Classical real analysis / / Daniel Waterman, editor |
Pubbl/distr/stampa | Providence, Rhode Island : , : American Mathematical Society, , [1985] |
Descrizione fisica | 1 online resource (227 p.) |
Disciplina | 515.8 |
Collana | Contemporary mathematics |
Soggetto topico | Functions of real variables |
Soggetto genere / forma | Electronic books. |
ISBN |
0-8218-7627-9
0-8218-5045-8 |
Formato | Materiale a stampa ![]() |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
""Table of Contents""; ""Introduction""; ""Cesari Spaces and Sobolev Spaces in Surface Area and Localization for Multiple Fourier Series""; ""An Unusual Descriptive Definition of Integral""; ""Path Derivatives: A Unified View of Certain Generalized Derivatives""; ""Baire One, Null Functions""; ""Monotone Approximation on an Interval""; ""Two Remarks on the Measure of Product Sets""; ""Monotonicity, Symmetry, and Smoothness""; ""The Structure of Continuous Functions which Satisfy Lusin's Condition (N)""
""An Extension of Thunsdorff's Integral Inequality to a Class of Monotone Functions""""On Generalized Bounded Variation""; ""On the Level Set Structure of a Continuous Function""; ""Some Properties of the Littlewood-Paley g-Function""; ""Change-of-Variable Invariant Classes of Functions and Convergence of Fourier Series""; ""Schauder Bases for LP[0,l] Derived From Subsystems of the Schauder System"" |
Record Nr. | UNINA-9910480872103321 |
Providence, Rhode Island : , : American Mathematical Society, , [1985] | ||
![]() | ||
Lo trovi qui: Univ. Federico II | ||
|
Classical real analysis / / Daniel Waterman, editor |
Pubbl/distr/stampa | Providence, Rhode Island : , : American Mathematical Society, , [1985] |
Descrizione fisica | 1 online resource (227 p.) |
Disciplina | 515.8 |
Collana | Contemporary mathematics |
Soggetto topico | Functions of real variables |
ISBN |
0-8218-7627-9
0-8218-5045-8 |
Formato | Materiale a stampa ![]() |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto | Table of Contents -- Introduction -- Cesari Spaces and Sobolev Spaces in Surface Area and Localization for Multiple Fourier Series -- An Unusual Descriptive Definition of Integral -- Path Derivatives: A Unified View of Certain Generalized Derivatives -- Baire One, Null Functions -- Monotone Approximation on an Interval -- Two Remarks on the Measure of Product Sets -- Monotonicity, Symmetry, and Smoothness -- The Structure of Continuous Functions which Satisfy Lusin's Condition (N) -- An Extension of Thunsdorff's Integral Inequality to a Class of Monotone Functions -- On Generalized Bounded Variation -- On the Level Set Structure of a Continuous Function -- Some Properties of the Littlewood-Paley g-Function -- Change-of-Variable Invariant Classes of Functions and Convergence of Fourier Series -- Schauder Bases for LP[0,l] Derived From Subsystems of the Schauder System. |
Record Nr. | UNINA-9910788782503321 |
Providence, Rhode Island : , : American Mathematical Society, , [1985] | ||
![]() | ||
Lo trovi qui: Univ. Federico II | ||
|
Classical real analysis / / Daniel Waterman, editor |
Pubbl/distr/stampa | Providence, Rhode Island : , : American Mathematical Society, , [1985] |
Descrizione fisica | 1 online resource (227 p.) |
Disciplina | 515.8 |
Collana | Contemporary mathematics |
Soggetto topico | Functions of real variables |
ISBN |
0-8218-7627-9
0-8218-5045-8 |
