|
Title: |
A Closer Look at the Diffusion Equation |
Search Result:
| Edited by: |
Jordan Hristov |
| ISBN10-13: |
153618330X : 9781536183306 |
| Format: |
Paperback |
| Pages: |
189 |
| Weight: |
.280 Kg. |
| Published: |
Nova Science Publishers, Inc - October 2020 |
| List Price: |
84.99 Pounds Sterling |
| Availability: |
In Stock
Qty Available: 1 |
| Subjects: |
Differential calculus & equations |
| Diffusion is a principle transport mechanism emerging widely at different scale, from nano to micro and macro levels. This is a contributed book of seventh chapters encompassing local and no-local diffusion phenomena modelled with integer-order (local) and non-local operators. This book collates research results developed by scientists from different countries but with common research interest in modelling of diffusion problems. The results reported encompass diffusion problems related to efficient numerical modelling, hypersonic flows, approximate analytical solutions of solvent diffusion in polymers and wetting of soils. Some chapters are devoted to fractional diffusion problem with operators with singular and non-singular memory kernels. The book content cannot present the entire rich area of problems related to modelling of diffusion phenomena but allow seeing some new trends and approaches in the modelling technologies. In this context, the fractional models with singular and non-singular kernels the numerical methods and the development of the integration techniques related to the integral-balance approach form fresh fluxes of ideas to this classical engineering area of research. The book is oriented to researchers; master and PhD students involved in diffusion problems with a variety of application and could serves as a rich reference source and a collection of texts provoking new ideas. |
| Table of Contents: |
| Preface; A Numerical Approach to Solving Unsteady One-Dimensional Nonlinear Diffusion Equations; Diffusion in Hypersonic Flows; On the Nonlinear Diffusion with Exponential Concentration-Dependent Diffusivity: Integral-Balance Solutions and Analyzes; Solutions for Fractional Reaction-Diffusion Equations; Semi-analytical Solution of Hristov Diffusion Equation with Source; Non-Gaussian Diffusion Emergence in Superstatistics; Mean Square Displacement of the Fractional Diffusion Equation Described by Caputo Generalized Fractional Derivative; Index. |
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