Advanced Complex Analysis A Comprehensive Course in Analysis, Part 2B Barry Simon Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms Advanced Complex Analysis A Comprehensive Course in Analysis, Part 2B Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms http://dx.doi.org/10.1090/simon/002.2 Advanced Complex Analysis A Comprehensive Course in Analysis, Part 2B Barry Simon Providence, Rhode Island Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms 2010 Mathematics Subject Classification. Primary 30-01, 33-01, 34-01, 11-01; Secondary 30C55, 30D35, 33C05, 60J67. 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License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms To the memory of Cherie Galvez extraordinary secretary, talented helper, caring person and to the memory of my mentors, Ed Nelson (1932-2014) and Arthur Wightman (1922-2013) who not only taught me Mathematics but taught me how to be a mathematician Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms Contents Preface to the Series ix Preface to Part 2 xv Chapter 12. Riemannian Metrics and Complex Analysis 1 §12.1. Conformal Metrics and Curvature 3 §12.2. The Poincar´e Metric 6 §12.3. The Ahlfors–Schwarz Lemma 14 §12.4. Robinson’s Proof of Picard’s Theorems 16 §12.5. The Bergman Kernel and Metric 18 §12.6. The Bergman Projection and Painlev´e’s Conformal Mapping Theorem 27 Chapter 13. Some Topics in Analytic Number Theory 37 §13.1. Jacobi’s Two- and Four-Square Theorems 46 §13.2. Dirichlet Series 56 §13.3. The Riemann Zeta and Dirichlet L-Function 72 §13.4. Dirichlet’s Prime Progression Theorem 80 §13.5. The Prime Number Theorem 87 Chapter 14. Ordinary Differential Equations in the Complex Domain 95 §14.1. Monodromy and Linear ODEs 99 §14.2. Monodromy in Punctured Disks 101 §14.3. ODEs in Punctured Disks 106 vii Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms viii Contents §14.4. Hypergeometric Functions 116 §14.5. Bessel and Airy Functions 139 §14.6. Nonlinear ODEs: Some Remarks 150 §14.7. Integral Representation 152 Chapter 15. Asymptotic Methods 161 §15.1. Asymptotic Series 163 §15.2. Laplace’s Method: Gaussian Approximation and Watson’s Lemma 171 §15.3. The Method of Stationary Phase 183 §15.4. The Method of Steepest Descent 194 §15.5. The WKB Approximation 213 Chapter 16. Univalent Functions and Loewner Evolution 231 §16.1. Fundamentals of Univalent Function Theory 233 §16.2. Slit Domains and Loewner Evolution 241 §16.3. SLE: A First Glimpse 251 Chapter 17. Nevanlinna Theory 257 §17.1. The First Main Theorem of Nevanlinna Theory 262 §17.2. Cartan’s Identity 268 §17.3. The Second Main Theorem and Its Consequences 271 §17.4. Ahlfors’ Proof of the SMT 278 Bibliography 285 Symbol Index 309 Subject Index 311 Author Index 315 Index of Capsule Biographies 321 Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms Preface to the Series Youngmenshouldprovetheorems,oldmenshouldwritebooks. —FreemanDyson,quotingG.H.Hardy1 Reed–Simon2 starts with “Mathematics has its roots in numerology, ge- ometry, and physics.” This puts into context the division of mathematics into algebra, geometry/topology, and analysis. There are, of course, other areas of mathematics, and a division between parts of mathematics can be artificial. But almost universally, we require our graduate students to take courses in these three areas. This five-volumeseries began and, to some extent, remains a set of texts forabasicgraduateanalysiscourse. InpartitreflectsCaltech’sthree-terms- per-yearscheduleandtheactualcoursesI’vetaughtinthepast. Muchofthe contentsofParts1and2(Part2isintwovolumes,Part2AandPart2B)are common to virtually all such courses: point set topology, measure spaces, Hilbert and Banach spaces, distribution theory, and the Fourier transform, complex analysis including the Riemann mapping and Hadamard product theorems. Parts 3 and 4 are made up of material that you’ll find in some, but not all, courses—on the one hand, Part 3 on maximal functions and Hp-spaces; on the other hand, Part 4 on the spectral theorem for bounded self-adjointoperatorsonaHilbertspaceanddetandtrace, againforHilbert space operators. Parts 3 and 4 reflect the two halves of the third term of Caltech’s course. 1InterviewwithD.J.Albers,TheCollegeMathematicsJournal,25,no.1,January1994. 2M.ReedandB.Simon,Methodsof ModernMathematicalPhysics, I: FunctionalAnalysis, AcademicPress,NewYork,1972. ix Licensed to AMS. License or copyright restrictions may apply to redistribution; see http://www.ams.org/publications/ebooks/terms