Formato | Materiale a stampa ![]() |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto | Table of Contents -- Introduction -- Cesari Spaces and Sobolev Spaces in Surface Area and Localization for Multiple Fourier Series -- An Unusual Descriptive Definition of Integral -- Path Derivatives: A Unified View of Certain Generalized Derivatives -- Baire One, Null Functions -- Monotone Approximation on an Interval -- Two Remarks on the Measure of Product Sets -- Monotonicity, Symmetry, and Smoothness -- The Structure of Continuous Functions which Satisfy Lusin's Condition (N) -- An Extension of Thunsdorff's Integral Inequality to a Class of Monotone Functions -- On Generalized Bounded Variation -- On the Level Set Structure of a Continuous Function -- Some Properties of the Littlewood-Paley g-Function -- Change-of-Variable Invariant Classes of Functions and Convergence of Fourier Series -- Schauder Bases for LP[0,l] Derived From Subsystems of the Schauder System. |
Record Nr. | UNINA-9910812565503321 |
Providence, Rhode Island : , : American Mathematical Society, , [1985] | ||
![]() | ||
Lo trovi qui: Univ. Federico II | ||
|
Homeomorphisms in analysis / / Casper Goffman, Togo Nishiura, Daniel Waterman |
Autore | Goffman Casper <1913-> |
Pubbl/distr/stampa | Providence, Rhode Island : , : American Mathematical Society, , [1997] |
Descrizione fisica | 1 online resource (235 p.) |
Disciplina | 515/.13 |
Collana | Mathematical surveys and monographs |
Soggetto topico |
Homeomorphisms
Mathematical analysis |
Formato | Materiale a stampa ![]() |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
""Contents""; ""Preface""; ""The one dimensional case""; ""Mappings and measures on R[sup(n)]""; ""Fourier series""; ""Part 1. The One Dimensional Case""; ""Chapter 1. Subsets of R""; ""1.1. Equivalence classes""; ""1.2. Lebesgue equivalence of sets""; ""1.3. Density topology""; ""1.4. The Zahorski classes""; ""Chapter 2. Baire Class 1""; ""2.1. Characterization""; ""2.2. Absolutely measurable functions""; ""2.3. Example""; ""Chapter 3. Differentiability Classes""; ""3.1. Continuous functions of bounded variation""; ""3.2. Continuously differentiable functions""
""3.3. The class C[sup(n)][0,1]""""3.4. Remarks""; ""Chapter 4. The Derivative Function""; ""4.1. Properties of derivatives""; ""4.2. Characterization of the derivative""; ""4.3. Proof of Maximoff's theorem""; ""4.4. Approximate derivatives""; ""4.5. Remarks""; ""Part 2. Mappings and Measures on R[sup(n)]""; ""Chapter 5. Bi-Lipschitzian Homeomorphisms""; ""5.1. Lebesgue measurability""; ""5.2. Length of nonparametric curves""; ""5.3. Nonparametric area""; ""5.4. Invariance under self-homeomorphisms""; ""5.5. Invariance of approximately continuous functions""; ""5.6. Remarks"" ""Chapter 6. Approximation by Homeomorphisms""""6.1. Background""; ""6.2. Approximations by homeomorphisms of one-to-one maps""; ""6.3. Extensions of homeomorphisms""; ""6.4. Measurable one-to-one maps""; ""Chapter 7. Measures on R[sup(n)]""; ""7.1. Preliminaries""; ""7.2. The one variable case""; ""7.3. Constructions of deformations""; ""7.4. Deformation theorem""; ""7.5. Remarks""; ""Chapter 8. Blumberg's Theorem""; ""8.1. Blumberg's theorem for metric spaces""; ""8.2. Non-Blumberg Baire spaces""; ""8.3. Homeomorphism analogues""; ""Part 3. Fourier Series"" ""Chapter 9. Improving the Behavior of Fourier Series""""9.1. Preliminaries""; ""9.2. Uniform convergence""; ""9.3. Conjugate functions and the Pál-Bohr theorem""; ""9.4. Absolute convergence""; ""Chapter 10. Preservation of Convergence of Fourier Series""; ""10.1. Tests for pointwise and uniform convergence""; ""10.2. Fourier series of regulated functions""; ""10.3. Uniform convergence of Fourier series""; ""Chapter 11. Fourier Series of Integrable Functions""; ""11.1. Absolutely measurable functions""; ""11.2. Convergence of Fourier series after change of variable"" ""11.3. Functions of generalized bounded variation""""11.4. Preservation of the order of magnitude of Fourier coefficients""; ""Appendix A. Supplementary Material""; ""Sets, Functions and Measures""; ""A.1. Baire, Borel and Lebesgue""; ""A.2. Lipschitzian functions""; ""A.3. Bounded variation""; ""Approximate Continuity""; ""A.4. Density topology""; ""A.5. Approximately continuous maps into metric spaces""; ""Hausdorff Measure and Packing""; ""A.6. Hausdorff dimension""; ""A.7. Hausdorff packing""; ""Nonparametric Length and Area""; ""A.8. Nonparametric length""; ""A.9. Schwarz's example"" ""A.10. Lebesgue's lower semicontinuous area"" |
