عنوان
پدید آورنده
موضوع
رده
TA418.9.P6
TA418
.
9
.
P6
کتابخانه
محل استقرار
شابک
شابک
3030061949
شابک
3030061957
شابک
9783030061944
شابک
9783030061951
شابک اشتباه
3030061930
شابک اشتباه
9783030061937
عنوان و نام پديدآور
عنوان اصلي
Routes to absolute instability in porous media /
نام عام مواد
[Book]
نام نخستين پديدآور
Antonio Barletta.
وضعیت نشر و پخش و غیره
محل نشرو پخش و غیره
Cham, Switzerland :
نام ناشر، پخش کننده و غيره
Springer,
تاریخ نشرو بخش و غیره
[2019]
تاریخ نشرو بخش و غیره
©2019
مشخصات ظاهری
نام خاص و کميت اثر
1 online resource
یادداشتهای مربوط به کتابنامه ، واژه نامه و نمایه های داخل اثر
متن يادداشت
Includes bibliographical references and index.
یادداشتهای مربوط به مندرجات
متن يادداشت
Intro; Foreword; Preface; Acknowledgements; Contents; 1 Introduction; References; Part I Mathematical Models of Flow Instability; 2 Fourier Transform and Wave Packets; 2.1 Integral Transforms; 2.2 The Fourier Transform; 2.2.1 Definition; 2.2.2 Inversion of the Fourier Transform; 2.2.3 Some Properties of the Fourier Transform; 2.2.4 Solution of the One-Dimensional Wave Equation; 2.2.5 Solution of the One-Dimensional Diffusion Equation; 2.2.6 Solution of the One-Dimensional Advection-Diffusion Equation; 2.2.7 Solution of the One-Dimensional Schrödinger Equation; 2.3 Plane Waves and Wave Packets
متن يادداشت
2.3.1 Stationary Waves in x-Space and k-Space2.3.2 Travelling Wave Packets; 2.4 Three-Dimensional Fourier Transform and Wave Packets; References; 3 Large-time Behaviour of Wave Packets; 3.1 What is a Holomorphic Function?; 3.1.1 Derivative of a Complex-Valued Function; 3.1.2 Path Integration in mathbbC; 3.1.3 Homotopy; 3.2 Laurent Expansions, Singular Points; 3.3 Residues; 3.3.1 Evaluation of Integrals; 3.4 The Laplace Transform; 3.4.1 Inversion of the Laplace Transform; 3.4.2 Main Properties of the Laplace Transform; 3.4.3 Meromorphic Functions; 3.5 Saddle Points; 3.5.1 Stationary Point
متن يادداشت
3.5.2 Paths from a Saddle Point3.5.3 Asymptotic Behaviour of Wave Packets at Large Times; References; 4 Instability of a Flow System; 4.1 Stability and Instability of a Mechanical System; 4.1.1 A Simple Mechanical System; 4.1.2 The Method of Small Perturbations; 4.2 Flow Stability with Burgers Equation; 4.2.1 Linear Stability Analysis; 4.2.2 Time Evolution of a Special Perturbation Wave Packet; 4.3 Stability of Channelised Burgers Flow; 4.3.1 Linear Stability Analysis; 4.4 Stability of a Convective Cahn-Hilliard Process; 4.4.1 Linear Stability Analysis
متن يادداشت
4.5 Some Considerations on Convective and Absolute InstabilitiesReferences; Part II Flow and Convection in Porous Media; 5 The Equations of Fluid Flow; 5.1 The Description of Fluid Flow; 5.2 Reynolds' Transport Theorem; 5.3 Local Mass Balance Equation; 5.4 Forces Acting on a Fluid Body; 5.5 Local Momentum Balance Equation; 5.6 Local Angular Momentum Balance Equation; 5.7 Local Energy Balance Equation; 5.8 Viscous Stresses and Heat Flux; 5.9 The Oberbeck-Boussinesq Approximation; 5.10 Governing Equations of Mass Diffusion; 5.10.1 Transport Theorem for Mass Diffusion
متن يادداشت
5.10.2 Concentrations and Mass Fluxes5.10.3 The Oberbeck-Boussinesq Approximation; 5.10.4 A Two-Component Mixture and Fick's Law; 5.11 Local Entropy Balance Equation; References; 6 Fluid Flow in Porous Media; 6.1 The Basic Features of Flow in Porous Media; 6.2 Local Momentum Balance in a Porous Medium; 6.3 Local Mass and Energy Balance Equations; 6.3.1 Local Thermal Non-equilibrium; 6.3.2 Viscous Dissipation; 6.4 The Buoyancy Force; 6.5 Non-Newtonian Flow in Porous Media; References; 7 Rayleigh-Bénard Convection; 7.1 Heating a Fluid Layer from Below; 7.2 The Rayleigh-Bénard Problem
بدون عنوان
0
بدون عنوان
8
بدون عنوان
8
بدون عنوان
8
بدون عنوان
8
یادداشتهای مربوط به خلاصه یا چکیده
متن يادداشت
This book addresses the concepts of unstable flow solutions, convective instability and absolute instability, with reference to simple (or toy) mathematical models, which are mathematically simple despite their purely abstract character. Within this paradigm, the book introduces the basic mathematical tools, Fourier transform, normal modes, wavepackets and their dynamics, before reviewing the fundamental ideas behind the mathematical modelling of fluid flow and heat transfer in porous media. The author goes on to discuss the fundamentals of the Rayleigh-Bénard instability and other thermal instabilities of convective flows in porous media, and then analyses various examples of transition from convective to absolute instability in detail, with an emphasis on the formulation, deduction of the dispersion relation and study of the numerical data regarding the threshold of absolute instability. The clear descriptions of the analytical and numerical methods needed to obtain these parametric threshold data enable readers to apply them in different or more general cases. This book is of interest to postgraduates and researchers in mechanical and thermal engineering, civil engineering, geophysics, applied mathematics, fluid mechanics, and energy technology.
یادداشتهای مربوط به سفارشات
منبع سفارش / آدرس اشتراک
Springer Nature
شماره انبار
com.springer.onix.9783030061944
ویراست دیگر از اثر در قالب دیگر رسانه
عنوان
Routes to absolute instability in porous media.
شماره استاندارد بين المللي کتاب و موسيقي
9783030061937
موضوع (اسم عام یاعبارت اسمی عام)
موضوع مستند نشده
Fluid mechanics.
موضوع مستند نشده
Porous materials-- Stability.
موضوع مستند نشده
Fluid mechanics.
موضوع مستند نشده
TECHNOLOGY & ENGINEERING-- Engineering (General)
موضوع مستند نشده
TECHNOLOGY & ENGINEERING-- Reference.
مقوله موضوعی
موضوع مستند نشده
TEC-- 009000
موضوع مستند نشده
TEC-- 035000
موضوع مستند نشده
TGMF
موضوع مستند نشده
TGMF
رده بندی ديویی
شماره
620
.
116
ويراست
23
رده بندی کنگره
شماره رده
TA418
.
9
.
P6
نام شخص به منزله سر شناسه - (مسئولیت معنوی درجه اول )
مستند نام اشخاص تاييد نشده
Barletta, Antonio
مبدا اصلی
تاريخ عمليات
20200823082221.0
قواعد فهرست نويسي ( بخش توصيفي )
pn
دسترسی و محل الکترونیکی
نام الکترونيکي
مطالعه متن کتاب اطلاعات رکورد کتابشناسی
نوع ماده
[Book]
اطلاعات دسترسی رکورد
تكميل شده
Y
