Classical and quantum orthogonal polynomials in one variable:
Gespeichert in:
| Beteilige Person: | |
|---|---|
| Format: | Buch |
| Sprache: | Englisch |
| Veröffentlicht: |
Cambridge [u.a.]
Cambridge Univ. Press
2009
|
| Ausgabe: | 1. paperback. ed. |
| Schriftenreihe: | Encyclopedia of mathematics and its applications
98 |
| Schlagwörter: | |
| Links: | http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=020497379&sequence=000003&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=020497379&sequence=000004&line_number=0002&func_code=DB_RECORDS&service_type=MEDIA |
| Beschreibung: | Includes bibliographical references (p. 663-698) and index |
| Umfang: | XVIII, 708 S. |
| ISBN: | 9780521143479 9780521782012 |
Internformat
MARC
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| 100 | 1 | |a Ismail, Mourad E. H. |d 1944- |e Verfasser |0 (DE-588)172163919 |4 aut | |
| 245 | 1 | 0 | |a Classical and quantum orthogonal polynomials in one variable |c Mourad E.H. Ismail ; with two chapters by Walter Van Assche |
| 250 | |a 1. paperback. ed. | ||
| 264 | 1 | |a Cambridge [u.a.] |b Cambridge Univ. Press |c 2009 | |
| 300 | |a XVIII, 708 S. | ||
| 336 | |b txt |2 rdacontent | ||
| 337 | |b n |2 rdamedia | ||
| 338 | |b nc |2 rdacarrier | ||
| 490 | 1 | |a Encyclopedia of mathematics and its applications |v 98 | |
| 500 | |a Includes bibliographical references (p. 663-698) and index | ||
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Datensatz im Suchindex
| DE-BY-TUM_call_number | 0102 MAT 338f 2017 A 2849 |
|---|---|
| DE-BY-TUM_katkey | 2262096 |
| DE-BY-TUM_location | 01 |
| DE-BY-TUM_media_number | 040008256182 |
| _version_ | 1821935514110918656 |
| adam_text | Contents
Foreword page
xi
Preface
xvi
1
Preliminaries
1
1.1
Hermitian Matrices and Quadratic Forms
1
1.2
Some Real and Complex Analysis
3
1.3
Some Special Functions
8
1.4
Summation Theorems and Transformations
12
2
Orthogonal Polynomials
16
2.1
Construction of Orthogonal Polynomials
16
2.2
Recurrence Relations
22
2.3
Numerator Polynomials
26
2.4
Quadrature Formulas
28
2.5
The Spectral Theorem
30
2.6
Continued Fractions
35
2.7
Modifications of Measures:
Christoffel
and Uvarov
37
2.8
Modifications of Measures:
Toda
41
2.9
Modification by Adding Finite Discrete Parts
43
2.10
Modifications of Recursion Coefficients
45
2.11
DualSystems
47
3
Differential Equations, Discriminants and Electrostatics
52
3.1
Preliminaries
52
3.2
Differential Equations
53
3.3
Applications
63
3.4
Discriminants
67
3.5
An Electrostatic Equilibrium Problem
70
3.6
Functions of the Second Kind
73
3.7
Lie Algebras
76
4
Jacobi Polynomials
80
4.1
Orthogonality
80
4.2
Differential and Recursion Formulas
82
4.3
Generating Functions
88
4.4
Functions of the Second Kind
93
vi Contenti
4.5
Ultraspherical
Polynomials
94
4.6
Laguerre
and Hermite Polynomials
98
4.7
Multilinear Generating Functions
106
4.8
Asymptotics and Expansions
114
4.9
Relative
Extrema
of Classical Polynomials
120
4.10
The Bessel Polynomials
123
5
Some Inverse Problems
133
5.1
Ultraspherical Polynomials
1
3 З
5.2
Birth and Death Processes
136
5.3
The
Hadamard
Integral
141
5.4
Pollaczek Polynomials
147
5.5
A Generalization
151
5.6
Associated Laguerre and Hermite Polynomials
158
5.7
Associated Jacobi Polynomials
162
5.8
The J-Matrix Method
168
5.9
The Meixner-Pollaczek Polynomials
171
6
Discrete Orthogonal Polynomials
174
6.1
Meixner Polynomials
174
6.2 Hahn,
Dual
Hahn,
and Krawtchouk Polynomials
177
6.3
