Random walks often provide the underlying mesoscopic mechanism for transport phenomena in physics, chemistry and biology. In particular, anomalous transport in branched structures has attracted considerable attention. Combs are simple caricatures of various types of natural branched structures that belong to the category of loopless graphs. The comb model was introduced to understand anomalous transport in percolation clusters. Comb-like models have been widely adopted to describe kinetic processes in various experimental applications in medical physics and biophysics, chemistry of polymers, semiconductors, and many other interdisciplinary applications.The authors present a random walk description of the transport in specific comb geometries, ranging from simple random walks on comb structures, which provide a geometrical explanation of anomalous diffusion, to more complex types of random walks, such as non-Markovian continuous-time random walks. The simplicity of comb models allows to perform a rigorous analysis and to obtain exact analytical results for various types of random walks and reaction-transport processes.
Alexander Iomin & Vicenc Mendez
FRACTIONAL DYNAMICS IN COMB-LIKE STRUCTURES [EPUB ebook]
FRACTIONAL DYNAMICS IN COMB-LIKE STRUCTURES [EPUB ebook]
Купите эту электронную книгу и получите еще одну БЕСПЛАТНО!
язык английский ● Формат EPUB ● страницы 248 ● ISBN 9789813273450 ● Размер файла 27.0 MB ● издатель World Scientific Publishing Company ● город Singapore ● Страна SG ● опубликованный 2018 ● Загружаемые 24 месяцы ● валюта EUR ● Код товара 6607651 ● Защита от копирования Adobe DRM
Требуется устройство для чтения электронных книг с поддержкой DRM