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“Advanced Fluid Dynamics” ed. by Hyoung Woo Oh

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"Advanced Fluid Dynamics" ed. by Hyoung Woo Oh
InTeOpP | 2012 | ISBN: 9535102702 9789535102700 | 281 pages | PDF | 18 MB
This book is intended to serve as a reference text for presenting a broad range of topics on fluid dynamics to advanced scientists and researchers.
The chapters have been contributed by the prominent specialists in the field of fluid dynamics cover experimental and numerical fluid dynamics, aeroacoustics, multiphase flow analysis, convective instability, combustion, and turbulence modeling.

“Advanced Fluid Dynamics” ed. by Hyoung Woo Oh
1. An Experimental and Computational Study of the Fluid Dynamics of Dense Cooling Air-Mists
2. Direct Numerical Simulations of Compressible Vortex Flow Problems
3. Fluid Dynamics of Gas – Solid Fluidized Beds
4. Fuel Jet in Cross Flow – Experimental Study of Spray Characteristics
5. Influence of Horizontal Temperature Gradients on Convective Instabilities with Geophysical Interest
6. Internal Flows Driven by Wall-Normal Injection
7. Modelling of Turbulent Premixed and Partially Premixed Combustion
8. Multiscale Window Interaction and Localized Nonlinear Hydrodynamic Stability Analysis
9. Stability Investigation of Combustion Chambers with LES
10. Turbulent Boundary Layer Models: Theory and Applications
11. Unitary Qubit Lattice Gas Representation of 2D and 3D Quantum Turbulence
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“Non-fickian Solute Transport in Porous Media: A Mechanistic and Stochastic Theory” by Don Kulasiri

"Non-fickian Solute Transport in Porous Media: A Mechanistic and Stochastic Theory" by Don Kulasiri
Advances in Geophysical and Environmental Mechanics and Mathematics
S?ring?r | 2013 | ISBN: 3642349846 9783642349843 9783642349850 | 233 pages | PDF | 6 MB
This book presents an approach, based on sound theories of stochastic calculus and differential equations, which removes this basic premise. This book illustrates this outcome with available data at different scales, from experimental laboratory scales to regional scales.

The advection-dispersion equation that is used to model the solute transport in a porous medium is based on the premise that the fluctuating components of the flow velocity, hence the fluxes, due to a porous matrix can be assumed to obey a relationship similar to Fick’s law. This introduces phenomenological coefficients which are dependent on the scale of the experiments.

1 Non-fickian Solute Transport
2 Stochastic Differential Equations and Related Inverse Problems
3 A Stochastic Model for Hydrodynamic Dispersion
4 A Generalized Mathematical Model in One-Dimension
5 Theories of Fluctuations and Dissipation
6 Multiscale, Generalised Stochastic Solute Transport Model in One Dimension
7 The Stochastic Solute TransportTransport Model in 2-Dimensions
8 Multiscale DispersionDispersion in Two Dimensions
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