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Finite Blaschke Products and Their Connections 2018 ed. [Kõva köide]

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  • Formaat: Hardback, 328 pages, kõrgus x laius: 235x155 mm, kaal: 5172 g, 10 Illustrations, color; 39 Illustrations, black and white; XIX, 328 p. 49 illus., 10 illus. in color., 1 Hardback
  • Ilmumisaeg: 05-Jun-2018
  • Kirjastus: Springer International Publishing AG
  • ISBN-10: 3319782460
  • ISBN-13: 9783319782461
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Finite Blaschke Products and Their Connections 2018 ed.Suurem pilt
  • Formaat: Hardback, 328 pages, kõrgus x laius: 235x155 mm, kaal: 5172 g, 10 Illustrations, color; 39 Illustrations, black and white; XIX, 328 p. 49 illus., 10 illus. in color., 1 Hardback
  • Ilmumisaeg: 05-Jun-2018
  • Kirjastus: Springer International Publishing AG
  • ISBN-10: 3319782460
  • ISBN-13: 9783319782461
Teised raamatud teemal:
Püsilink: https://www.kriso.ee/db/9783319782461.html
This monograph offers an introduction to finite Blaschke products and their connections to complex analysis, linear algebra, operator theory, matrix analysis, and other fields.  Old favorites such as the Carathéodory approximation and the Pick interpolation theorems are featured, as are many topics that have never received a modern treatment, such as the Bohr radius and Ritt's theorem on decomposability.  Deep connections to hyperbolic geometry are explored, as are the mapping properties, zeros, residues, and critical points of finite Blaschke products.  In addition, model spaces, rational functions with real boundary values, spectral mapping properties of the numerical range, and the Darlington synthesis problem from electrical engineering are also covered.

Topics are carefully discussed, and numerous examples and illustrations highlight crucial ideas. While thorough explanations allow the reader to appreciate the beauty of the subject, relevant exercises following each chapter improve technical fluency with the material.  With much of the material previously scattered throughout mathematical history, this book presents a cohesive, comprehensive and modern exposition accessible to undergraduate students, graduate students, and researchers who have familiarity with complex analysis.

Arvustused

The book under consideration is concerned with finite Blaschke products. The book is designed for students and researchers familiar with basic real and complex analysis and linear algebra. The proofs are detailed and dozens illustrations are provided. At the end of each chapter, the authors include exercises so that the reader can gain greater technical fluency with the material and appreciate the beauty of the subject. (Leonid Golinskii, zbMATH 1398.30002, 2018)