Difference Equations
186
6.4
Discrete Discriminants
190
6.5
Lömmel
Polynomials
194
6.6
An Inverse Operator
199
7
Zeros and Inequalities
203
7.1
A Theorem of Markov
203
7.2
Chain Sequences
205
7.3
The Hellmann-Feynman Theorem
211
7.4
Extreme Zeros of Orthogonal Polynomials
219
7.5
Concluding Remarks
221
8
Polynomials Orthogonal on the Unit Circle
222
8.1
Elementary Properties
222
8.2
Recurrence Relations
225
8.3
Differential Equations
231
8.4
Functional Equations and Zeros
240
8.5
Limit Theorems
245
8.6
Modifications of Measures
247
9
Linearization, Connections and Integral Representations
254
9.1
Connection Coefficients
256
9.2
The Ultraspherical Polynomials and Watson s Theorem
262
9.3
Linearization and Power Series Coefficients
264
9.4
Linearization of Products and Enumeration
269
9.5
Representations for Jacobi Polynomials
274
9.6
Addition and Product Formulas
277
9.7
The Askey-Gasper Inequality
281
Contents
vii
10
The Sheffer Classification
283
10.1
Preliminaries
283
10.2
Delta Operators
286
10.3
Algebraic Theory
288
11
g-Series Preliminaries
294
11.1
Introduction
294
11.2
Orthogonal Polynomials
294
11.3
The Bootstrap Method
295
11.4
(/-Differences
297
12
(/-Summation Theorems
300
12.1
Basic Definitions
300
12.2
Expansion Theorems
303
12.3
Bilateral Series
308
12.4
Transformations
311
12.5
Additional Transformations
314
12.6
Theta Functions
316
13
Some g-Orthogonal Polynomials
319
13.1
ç-Hermite
Polynomials
320
13.2
g-Ultraspherical Polynomials
327
13.3
Linearization and Connection Coefficients
331
13.4
Asymptotics
335
13.5
Application: The Rogers-Ramanujan Identities
336
13.6
Related Orthogonal Polynomials
341
13.7
Three Systems of g-Orthogonal Polynomials
345
14
Exponential and q-Bessel Functions
352
14.1
Definitions
352
14.2
Generating Functions
357
14.3
Addition Formulas
359
14.4
ρ
-Analogues
of
Lömmel
and Bessel Polynomials
360
14.5
A Class of Orthogonal Functions
364
14.6
An Operator Calculus
366
14.7
Polynomials of
ç-Binomial
Type
372
14.8
Another g-Umbral Calculus
376
15
The Askey-Wilson Polynomials
378
15.1
The Al-Salam-Chihara Polynomials
378
15.2
The Askey-Wilson Polynomials
382
15.3
Remarks
387
15.4
Asymptotics
389
15.5
Continuous q-Jacobi Polynomials and Discriminants
391
15.6
g-Racah Polynomials
396
15.7
(/-Integral Representations
400
15.8
Linear and Multilinear Generating Functions
405
15.9
Associated
ç-Ultraspherical
Polynomials
411
15.10
Two Systems of Orthogonal Polynomials
416
viii Contents
16
The Askey-Wilson Operators
426
16.1
Basic Results
426
16.2
A q-Sturm-Liouville Operator
433
16.3
The Askey-Wilson Polynomials
437
16.4
Connection Coefficients
443
16.5
Bethe
Ansatz
Equations of XXZ Model
446
17
g-Hermite Polynomials on the Unit Circle
455
17.1
The
Rogers-Szegő
Polynomials
455
17.2
Generalizations
460
17.3
q-Difference Equations
464
18
Discrete q-Orthogonal Polynomials
469
18.1
Discrete Sturm-Liouville Problems
469
18.2
The Al-Salam-Carlitz Polynomials
470
18.3
The Al-Salam-Carlitz Moment Problem
476
18.4
q-Jacobi Polynomials
477
18.5
q-Hahn Polynomials
484
18.6
(/-Differences and Quantized Discriminants
486
18.7
A Family of
Biorthogonal
Rational Functions
488
19
Fractional and q-Fractional Calculus
491
19.1
The Riemann-Liouville Operators
491
19.2
Bilinear Formulas
495
19.3
Examples
496
19.4
q-Fractional Calculus
501
19.5
Some Integral Operators
504
20
Polynomial Solutions to Functional Equations
509
20.1
Bochner s Theorem
509
20.2
Difference and g-Difference Equations
