5. Examples
-
Francesco Aldo Costabile
Abstract
In this chapter, we will discuss some important examples of b. p. s. without any pretence of doing a complete treatise on b. p. s. We will follow this order: 1. Numerical sequences: b := (bn)n∈ℕ and b̂:= (̂b̂n)n∈ℕ; 2. Exponential Riordan matrices associated: P and ̂P; 3. Polynomial sequences {pn}n and {̂pn}n; 4. Generating function, binomial identity, recurrence and differential equations, determinantal forms; 5. δ-functional and δ-operator associated, functional equation; 6. Applications to interpolation and approximation. Naturally the binomial identity, the functional equation, et cetera, will be repeated only if they are explicit or significant.
Abstract
In this chapter, we will discuss some important examples of b. p. s. without any pretence of doing a complete treatise on b. p. s. We will follow this order: 1. Numerical sequences: b := (bn)n∈ℕ and b̂:= (̂b̂n)n∈ℕ; 2. Exponential Riordan matrices associated: P and ̂P; 3. Polynomial sequences {pn}n and {̂pn}n; 4. Generating function, binomial identity, recurrence and differential equations, determinantal forms; 5. δ-functional and δ-operator associated, functional equation; 6. Applications to interpolation and approximation. Naturally the binomial identity, the functional equation, et cetera, will be repeated only if they are explicit or significant.
Kapitel in diesem Buch
- Frontmatter I
- Preface VII
- Acknowledgment IX
- Contents XI
- Acronyms XV
-
Part I: Introduction
- 1. Preliminaries and notations 3
- 2. Particular matrices and their connections with formal power series 7
-
Part II: Polynomial sequences of binomial type
- 3. Binomial polynomial sequences 23
- 4. Applications to linear interpolation and operators approximation theory 41
- 5. Examples 47
-
Part III: Appell polynomial sequences
- 6. Appell polynomial sequences 77
- 7. Application to linear interpolation and approximation theory 101
- 8. Examples 107
-
Part IV: Sheffer polynomial sequences
- 9. Sheffer polynomial sequence 149
- 10. Applications to linear interpolation and operators approximation theory 167
- 11. Examples 175
-
Part V: Lidstone polynomial sequences
- 12. Lidstone-type polynomial sequences 203
- 13. Application to linear interpolation and operators approximation theory 217
- 14. Examples 223
- Bibliography 245
- Index 255
Kapitel in diesem Buch
- Frontmatter I
- Preface VII
- Acknowledgment IX
- Contents XI
- Acronyms XV
-
Part I: Introduction
- 1. Preliminaries and notations 3
- 2. Particular matrices and their connections with formal power series 7
-
Part II: Polynomial sequences of binomial type
- 3. Binomial polynomial sequences 23
- 4. Applications to linear interpolation and operators approximation theory 41
- 5. Examples 47
-
Part III: Appell polynomial sequences
- 6. Appell polynomial sequences 77
- 7. Application to linear interpolation and approximation theory 101
- 8. Examples 107
-
Part IV: Sheffer polynomial sequences
- 9. Sheffer polynomial sequence 149
- 10. Applications to linear interpolation and operators approximation theory 167
- 11. Examples 175
-
Part V: Lidstone polynomial sequences
- 12. Lidstone-type polynomial sequences 203
- 13. Application to linear interpolation and operators approximation theory 217
- 14. Examples 223
- Bibliography 245
- Index 255
