Johnson R.S. A modern introduction to the mathematical theory of water waves. - Cambridge: Cambridge University Press, 1997. - xiv, 445 p.: ill. - (Cambridge texts in applied mathematics). - Bibliogr.: p.429-435. - Sub. ind.: p.437-445. - ISBN 0-521-59172-4; ISBN 0-521-59832-X  Место хранения:   015 | Библиотека Института гидродинамики CO РАН | Новосибирск

Оглавление / Contents

Preface page ................................................... xi 1 Mathematical preliminaries ................................... 1 1.1 The governing equations of fluid mechanics .............. 2 1.1.1 The equation of mass conservation ................ 3 1.1.2 The equation of motion: Euler's equation ......... 5 1.1.3 Vorticity, streamlines and irrotational flow ..... 9 1.2 The boundary conditions for water waves ................ 13 1.2.1 The kinematic condition ......................... 14 1.2.2 The dynamic condition ........................... 15 1.2.3 The bottom condition ............................ 18 1.2.4 An integrated mass conservation condition ....... 19 1.2.5 An energy equation and its integral ............. 20 1.3 Nondimensionalisation and scaling ...................... 24 1.3.1 Nondimensionalisation ........................... 24 1.3.2 Scaling of the variables ........................ 28 1.3.3 Approximate equations ........................... 29 1.4 The elements of wave propagation and asymptotic expansions ............................................. 31 1.4.1 Elementary ideas in the theory of wave propagation ..................................... 31 1.4.2 Asymptotic expansions ........................... 35 Further reading ............................................. 46 Exercises ................................................... 47 2 Some classical problems in water-wave theory ................ 61 I Linear problems ............................................. 62 2.1 Wave propagation for arbitrary depth and wavelength .... 62 2.1.1 Particle paths .................................. 67 2.1.2 Group velocity and the propagation of energy .... 69 2.1.3 Concentric waves on deep water .................. 75 2.2 Wave propagation over variable depth ................... 80 2.2.1 Linearised gravity waves of any wave number moving over a constant slope .................... 85 2.2.2 Edge waves over a constant slope ................ 90 2.3 Ray theory for a slowly varying environment ............ 93 2.3.1 Steady, oblique plane waves over variable depth .......................................... 100 2.3.2 Ray theory in cylindrical geometry ............. 105 2.3.3 Steady plane waves on a current ................ 108 2.4 The ship-wave pattern ................................. 117 2.4.1 Kelvin's theory ................................ 120 2.4.2 Ray theory ..................................... 134 II Nonlinear problems ......................................... 138 2.5 The Stokes wave ....................................... 139 2.6 Nonlinear long waves .................................. 146 2.6.1 The method of characteristics .................. 148 2.6.2 The hodograph transformation ................... 153 2.7 Hydraulic jump and bore ............................... 156 2.8 Nonlinear waves on a sloping beach .................... 162 2.9 The solitary wave ..................................... 165 2.9.1 The sech2 solitary wave ........................ 171 2.9.2 Integral relations for the solitary wave ....... 176 Further reading ............................................ 181 Exercises .................................................. 182 3 Weakly nonlinear dispersive waves .......................... 200 3.1 Introduction .......................................... 200 3.2 The Korteweg-de Vries family of equations ............. 204 3.2.1 Korteweg-de Vries (KdV) equation ............... 204 3.2.2 Two-dimensional Korteweg-de Vries (2D KdV) equation ....................................... 209 3.2.3 Concentric Korteweg-de Vries (cKdV) equation ....................................... 211 3.2.4 Nearly concentric Korteweg-de Vries (ncKdV) equation ....................................... 214 3.2.5 Boussinesq equation ............................ 216 3.2.6 Transformations between these equations ........ 219 3.2.7 Matching to the near-field ..................... 221 3.3 Completely integrable equations: some results from soliton theory ........................................ 223 3.3.1 Solution of the Korteweg-de Vries equation ..... 225 3.3.2 Soliton theory for other equations ............. 233 3.3.3 Hirota's bilinear method ....................... 234 3.3.4 Conservation laws .............................. 243 3.4 Waves in a nonuniform environment ..................... 255 3.4.1 Waves over a shear flow ........................ 255 3.4.2 The Burns condition ............................ 261 3.4.3 Ring waves over a shear flow ................... 263 3.4.4 The Korteweg-de Vries equation for variable depth .......................................... 268 3.4.5 Oblique interaction of waves ................... 277 Further reading ............................................ 284 Exercises .................................................. 285 4 Slow modulation of dispersive waves ........................ 297 4.1 The evolution of wave packets ......................... 298 4.1.1 Nonlinear Schrodinger (NLS) equation ........... 298 4.1.2 Davey-Stewartson (DS) equations ................ 305 4.1.3 Matching between the NLS and KdV equations ..... 308 4.2 NLS and DS equations: some results from soliton theory ................................................ 312 4.2.1 Solution of the Nonlinear Schrodinger equation ....................................... 312 4.2.2 Bilinear method for the NLS equation ........... 318 4.2.3 Bilinear form of the DS equations for long waves .......................................... 323 4.2.4 Conservation laws for the NLS and DS equations ...................................... 325 4.3 Applications of the NLS and DS equations .............. 331 4.3.1 Stability of the Stokes wave ................... 332 4.3.2 Modulation of waves over a shear flow .......... 337 4.3.3 Modulation of waves over variable depth ........ 341 Further reading ............................................ 345 Exercises .................................................. 345 5 Epilogue ................................................... 356 5.1 The governing equations with viscosity ................ 357 5.2 Applications to the propagation of gravity waves ...... 359 5.2.1 Small amplitude harmonic waves ................. 360 5.2.2 Attenuation of the solitary wave ............... 365 5.2.3 Undular bore - model I ......................... 374 5.2.4 Undular bore - model II ........................ 378 Further reading ............................................ 386 Exercises .................................................. 387 Appendices .................................................... 393 A The equations for a viscous fluid .......................... 393 В The boundary conditions for a viscous fluid ................ 397 С Historical notes ........................................... 399 D Answers and hints .......................................... 405 Bibliography .................................................. 429 Subject index ................................................. 437