514
20.3
Equations in the Askey-Wilson Operators
516
20.4
Leonard Pairs and the q-Racah Polynomials
518
20.5
Characterization Theorems
525
21
Some Indeterminate Moment Problems
530
21.1
The Hamburger Moment Problem
530
21.2
A System of Orthogonal Polynomials
534
21.3
Generating Functions
537
21.4
The Nevanlinna Matrix
542
21.5
Some Orthogonality Measures
544
21.6
Ladder Operators
547
21.7
Zeros
550
21.8
The t/-Laguerre Moment Problem
553
21.9
Other Indeterminate Moment Problems
563
21.10
Some
Biorthogonal
Rational Functions
572
22
The Riemann-Hilbert Problem for Orthogonal Polynomials
578
22.1
The Cauchy Transform
578
Contents ix
22.2 The Fokas-Its-Kitaev
Boundary Value
Problem 581
22.2.1
The three-term recurrence relation
584
22.3
Hermite Polynomials
586
22.3.1
A Differential Equation
586
22.4
Laguerre Polynomials
589
22.4.1
Three-term recurrence relation
591
22.4.2
A differential equation
592
22.5
Jacobi Polynomials
596
22.5.1
Differential equation
597
22.6
Asymptotic Behavior
601
22.7
Discrete Orthogonal Polynomials
603
22.8
Exponential Weights
604
23
Multiple Orthogonal Polynomials
607
23.1
Type I and II Multiple Orthogonal Polynomials
608
23.1.1
Angelesco systems
610
23.1.2
AT systems
611
23.1.3
Biorthogonality
613
23.1.4
Recurrence relations
614
23.2
Hermite-Padé
Approximation
621
23.3
Multiple Jacobi Polynomials
622
23.3.1
Jacobi-Angelesco polynomials
622
23.3.2
Jacobi-Piñeiro
polynomials
626
23.4
Multiple Laguerre Polynomials
628
23.4.1
Multiple Laguerre polynomials of the first kind
628
23.4.2
Multiple Laguerre polynomials of the second kind
629
23.5
Multiple Hermite Polynomials
630
23.5.1
Random matrices with external source
631
23.6
Discrete Multiple Orthogonal Polynomials
632
23.6.1
Multiple Charlier polynomials
632
23.6.2
Multiple Meixner polynomials
632
23.6.3
Multiple Krawtchouk polynomials
634
23.6.4
Multiple
Hahn
polynomials
634
23.6.5
Multiple little g-Jacobi polynomials
635
23.7
Modified Bessel Function Weights
636
23.7.1
Modified Bessel functions
637
23.8
The Riemann-Hilbert Problem for Multiple Orthogonal Poly¬
nomials
639
23.8.1
Recurrence relation
644
23.8.2
Differential equation for multiple Hermite polynomials
645
24
Research Problems
648
24.1
Multiple Orthogonal Polynomials
648
24.2
A Class of Orthogonal Functions
649
24.3
Positivity
649
24.4
Asymptotics and Moment Problems
650
χ
Contents
24.5
Functional Equations and Lie Algebras
652
24.6
Rogers-Ramanujan Identities
653
24.7
Characterization Theorems
654
24.8
Special Systems of Orthogonal Polynomials
658
24.9
Zeros of Orthogonal Polynomials
661
Bibliography
663
Index
699
Author index
705
Encyclopedia
of Mathematics and its Applications
Editorial Board
P. Flajolet, M.E.H. Ismail, E. Lutwak
Volume
98
Classical and Quantum Orthogonal Polynomials in One Variable
This is first modern treatment of orthogonal polynomials from the viewpoint
of special functions. The coverage is encyclopedic, including classical topics
such as Jacobi, Hermite, Laguerre,
Hahn, Charlier
and Meixner polynomials
as well as those, e.g. Askey-Wilson and Al-Salam-Chihara polynomial
systems, discovered over the last
50
years: multiple orthogonal polynomials
are dicussed for the first time in book form. Many modern applications of
the subject are dealt with, including birth and death processes,
integrable
systems, combinatorics, and physical models. A chapter on open research
problems and conjectures is designed to stimulate further research on the
subject.
