| Introduction Chapter XXV. Lagrangian Distributions and Fourier Integral Operators Summary 25.1. Lagrangian Distributions 25.2. The Calculus of Fourier Integral Operators 25.3. Special Cases of the Calculus, and L2 Continuity 25.4. Distributions Associated with Positive Lagrangian Ideals 25.5. Fourier Integral Operators with Complex Phase Notes Chapter XXVI. Pseudo-Differential Operators of Principal Type Summary 26.1. Operators with Real Principal Symbols 26.2. The Complex Involutive Case 26.3. The Symplectic Case 26.4. Solvability and Condition (ψ) 26.5. Geometrical Aspects of Condition (P) 26.6. The Singularities in N11 26.7. Degenerate Cauchy-Riemann Operators 26.8. The Nirenberg-Treves Estimate 26.9.The Nrenberg-Treves Estimate 26.10.The Singularites on One Dimensional Bicharacterstics 26.11.A Semi-Global Existence Theorem Chapter XXVII.Subelliptic Operators Summary 27.1.Defintions and Main Results 27.2.The Taylor Expansion of the Symbol 27.3.Subelliptic Operators Satsfying(P) 27.4.Local Properties of the Symbol Chapter XXVIIII.Uniqueess for the Cauchy problem Chapter XXIX.Spectral Asymptotics Chapter XXX.Long Range Scattering Theory Bibliography Index Index of Notation |
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