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Author:   Brian J. Hoskins (University of Reading) ,  Ian N. James (University of Reading)
Publisher:   John Wiley and Sons Ltd
Imprint:   Wiley-Blackwell
Dimensions:   Width: 17.80cm , Height: 2.70cm , Length: 25.30cm
Weight:   0.803kg
ISBN:  

9780470833698

ISBN 10:   0470833696
Pages:   432
Publication Date:   17 October 2014
Audience:   Professional and scholarly ,  Professional & Vocational
Format:   Hardback
Publisher's Status:   Active
Availability:   Out of stock  
The supplier is temporarily out of stock of this item. It will be ordered for you on backorder and shipped when it becomes available.

Table of Contents

Series foreword ix Preface xi Select bibliography xv The Authors xix 1 Observed flow in the Earth’s midlatitudes 1 1.1 Vertical structure 1 1.2 Horizontal structure 4 1.3 Transient activity 11 1.4 Scales of motion 14 1.5 The Norwegian frontal model of cyclones 15 Theme 1 Fluid dynamics of the midlatitude atmosphere 25 2 Fluid dynamics in an inertial frame of reference 27 2.1 Definition of fluid 27 2.2 Flow variables and the continuum hypothesis 29 2.3 Kinematics: characterizing fluid flow 30 2.4 Governing physical principles 35 2.5 Lagrangian and Eulerian perspectives 36 2.6 Mass conservation equation 38 2.7 First Law of Thermodynamics 40 2.8 Newton’s Second Law of Motion 41 2.9 Bernoulli’s Theorem 45 2.10 Heating and water vapour 47 3 Rotating frames of reference 53 3.1 Vectors in a rotating frame of reference 53 3.2 Velocity and Acceleration 55 3.3 The momentum equation in a rotating frame 56 3.4 The centrifugal pseudo-force 57 3.5 The Coriolis pseudo-force 59 3.6 The Taylor–Proudman theorem 61 4 The spherical Earth 65 4.1 Spherical polar coordinates 65 4.2 Scalar equations 67 4.3 The momentum equations 68 4.4 Energy and angular momentum 70 4.5 The shallow atmosphere approximation 73 4.6 The beta effect and the spherical Earth 74 5 Scale analysis and its applications 77 5.1 Principles of scaling methods 77 5.2 The use of a reference atmosphere 79 5.3 The horizontal momentum equations 81 5.4 Natural coordinates, geostrophic and gradient wind balance 83 5.5 Vertical motion 87 5.6 The vertical momentum equation 89 5.7 The mass continuity equation 91 5.8 The thermodynamic energy equation 92 5.9 Scalings for Rossby numbers that are not small 95 6 Alternative vertical coordinates 97 6.1 A general vertical coordinate 97 6.2 Isobaric coordinates 100 6.3 Other pressure-based vertical coordinates 103 6.4 Isentropic coordinates 106 7 Variations of density and the basic equations 109 7.1 Boussinesq approximation 109 7.2 Anelastic approximation 111 7.3 Stratification and gravity waves 113 7.4 Balance, gravity waves and Richardson number 115 7.5 Summary of the basic equation sets 121 7.6 The energy of atmospheric motions 122 Theme 2 Rotation in the atmosphere 125 8 Rotation in the atmosphere 127 8.1 The concept of vorticity 127 8.2 The vorticity equation 129 8.3 The vorticity equation for approximate sets of equations 131 8.4 The solenoidal term 132 8.5 The expansion/contraction term 134 8.6 The stretching and tilting terms 135 8.7 Friction and vorticity 138 8.8 The vorticity equation in alternative vertical coordinates 144 8.9 Circulation 145 9 Vorticity and the barotropic vorticity equation 149 9.1 The barotropic vorticity equation 149 9.2 Poisson’s equation and vortex interactions 151 9.3 Flow over a shallow hill 155 9.4 Ekman pumping 159 9.5 Rossby waves and the beta plane 160 9.6 Rossby group velocity 166 9.7 Rossby ray tracing 170 9.8 Inflexion point instability 172 10 Potential vorticity 177 10.1 Potential vorticity 177 10.2 Alternative derivations of Ertel’s theorem 180 10.3 The principle of invertibility 182 10.4 Shallow water equation potential vorticity 186 11 Turbulence and atmospheric flow 189 11.1 The Reynolds number 189 11.2 Three-dimensional flow at large Reynolds number 194 11.3 Two-dimensional