eBook - ePub
Turbulence in Porous Media
Modeling and Applications
Marcelo J.S. de Lemos
This is a test
Partager le livre
- 408 pages
- English
- ePUB (adapté aux mobiles)
- Disponible sur iOS et Android
eBook - ePub
Turbulence in Porous Media
Modeling and Applications
Marcelo J.S. de Lemos
DĂ©tails du livre
Aperçu du livre
Table des matiĂšres
Citations
Ă propos de ce livre
Turbulence in Porous Media introduces the reader to the characterisation of turbulent flow, heat and mass transfer in permeable media, including analytical data and a review of available experimental data. Such transport processes occurring a relatively high velocity in permeable media are present in a number of engineering and natural flows. This new edition features a completely updated text including two new chapters exploring Turbulent Combustion and Moving Porous Media. De Lemos has expertly brought together a text that compiles, details, compares and evaluates available methodologies for modelling and simulating flow, providing an essential tour for engineering students working within the field as well as those working in chemistry, physics, applied mathematics, and geological and environmental sciences.
- Brings together groundbreaking and complex research on turbulence in porous media
- Extends the original model to situations including reactive systems
- Now discusses movement of the porous matrix
Foire aux questions
Comment puis-je résilier mon abonnement ?
Il vous suffit de vous rendre dans la section compte dans paramĂštres et de cliquer sur « RĂ©silier lâabonnement ». Câest aussi simple que cela ! Une fois que vous aurez rĂ©siliĂ© votre abonnement, il restera actif pour le reste de la pĂ©riode pour laquelle vous avez payĂ©. DĂ©couvrez-en plus ici.
Puis-je / comment puis-je télécharger des livres ?
Pour le moment, tous nos livres en format ePub adaptĂ©s aux mobiles peuvent ĂȘtre tĂ©lĂ©chargĂ©s via lâapplication. La plupart de nos PDF sont Ă©galement disponibles en tĂ©lĂ©chargement et les autres seront tĂ©lĂ©chargeables trĂšs prochainement. DĂ©couvrez-en plus ici.
Quelle est la différence entre les formules tarifaires ?
Les deux abonnements vous donnent un accĂšs complet Ă la bibliothĂšque et Ă toutes les fonctionnalitĂ©s de Perlego. Les seules diffĂ©rences sont les tarifs ainsi que la pĂ©riode dâabonnement : avec lâabonnement annuel, vous Ă©conomiserez environ 30 % par rapport Ă 12 mois dâabonnement mensuel.
Quâest-ce que Perlego ?
Nous sommes un service dâabonnement Ă des ouvrages universitaires en ligne, oĂč vous pouvez accĂ©der Ă toute une bibliothĂšque pour un prix infĂ©rieur Ă celui dâun seul livre par mois. Avec plus dâun million de livres sur plus de 1 000 sujets, nous avons ce quâil vous faut ! DĂ©couvrez-en plus ici.
Prenez-vous en charge la synthÚse vocale ?
Recherchez le symbole Ăcouter sur votre prochain livre pour voir si vous pouvez lâĂ©couter. Lâoutil Ăcouter lit le texte Ă haute voix pour vous, en surlignant le passage qui est en cours de lecture. Vous pouvez le mettre sur pause, lâaccĂ©lĂ©rer ou le ralentir. DĂ©couvrez-en plus ici.
Est-ce que Turbulence in Porous Media est un PDF/ePUB en ligne ?
Oui, vous pouvez accĂ©der Ă Turbulence in Porous Media par Marcelo J.S. de Lemos en format PDF et/ou ePUB ainsi quâĂ dâautres livres populaires dans Ciencias fĂsicas et AerodinĂĄmica. Nous disposons de plus dâun million dâouvrages Ă dĂ©couvrir dans notre catalogue.
Informations
PART ONE
Modeling
1 Introduction
2 Governing Equations
3 The Double-Decomposition Concept
4 Turbulent Momentum Transport
5 Turbulent Heat Transport
6 Turbulent Mass Transport
7 Turbulent Double Diffusion
8 Turbulent Combustion
9 Moving Porous Media
1
Introduction
Only two things are infinite, the universe and human stupidity, and Iâm not sure about the former.
Albert Einstein
1.1 Overview of Porous Media Modeling
Due to its ever-broader range of applications in science and industry, the study of flow through porous media has gained extensive attention lately. Engineering systems based on fluidized bed combustion, enhanced oil reservoir recovery, underground spreading of chemical waste, enhanced natural gas combustion in an inert porous matrix, and chemical catalytic reactors are just a few examples of applications of this interdisciplinary field. In a broader sense, the study of porous media embraces fluid and thermal sciences and materials, and chemical, geothermal, petroleum, and combustion engineering.
Accordingly, applications that are more complex usually require appropriate and, in most cases, more sophisticated mathematical and numerical modeling. Obtaining the final numerical results, however, may require the solution of a set of coupled partial differential equations involving many coupled variables in a complex geometry. This book shall review important aspects of numerical methods, including the treatment of multidimensional flow equations, discretization schemes for accurate solutions, algorithms for pointwise and block-implicit solutions, algorithms for high-performance computing, and turbulence modeling. These subjects shall be grouped into major sections covering numerical formulation and algorithms, geometry, and turbulence.
1.1.1 General Remarks
During the past few decades, a number of textbooks have been written on the subject of porous media. Among them are the works referred to in Muskat (1946), Carman (1956), Houpeurt (1957), Collins (1961), DeWiest (1969), Scheidegger (1974), Dullien (1979), Bear and Bachmat (1990), and Kaviany (1991). Advanced models documented in recent literature try to simulate additional effects such as variable porosity, anisotropy of medium permeability, unconventional boundary conditions, flow dimension, geometry complexity, nonlinear effects, and turbulence. Not all these flow complexities can be analyzed with the early unidimensional Darcy flow model. Recognizing the importance of these applications, the literature has been ingenious in proposing a number of extended theoretical approaches. Below is a short review of basic equations governing fluid flow, followed by a summary of some of the classical models for analyzing transport phenomena in porous media.
1.1.2 Fundamental Conservation Equations
The basic conservation equations describing the flow of a fluid through an infinitesimal volume can be written in a compact form as
...