Record Nr. | UNINA-9910146559703321 |
Goffman Casper <1913->
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Providence, Rhode Island : , : American Mathematical Society, , [1997] | ||
![]() | ||
Lo trovi qui: Univ. Federico II | ||
|
Homeomorphisms in analysis / / Casper Goffman, Togo Nishiura, Daniel Waterman |
Autore | Goffman Casper <1913-> |
Pubbl/distr/stampa | Providence, Rhode Island : , : American Mathematical Society, , [1997] |
Descrizione fisica | 1 online resource (235 p.) |
Disciplina | 515/.13 |
Collana | Mathematical surveys and monographs |
Soggetto topico |
Homeomorphisms
Mathematical analysis |
Formato | Materiale a stampa ![]() |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
""Contents""; ""Preface""; ""The one dimensional case""; ""Mappings and measures on R[sup(n)]""; ""Fourier series""; ""Part 1. The One Dimensional Case""; ""Chapter 1. Subsets of R""; ""1.1. Equivalence classes""; ""1.2. Lebesgue equivalence of sets""; ""1.3. Density topology""; ""1.4. The Zahorski classes""; ""Chapter 2. Baire Class 1""; ""2.1. Characterization""; ""2.2. Absolutely measurable functions""; ""2.3. Example""; ""Chapter 3. Differentiability Classes""; ""3.1. Continuous functions of bounded variation""; ""3.2. Continuously differentiable functions""
""3.3. The class C[sup(n)][0,1]""""3.4. Remarks""; ""Chapter 4. The Derivative Function""; ""4.1. Properties of derivatives""; ""4.2. Characterization of the derivative""; ""4.3. Proof of Maximoff's theorem""; ""4.4. Approximate derivatives""; ""4.5. Remarks""; ""Part 2. Mappings and Measures on R[sup(n)]""; ""Chapter 5. Bi-Lipschitzian Homeomorphisms""; ""5.1. Lebesgue measurability""; ""5.2. Length of nonparametric curves""; ""5.3. Nonparametric area""; ""5.4. Invariance under self-homeomorphisms""; ""5.5. Invariance of approximately continuous functions""; ""5.6. Remarks"" ""Chapter 6. Approximation by Homeomorphisms""""6.1. Background""; ""6.2. Approximations by homeomorphisms of one-to-one maps""; ""6.3. Extensions of homeomorphisms""; ""6.4. Measurable one-to-one maps""; ""Chapter 7. Measures on R[sup(n)]""; ""7.1. Preliminaries""; ""7.2. The one variable case""; ""7.3. Constructions of deformations""; ""7.4. Deformation theorem""; ""7.5. Remarks""; ""Chapter 8. Blumberg's Theorem""; ""8.1. Blumberg's theorem for metric spaces""; ""8.2. Non-Blumberg Baire spaces""; ""8.3. Homeomorphism analogues""; ""Part 3. Fourier Series"" ""Chapter 9. Improving the Behavior of Fourier Series""""9.1. Preliminaries""; ""9.2. Uniform convergence""; ""9.3. Conjugate functions and the Pál-Bohr theorem""; ""9.4. Absolute convergence""; ""Chapter 10. Preservation of Convergence of Fourier Series""; ""10.1. Tests for pointwise and uniform convergence""; ""10.2. Fourier series of regulated functions""; ""10.3. Uniform convergence of Fourier series""; ""Chapter 11. Fourier Series of Integrable Functions""; ""11.1. Absolutely measurable functions""; ""11.2. Convergence of Fourier series after change of variable"" ""11.3. Functions of generalized bounded variation""""11.4. Preservation of the order of magnitude of Fourier coefficients""; ""Appendix A. Supplementary Material""; ""Sets, Functions and Measures""; ""A.1. Baire, Borel and Lebesgue""; ""A.2. Lipschitzian functions""; ""A.3. Bounded variation""; ""Approximate Continuity""; ""A.4. Density topology""; ""A.5. Approximately continuous maps into metric spaces""; ""Hausdorff Measure and Packing""; ""A.6. Hausdorff dimension""; ""A.7. Hausdorff packing""; ""Nonparametric Length and Area""; ""A.8. Nonparametric length""; ""A.9. Schwarz's example"" ""A.10. Lebesgue's lower semicontinuous area"" |