flow at large Reynolds number 196 11.4 Vertical mixing in a stratified fluid 201 11.5 Reynolds stresses 203 Theme 3 Balance in atmospheric flow 209 12 Quasi-geostrophic flows 211 12.1 Wind and temperature in balanced flows 211 12.2 The quasi-geostrophic approximation 215 12.3 Quasi-geostrophic potential vorticity 219 12.4 Ertel and quasi-geostrophic potential vorticities 221 13 The omega equation 225 13.1 Vorticity and thermal advection form 225 13.2 Sutcliffe Form 231 13.3 Q-vector form 233 13.4 Ageostrophic flow and the maintenance of balance 238 13.5 Balance and initialization 240 14 Linear theories of baroclinic instability 245 14.1 Qualitative discussion 245 14.2 Stability analysis of a zonal flow 247 14.3 Rossby wave interpretation of the stability conditions 256 14.4 The Eady model 264 14.5 The Charney and other quasi-geostrophic models 271 14.6 More realistic basic states 275 14.7 Initial value problem 281 15 Frontogenesis291 15.1 Frontal scales 291 15.2 Ageostrophic circulation 294 15.3 Description of frontal collapse 299 15.4 The semi-geostrophic Eady model 305 15.5 The confluence model 307 15.6 Upper-level frontogenesis 309 16 The nonlinear development of baroclinic waves 311 16.1 The nonlinear domain 311 16.2 Semi-geostrophic baroclinic waves 312 16.3 Nonlinear baroclinic waves on realistic jets on the sphere 320 16.4 Eddy transports and zonal mean flow changes 323 16.5 Energetics of baroclinic waves 332 17 The potential vorticity perspective 337 17.1 Setting the scene 337 17.2 Potential vorticity and vertical velocity 340 17.3 Life cycles of some baroclinic waves 342 17.4 Alternative perspectives 346 17.5 Midlatitude blocking 350 17.6 Frictional and heating effects 352 18 Rossby wave propagation and potential vorticity mixing 361 18.1 Rossby wave propagation 361 18.2 Propagation of Rossby waves into the stratosphere 363 18.3 Propagation through a slowly varying medium 365 18.4 The Eliassen–Palm flux and group velocity 370 18.5 Baroclinic life cycles and Rossby waves 372 18.6 Variations of amplitude 373 18.7 Rossby waves and potential vorticity steps 375 18.8 Potential vorticity steps and the Rhines scale 381 Appendices 389 Appendix A: Notation 389 Appendix B: Revision of vectors and vector calculus 393 B.1 Vectors and their algebra 393 B.2 Products of vectors 394 B.3 Scalar fields and the grad operator 396 B.4 The divergence and curl operators 397 B.5 Gauss’ and Stokes’ theorems 398 B.6 Some useful vector identities 401 Index 403

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Author Information

Having gained mathematics degrees from Cambridge and spent some post-doc years in the USA, Brian Hoskins has been at the University of Reading for more than 40 years, being made a professor in 1981, and also more recently has led a climate institute at Imperial College London.  His international activities have included being President of IAMAS and Vice-Chair of the JSC for WCRP. He is a member of the science academies of the UK, Europe, USA and China, he has received the top awards of both the Royal and American Meteorological Societies, the Vilhelm Bjerknes medal of the EGU and the Buys Ballot Medal, and he was knighted in 2007. From a background in physics and astronomy, Ian James worked in the geophysical fluid dynamics laboratory of the Meteorological Office before joining the University of Reading in 1979. During his 31 years in the Reading meteorology department, he has taught courses in dynamical meteorology and global atmospheric circulation. In 1998, he was awarded the Buchan Prize of the Royal Meteorological Society for his work on low frequency atmospheric variability. He has been President of the Dynamical Meteorology Commission of IAMAS, vice president of the Royal Meteorological Society, and currently edits the journal Atmospheric Science Letters. He now serves as an Anglican priest in Cumbria.

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