, such as physics, chemistry, biology, economics, and mathematics. The functionals of Brownian motion are later widely attractive for their extensive applications. It was Kac, who firstly realized the statistical properties of these functionals can be studied by using Feynman's path integrals.In recent decades, anomalous and nonergodic diffusions which are non-Brownian become topical issues, such as fractional Brownian motion, Lévy process, Lévy walk, among others. This volume examines the statistical properties of the non-Brownian functionals, derives the governing equations of their distributions, and shows some algorithms for solving these equations numerically.