Record Nr. | UNISA-996320722203316 |
Goffman Casper <1913->
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||
Providence, Rhode Island : , : American Mathematical Society, , [1997] | ||
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Lo trovi qui: Univ. di Salerno | ||
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Topics in classical analysis and applications in honor of Daniel Waterman [[electronic resource] /] / editors, Laura De Carli, Kazaros Kazarian, Mario Milman |
Pubbl/distr/stampa | Hackensack, N.J., : World Scientific, c2008 |
Descrizione fisica | 1 online resource (204 p.) |
Disciplina | 515 |
Altri autori (Persone) |
De CarliLaura <1962->
KazarianKazaros MilmanMario WatermanDaniel |
Soggetto topico |
Mathematical analysis
Functional analysis Fourier series Orthogonal polynomials |
Soggetto genere / forma | Electronic books. |
ISBN | 981-283-444-3 |
Formato | Materiale a stampa ![]() |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Preface; CONTENTS; My Academic Life D. Waterman; REMINISCENCES; RESEARCH; High Indices; Reflexivity and Summability; Harmonic Analysis; Change of Variable; Fourier Series and Generalized Variation; Representation of Functions, Orthogonal Series; Real Analysis; Summability; Survey Papers; PUBLICATIONS; Papers; Books; DOCTORAL STUDENTS; Reminiscences edited by L. Lardy, J. Troutman (with contributions by L. D'Antonio, G. T. Cargo, Ph. T. Church, D. Dezern, G. Gasper, P. Pierce, E. Poletsky, M. Schramm, F. Prus-Wisniowski, P. Schembari); On Concentrating Idempotents, A Survey J. Marshall Ash
1. From Operators on L2 (Z) to Concentration1.1. Definitions; 1.2. Relating classes of operators; 1.3. A surprising connection; 1.4. Results for L2 Concentration; 1.5. Quantitative results for L2 concentration; 2. A Paper 20 Years in the Making; 2.1. The early years; 2.2. On the virtues of procrastination; 3. The Future; 3.1. A segue; 3.2. The L1 concentration question; 3.3. A conjecture about operators; References; Variants of a Selection Principle for Sequences of Regulated and Non-Regulated Functions V. V. Chistyakov, C. Maniscalco, Y. V. Tretyachenko 1. Regulated Functions and Selection Principles2. Main Results; 3. Properties of N(ε, f, T) for Metric Space Valued Functions; 4. Functions with Values in a Metric Space: Proofs; 5. Functions with Values in a Metric Semigroup; 6. Functions with Values in a Re.exive Separable Banach Space; Acknowledgments; References; Local Lp Inequalities for Gegenbauer Polynomials L. De Carli; 1. Introduction; 2. Preliminaries; 2.1. Four useful Lemmas; 3. Most of the Proofs; References; General Monotone Sequences and Convergence of Trigonometric Series M. Dyachenko, S. Tikhonov; 1. Introduction 2. Uniform and Lp-Convergence3. Convergence Almost Everywhere: One-Dimensional Series; 4. Convergence Almost Everywhere: Multiple Series; 5. Concluding Remarks; Acknowledgments; References; Using Integrals of Squares of Certain Real-Valued Special Functionsto Prove that the P ́olya Ξ(z) Function, the Functions Kiz(a), a > 0,and Some Other Entire Functions Having Only Real ZerosG. Gasper; 1. Introduction; 2. Reality of the Zeros of the Functions Kiz(a) When a > 0; 3. Reality of the Zeros of the Functions Ξ(z) and Fa,c(z); Acknowledgment; References Functions Whose Moments Form a Geometric Progression M. E. H. Ismail, X. Li1. Introduction; 2. Proofs; References; Characterization of Scaling Functions in a Frame MultiresolutionAnalysis in H2GK. S. Kazarian, A. San Antol ́ın; 1. Introduction; 2. Spaces H2G; 2.1. A-invariant sets; 3. Characterization of Scaling Functions of an FMRA in H2G; 3.1. Definitions and Preliminary results; 3.2. Characterization of scaling functions of an H2G -FMRA and other cases; 4. On the Existence of H2G -MRA and H2G -FMRA; References; An Abstract Coifman-Rochberg-Weiss Commutator Theorem J. Martin, M. Milman 1. Introduction |
