Some Convolution Formulae Related to the Second-Order Linear Recurrence Sequence

Some Convolution Formulae Related to the Second-Order Linear Recurrence Sequence

The main aim of this paper is that for any second-order linear recurrence sequence, the generating function of which is f ( t ) = 1 1 + a t + b t 2 , we can give the exact coefficient expression of the power series expansion of f x ( t ) for x ∈ R with elementary methods and symmetry properties. On...

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Veröffentlicht in:Symmetry (Basel) 2019-06, Vol.11 (6), p.788
Hauptverfasser: Chen, Zhuoyu, Qi, Lan
Format: Artikel
Sprache:eng
Schlagworte:
Chebyshev approximation
Chebyshev polynomials
Convolution
convolution formula
Fibonacci numbers
Gegenbauer polynomials
Jacobi polynomials
Legendre polynomials
Lucas numbers
Numbers
Polynomials
Power series
Series expansion
Theorems
Thermal expansion
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Zusammenfassung:The main aim of this paper is that for any second-order linear recurrence sequence, the generating function of which is f ( t ) = 1 1 + a t + b t 2 , we can give the exact coefficient expression of the power series expansion of f x ( t ) for x ∈ R with elementary methods and symmetry properties. On the other hand, if we take some special values for a and b, not only can we obtain the convolution formula of some important polynomials, but also we can establish the relationship between polynomials and themselves. For example, we can find relationship between the Chebyshev polynomials and Legendre polynomials.
ISSN:2073-8994
2073-8994
DOI:10.3390/sym11060788