Classical and Quantum Nonlinear Integrable Systems: Theory and ApplicationA Kundu Covering both classical and quantum models, nonlinear integrable systems are of considerable theoretical and practical interest, with applications over a wide range of topics, including water waves, pin models, nonlinear optics, correlated electron systems, plasma physics, and reaction-diffusion processes. Comprising one part on classical theories |
Contents
III | 3 |
IV | 4 |
V | 6 |
VI | 7 |
VII | 8 |
VIII | 10 |
X | 12 |
XII | 13 |
LXXXV | 128 |
LXXXVI | 130 |
LXXXVII | 132 |
LXXXVIII | 136 |
LXXXIX | 138 |
XC | 139 |
XCI | 147 |
XCII | 149 |
XIII | 15 |
XIV | 16 |
XVI | 17 |
XVIII | 18 |
XIX | 19 |
XX | 20 |
XXII | 21 |
XXIV | 25 |
XXVI | 26 |
XXVII | 27 |
XXVIII | 29 |
XXX | 30 |
XXXII | 31 |
XXXIII | 32 |
XXXIV | 34 |
XXXV | 35 |
XXXVII | 36 |
XXXVIII | 39 |
XXXIX | 42 |
XL | 44 |
XLI | 49 |
XLII | 50 |
XLIII | 51 |
XLV | 52 |
XLVI | 54 |
XLVII | 55 |
XLVIII | 56 |
XLIX | 57 |
L | 58 |
LI | 59 |
LII | 60 |
LIII | 64 |
LIV | 65 |
LV | 66 |
LVI | 68 |
LVII | 70 |
LVIII | 72 |
LIX | 75 |
LXI | 77 |
LXII | 83 |
LXIII | 86 |
LXV | 89 |
LXVI | 91 |
LXVII | 95 |
LXVIII | 96 |
LXIX | 98 |
LXX | 99 |
LXXI | 102 |
LXXII | 105 |
LXXIV | 107 |
LXXV | 109 |
LXXVI | 111 |
LXXVII | 112 |
LXXVIII | 115 |
LXXIX | 118 |
LXXX | 120 |
LXXXII | 125 |
LXXXIII | 126 |
LXXXIV | 127 |
XCIII | 151 |
XCIV | 152 |
XCV | 156 |
XCVI | 157 |
XCVII | 163 |
XCVIII | 166 |
C | 167 |
CI | 168 |
CIII | 169 |
CV | 170 |
CVI | 173 |
CVIII | 175 |
CIX | 177 |
CXI | 178 |
CXII | 182 |
CXIII | 184 |
CXIV | 195 |
CXV | 203 |
CXVI | 208 |
CXVII | 209 |
CXVIII | 211 |
CXIX | 212 |
CXX | 213 |
CXXI | 214 |
CXXII | 216 |
CXXIII | 220 |
CXXIV | 223 |
CXXV | 224 |
CXXVI | 226 |
CXXVII | 227 |
CXXVIII | 230 |
CXXIX | 234 |
CXXX | 236 |
CXXXI | 237 |
CXXXII | 239 |
CXXXIII | 240 |
CXXXV | 242 |
CXXXVI | 243 |
CXXXVII | 245 |
CXXXVIII | 247 |
CXXXIX | 250 |
CXL | 251 |
CXLII | 252 |
CXLIII | 253 |
CXLIV | 256 |
CXLV | 260 |
CXLVI | 262 |
CXLVII | 265 |
CXLVIII | 270 |
CXLIX | 272 |
CL | 273 |
CLII | 275 |
CLIII | 276 |
CLIV | 278 |
CLV | 280 |
CLVI | 281 |
288 | |
Other editions - View all
Classical and Quantum Nonlinear Integrable Systems: Theory and Application A Kundu Limited preview - 2019 |
Classical and Quantum Nonlinear Integrable Systems: Theory and Application A Kundu Limited preview - 2019 |
Classical and Quantum Nonlinear Integrable Systems: Theory and Application A Kundu No preview available - 2003 |
Common terms and phrases
algebraic Bethe ansatz analysis asymptotic Bäcklund transformation behaviour Bethe ansatz Bethe ansatz equations Boltzmann weights bosonic boundary conditions braiding commutation configurations consider constant constructed correlation functions corresponding defined denote derived dimensions discrete systems doped dynamical eigenvalue example excitations finite given Grammaticos Heisenberg integrable models integrable systems integral equation inverse scattering KdV equation Kundu L-operator ladder model lattice Lax operator Lax pair Lett limit linear linearizable mapping Math matrix elements method movable non-ultralocal models nonlinear Nucl obtained Painlevé equations Painlevé property particles phase Phys physical polynomial Potts model problem quantum group quantum integrable QYBE R-matrix Ramani reaction-diffusion regime relation rung singularity confinement sinh six-vertex model solitary waves soliton solving spectrum spin chain spinons symmetries temperature thermodynamic transfer matrix transformation ultralocal models variables vertex models Yang-Baxter equation zero