Record Nr. | UNINA-9910454838303321 |
Hackensack, N.J., : World Scientific, c2008 | ||
![]() | ||
Lo trovi qui: Univ. Federico II | ||
|
Topics in classical analysis and applications in honor of Daniel Waterman [[electronic resource] /] / editors, Laura De Carli, Kazaros Kazarian, Mario Milman |
Pubbl/distr/stampa | Hackensack, N.J., : World Scientific, c2008 |
Descrizione fisica | 1 online resource (204 p.) |
Disciplina | 515 |
Altri autori (Persone) |
De CarliLaura <1962->
KazarianKazaros MilmanMario WatermanDaniel |
Soggetto topico |
Mathematical analysis
Functional analysis Fourier series Orthogonal polynomials |
ISBN | 981-283-444-3 |
Formato | Materiale a stampa ![]() |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Preface; CONTENTS; My Academic Life D. Waterman; REMINISCENCES; RESEARCH; High Indices; Reflexivity and Summability; Harmonic Analysis; Change of Variable; Fourier Series and Generalized Variation; Representation of Functions, Orthogonal Series; Real Analysis; Summability; Survey Papers; PUBLICATIONS; Papers; Books; DOCTORAL STUDENTS; Reminiscences edited by L. Lardy, J. Troutman (with contributions by L. D'Antonio, G. T. Cargo, Ph. T. Church, D. Dezern, G. Gasper, P. Pierce, E. Poletsky, M. Schramm, F. Prus-Wisniowski, P. Schembari); On Concentrating Idempotents, A Survey J. Marshall Ash
1. From Operators on L2 (Z) to Concentration1.1. Definitions; 1.2. Relating classes of operators; 1.3. A surprising connection; 1.4. Results for L2 Concentration; 1.5. Quantitative results for L2 concentration; 2. A Paper 20 Years in the Making; 2.1. The early years; 2.2. On the virtues of procrastination; 3. The Future; 3.1. A segue; 3.2. The L1 concentration question; 3.3. A conjecture about operators; References; Variants of a Selection Principle for Sequences of Regulated and Non-Regulated Functions V. V. Chistyakov, C. Maniscalco, Y. V. Tretyachenko 1. Regulated Functions and Selection Principles2. Main Results; 3. Properties of N(ε, f, T) for Metric Space Valued Functions; 4. Functions with Values in a Metric Space: Proofs; 5. Functions with Values in a Metric Semigroup; 6. Functions with Values in a Re.exive Separable Banach Space; Acknowledgments; References; Local Lp Inequalities for Gegenbauer Polynomials L. De Carli; 1. Introduction; 2. Preliminaries; 2.1. Four useful Lemmas; 3. Most of the Proofs; References; General Monotone Sequences and Convergence of Trigonometric Series M. Dyachenko, S. Tikhonov; 1. Introduction 2. Uniform and Lp-Convergence3. Convergence Almost Everywhere: One-Dimensional Series; 4. Convergence Almost Everywhere: Multiple Series; 5. Concluding Remarks; Acknowledgments; References; Using Integrals of Squares of Certain Real-Valued Special Functionsto Prove that the P ́olya Ξ(z) Function, the Functions Kiz(a), a > 0,and Some Other Entire Functions Having Only Real ZerosG. Gasper; 1. Introduction; 2. Reality of the Zeros of the Functions Kiz(a) When a > 0; 3. Reality of the Zeros of the Functions Ξ(z) and Fa,c(z); Acknowledgment; References Functions Whose Moments Form a Geometric Progression M. E. H. Ismail, X. Li1. Introduction; 2. Proofs; References; Characterization of Scaling Functions in a Frame MultiresolutionAnalysis in H2GK. S. Kazarian, A. San Antol ́ın; 1. Introduction; 2. Spaces H2G; 2.1. A-invariant sets; 3. Characterization of Scaling Functions of an FMRA in H2G; 3.1. Definitions and Preliminary results; 3.2. Characterization of scaling functions of an H2G -FMRA and other cases; 4. On the Existence of H2G -MRA and H2G -FMRA; References; An Abstract Coifman-Rochberg-Weiss Commutator Theorem J. Martin, M. Milman 1. Introduction |
Record Nr. | UNINA-9910777952303321 |
