Pseudo-Differential Operators, Singularities, Applications |
Contents
II | 1 |
III | 2 |
IV | 4 |
V | 5 |
VII | 6 |
VIII | 7 |
IX | 9 |
X | 10 |
LXVIII | 95 |
LXIX | 97 |
LXXII | 98 |
LXXIII | 100 |
LXXIV | 104 |
LXXV | 106 |
LXXVI | 109 |
LXXVIII | 111 |
XI | 11 |
XII | 12 |
XIII | 14 |
XIV | 15 |
XV | 17 |
XVII | 19 |
XVIII | 21 |
XIX | 22 |
XX | 24 |
XXI | 27 |
XXIV | 29 |
XXV | 30 |
XXVI | 32 |
XXVII | 36 |
XXVIII | 37 |
XXIX | 38 |
XXXI | 39 |
XXXII | 40 |
XXXIII | 43 |
XXXIV | 48 |
XXXV | 51 |
XXXVI | 53 |
XXXVII | 55 |
XXXVIII | 56 |
XXXIX | 58 |
XL | 61 |
XLI | 63 |
XLII | 64 |
XLIII | 67 |
XLIV | 68 |
XLVI | 71 |
XLVII | 72 |
XLVIII | 73 |
XLIX | 75 |
L | 76 |
LIII | 76 |
LIV | 77 |
LVI | 79 |
LVII | 80 |
LVIII | 81 |
LIX | 82 |
LX | 85 |
LXIII | 87 |
LXIV | 88 |
LXV | 91 |
LXVI | 93 |
LXXIX | 112 |
LXXX | 115 |
LXXXI | 117 |
LXXXII | 118 |
LXXXIV | 120 |
LXXXV | 123 |
LXXXVII | 124 |
LXXXVIII | 126 |
LXXXIX | 127 |
XC | 129 |
XCI | 130 |
XCII | 133 |
XCIII | 140 |
XCIV | 157 |
XCV | 167 |
XCVII | 176 |
XCVIII | 184 |
XCIX | 192 |
C | 199 |
CI | 207 |
CIV | 213 |
CV | 222 |
CVI | 225 |
CVII | 233 |
CVIII | 236 |
CIX | 239 |
CX | 244 |
CXI | 252 |
CXII | 256 |
CXIII | 261 |
CXVII | 267 |
CXVIII | 270 |
CXIX | 273 |
CXX | 278 |
CXXI | 280 |
CXXII | 295 |
CXXIV | 301 |
CXXV | 307 |
CXXVI | 317 |
CXXVII | 328 |
CXXVIII | 330 |
CXXIX | 334 |
CXXX | 339 |
343 | |
Other editions - View all
Pseudo-Differential Operators, Singularities, Applications Iouri Egorov,Bert-Wolfgang Schulze Limited preview - 2012 |
Pseudo-Differential Operators, Singularities, Applications Yu V Egorov,B -Wolfgang Schulze No preview available - 1997 |
Pseudo-Differential Operators, Singularities, Applications Iouri Egorov,Bert-Wolfgang Schulze No preview available - 2012 |
Common terms and phrases
algebra analogous arbitrary asymptotic type boundary value problems C₁ calculus coefficients conical singularities constant coordinate neighbourhood corresponding cut-off function defined Definition denote diffeomorphism differential operators Diffm edge symbol elliptic operator equation Exercise exists finite finite-dimensional follows formal adjoint Fourier transform Fréchet space Fredholm operator Fuchs type h₁ holomorphic homogeneous principal implies induces continuous operators inequality integral isomorphism kernel Lemma linear Mellin symbols Mellin transform norm notation obtain Op(a operator family operator of order operator-valued symbols parameter-dependent parametrix partition of unity point xo principal symbol Proof pseudo-differential operators Remark respect satisfies Section Sm R+ smooth Sobolev spaces solution space Hs subspace supp Theorem theory topology vector w₁ weight data WF(u