1 Geometry of the Schur Class
1(20)
1.1 The Schwarz Lemma
1(1)
1.2 Automorphisms of the Disk
2(2)
1.3 Algebraic Structure of Aut(D)
4(4)
1.4 The Schwarz-Pick Theorem
8(2)
1.5 An Extremal Problem
10(1)
1.6 Julia's Lemma
10(4)
1.7 Fixed Points
14(2)
1.8 Exercises
16(5)
2 Elementary Hyperbolic Geometry
21(18)
2.1 Pseudohyperbolic Metric
21(4)
2.2 Generalized Triangle Inequality
25(1)
2.3 Poincare Metric
26(4)
2.4 Ahlfors's Version of the Schwarz's Lemma
30(4)
2.5 Hyperbolic Geometry in C+
34(1)
2.6 Exercises
35(4)
3 Finite Blaschke Products: The Basics
39(20)
3.1 Finite Blaschke Products
39(1)
3.2 Uniqueness and Nonuniqueness
40(3)
3.3 Finite Blaschke Products as Rational Functions
43(3)
3.4 Finite Blaschke Products as n-to-1 Functions
46(3)
3.5 Unimodular Elements of the Disk Algebra
49(1)
3.6 Composition of Finite Blaschke Products
50(1)
3.7 Constant Valence
51(2)
3.8 Finite Blaschke Products on C+
53(1)
3.9 Notes
54(1)
3.10 Exercises
55(4)
4 Approximation by Finite Blaschke Products
59(16)
4.1 Approximating Functions from 5?
59(2)
4.2 The Closed Convex Hull of the Finite Blaschke Products
61(2)
4.3 Approximating Continuous Unimodular Functions
63(3)
4.4 Approximation by Finite Blaschke Products with Simple Zeros
66(3)
4.5 Generalized Rouche Theorem and Its Converse
69(3)
4.6 Exercises
72(3)
5 Zeros and Residues
75(26)
5.1 Gauss--Lucas Theorem
75(2)
5.2 Gauss--Lucas Theorem for Finite Blaschke Products
77(5)
5.3 Zeros as Foci of an Ellipse
82(5)
5.4 A Weak Version of Sendov's Conjecture
87(5)
5.5 A Forbidden Region
92(2)
5.6 The Best Citadel
94(1)
5.7 Existence of a Nonzero Residue
95(3)
5.8 Exercises
98(3)
6 Critical Points
101(28)
6.1 Location of the Critical Points
101(7)
6.2 Controlling the Critical Points
108(3)
6.3 The Topological Space Σd
111(5)
6.4 The Distance-Ratio Function
116(3)
6.5 A Characterization of Heins
119(8)
6.6 Notes
127(1)
6.7 Exercises
128(1)
7 Interpolation
129(26)
7.1 Lagrange Interpolation: Polynomials
130(1)
7.2 Lagrange Interpolation: Rational Functions
131(4)
7.3 Pick Interpolation Theorem
135(10)
7.4 Boundary Interpolation: Cantor-Phelps Solution
145(3)
7.5 Boundary Interpolation: A Constructive Solution
148(3)
7.6 Exercises
151(4)
8 The Bohr Radius
155(26)
8.1 The Classical Bohr Radius B0
156(3)
8.2 Computing B0
159(4)
8.3 The Generalized Bohr Radius Bk
163(2)
8.4 A Localized Bohr Radius
165(3)
8.5 Estimates of Landau and Bombieri
168(3)
8.6 A Theorem of Bombieri and Ricci
171(8)
8.7 Notes
179(1)
8.8 Exercises
180(1)
9 Finite Blaschke Products and Group Theory
181(28)
9.1 A Cyclic Subgroup
181(4)
9.2 Decomposable Finite Blaschke Products
185(3)
9.3 The Monodromy Group
188(4)
9.4 Examples of Monodromy Groups
192(6)
9.5 Primitive Versus Imprimitive
198(3)
9.6 Ritt's Theorem
201(3)
9.7 Examples of Decomposability
204(1)
9.8 Notes
205(1)
9.9 Exercises
206(3)
10 Finite Blaschke Products and Operator Theory
209(36)
10.1 Contractions
209(6)
10.2 Norms of Contractions
215(4)
10.3 Numerical Range
219(4)
10.4 Halmos' Conjecture
223(3)
10.5 The Wiener Algebra Versus the Disk Algebra
226(4)
10.6 The Berger--Stampfli Mapping Theorem
230(2)
10.7 A Local Inequality
232(3)
10.8 Teardrops and Drury's Theorem
235(4)
10.9 Sharpness of Drury's Result via Disk Automorphisms
239(2)
10.10 Notes
241(1)
10.11 Exercises
242(3)
11 Real Complex Functions
245(16)
11.1 Real Rational Functions
245(4)
11.2 Helson's Characterization
249(3)
11.3 Real Rational Functions Without Zeros
252(2)
11.4 Factorization
254(1)
11.5 Valence
255(3)
11.6 Notes
258(1)
11.7 Exercises
258(3)
12 Finite-Dimensional Model Spaces
261(30)
12.1 Model Spaces
261(5)
12.2 The Takenaka Basis
266(1)
12.3 Reproducing Kernel
267(4)
12.4 Projections onto Model Spaces
271(1)
12.5 Conjugation
272(3)
12.6 Compressed Shift
275(3)
12.7 Partial Isometries
278(5)
12.8 Unitary Extensions of the Compressed Shift
283(3)
12.9 Notes
286(3)
12.10 Exercises
289(2)
13 The Darlington Synthesis Problem
291(16)
13.1 Factorization of Rational Functions
292(2)
13.2 Finite Blaschke Products as Divisors in Model Spaces
294(1)
13.3 Quaternionic Structure of Solutions
295(3)
13.4 Primitive Solution Sets
298(3)
13.5 Construction of the Solutions
301(4)
13.6 Notes
305(1)
13.7 Exercises
305(2)
Appendix A Some Reminders 307(12)
A.1 Fourier Analysis
307(1)
A.2 The Cauchy Integral Formula
308(1)
A.3 Fatou's Theorem
309(1)
A.4 Hardy Space Theory
309(2)
A.5 Jensen's Formula and Jensen's Inequality
311(1)
A.6 Hilbert Spaces and Their Operators
311(5)
A.7 Toeplitz Operators
316(2)
A.8 Schur's Theorem
318(1)
References 319(6)
Index 325
Stephan Ramon Garcia is a professor of mathematics at Pomona College

Javad Mashreghi is a professor in the Department of Mathematics and Statistics at Laval University, Alexandre-Vachon. 

William T. Ross is a professor of mathematics and the Chair of the Department of Math and Computer Sciences at the University of Richmond.