Hackensack, N.J., : World Scientific, c2008 | ||
![]() | ||
Lo trovi qui: Univ. Federico II | ||
|
Topics in classical analysis and applications in honor of Daniel Waterman [[electronic resource] /] / editors, Laura De Carli, Kazaros Kazarian, Mario Milman |
Pubbl/distr/stampa | Hackensack, N.J., : World Scientific, c2008 |
Descrizione fisica | 1 online resource (204 p.) |
Disciplina | 515 |
Altri autori (Persone) |
De CarliLaura <1962->
KazarianKazaros MilmanMario WatermanDaniel |
Soggetto topico |
Mathematical analysis
Functional analysis Fourier series Orthogonal polynomials |
ISBN | 981-283-444-3 |
Formato | Materiale a stampa ![]() |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Preface; CONTENTS; My Academic Life D. Waterman; REMINISCENCES; RESEARCH; High Indices; Reflexivity and Summability; Harmonic Analysis; Change of Variable; Fourier Series and Generalized Variation; Representation of Functions, Orthogonal Series; Real Analysis; Summability; Survey Papers; PUBLICATIONS; Papers; Books; DOCTORAL STUDENTS; Reminiscences edited by L. Lardy, J. Troutman (with contributions by L. D'Antonio, G. T. Cargo, Ph. T. Church, D. Dezern, G. Gasper, P. Pierce, E. Poletsky, M. Schramm, F. Prus-Wisniowski, P. Schembari); On Concentrating Idempotents, A Survey J. Marshall Ash
1. From Operators on L2 (Z) to Concentration1.1. Definitions; 1.2. Relating classes of operators; 1.3. A surprising connection; 1.4. Results for L2 Concentration; 1.5. Quantitative results for L2 concentration; 2. A Paper 20 Years in the Making; 2.1. The early years; 2.2. On the virtues of procrastination; 3. The Future; 3.1. A segue; 3.2. The L1 concentration question; 3.3. A conjecture about operators; References; Variants of a Selection Principle for Sequences of Regulated and Non-Regulated Functions V. V. Chistyakov, C. Maniscalco, Y. V. Tretyachenko 1. Regulated Functions and Selection Principles2. Main Results; 3. Properties of N(ε, f, T) for Metric Space Valued Functions; 4. Functions with Values in a Metric Space: Proofs; 5. Functions with Values in a Metric Semigroup; 6. Functions with Values in a Re.exive Separable Banach Space; Acknowledgments; References; Local Lp Inequalities for Gegenbauer Polynomials L. De Carli; 1. Introduction; 2. Preliminaries; 2.1. Four useful Lemmas; 3. Most of the Proofs; References; General Monotone Sequences and Convergence of Trigonometric Series M. Dyachenko, S. Tikhonov; 1. Introduction 2. Uniform and Lp-Convergence3. Convergence Almost Everywhere: One-Dimensional Series; 4. Convergence Almost Everywhere: Multiple Series; 5. Concluding Remarks; Acknowledgments; References; Using Integrals of Squares of Certain Real-Valued Special Functionsto Prove that the P ́olya Ξ(z) Function, the Functions Kiz(a), a > 0,and Some Other Entire Functions Having Only Real ZerosG. Gasper; 1. Introduction; 2. Reality of the Zeros of the Functions Kiz(a) When a > 0; 3. Reality of the Zeros of the Functions Ξ(z) and Fa,c(z); Acknowledgment; References Functions Whose Moments Form a Geometric Progression M. E. H. Ismail, X. Li1. Introduction; 2. Proofs; References; Characterization of Scaling Functions in a Frame MultiresolutionAnalysis in H2GK. S. Kazarian, A. San Antol ́ın; 1. Introduction; 2. Spaces H2G; 2.1. A-invariant sets; 3. Characterization of Scaling Functions of an FMRA in H2G; 3.1. Definitions and Preliminary results; 3.2. Characterization of scaling functions of an H2G -FMRA and other cases; 4. On the Existence of H2G -MRA and H2G -FMRA; References; An Abstract Coifman-Rochberg-Weiss Commutator Theorem J. Martin, M. Milman 1. Introduction |
Record Nr. | UNINA-9910822686703321 |
Hackensack, N.J., : World Scientific, c2008 | ||
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Lo trovi qui: Univ. Federico II | ||
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