Exercises of varying degrees of difficulty are included to help the
graduate student and the newcomer. A comprehensive bibliography rounds
off the work, which will be valued as an authoritative reference and for
graduate teaching, in which role it has already been successfully class-tested.
|
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| id | DE-604.BV036576368 |
| illustrated | Not Illustrated |
| indexdate | 2024-12-20T14:37:20Z |
| institution | BVB |
| isbn | 9780521143479 9780521782012 |
| language | English |
| lccn | 2010286005 |
| oai_aleph_id | oai:aleph.bib-bvb.de:BVB01-020497379 |
| oclc_num | 705680346 |
| open_access_boolean | |
| owner | DE-83 DE-355 DE-BY-UBR DE-703 DE-11 DE-91G DE-BY-TUM |
| owner_facet | DE-83 DE-355 DE-BY-UBR DE-703 DE-11 DE-91G DE-BY-TUM |
| physical | XVIII, 708 S. |
| publishDate | 2009 |
| publishDateSearch | 2009 |
| publishDateSort | 2009 |
| publisher | Cambridge Univ. Press |
| record_format | marc |
| series | Encyclopedia of mathematics and its applications |
| series2 | Encyclopedia of mathematics and its applications |
| spellingShingle | Ismail, Mourad E. H. 1944- Classical and quantum orthogonal polynomials in one variable Encyclopedia of mathematics and its applications Orthogonale Polynome (DE-588)4172863-4 gnd |
| subject_GND | (DE-588)4172863-4 |
| title | Classical and quantum orthogonal polynomials in one variable |
| title_auth | Classical and quantum orthogonal polynomials in one variable |
| title_exact_search | Classical and quantum orthogonal polynomials in one variable |
| title_full | Classical and quantum orthogonal polynomials in one variable Mourad E.H. Ismail ; with two chapters by Walter Van Assche |
| title_fullStr | Classical and quantum orthogonal polynomials in one variable Mourad E.H. Ismail ; with two chapters by Walter Van Assche |
| title_full_unstemmed | Classical and quantum orthogonal polynomials in one variable Mourad E.H. Ismail ; with two chapters by Walter Van Assche |
| title_short | Classical and quantum orthogonal polynomials in one variable |
| title_sort | classical and quantum orthogonal polynomials in one variable |
| topic | Orthogonale Polynome (DE-588)4172863-4 gnd |
| topic_facet | Orthogonale Polynome |
| url | http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=020497379&sequence=000003&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=020497379&sequence=000004&line_number=0002&func_code=DB_RECORDS&service_type=MEDIA |
| volume_link | (DE-604)BV000903719 |
| work_keys_str_mv | AT ismailmouradeh classicalandquantumorthogonalpolynomialsinonevariable AT vanasschewalter classicalandquantumorthogonalpolynomialsinonevariable |
Inhaltsverzeichnis
Paper/Kapitel scannen lassen
Paper/Kapitel scannen lassen
Teilbibliothek Mathematik & Informatik
| Signatur: |
0102 MAT 338f 2017 A 2849 Lageplan |
|---|---|
| Exemplar 1 | Ausleihbar Am Standort |