Difference between revisions of "Bateman F"

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[[Generating relation for Bateman F]]<br />
 
[[Generating relation for Bateman F]]<br />
 
[[Three-term recurrence for Bateman F]]<br />
 
[[Three-term recurrence for Bateman F]]<br />
 +
[[Orthogonality of Bateman F on R]]<br />
  
 
=References=
 
=References=

Revision as of 11:48, 10 October 2019

The Bateman polynomials $F_n$ are defined for $n=0,1,2,\ldots$ by the formula $$F_n(z) = {}_3F_2 \left( -n, n+1, \dfrac{z+1}{2}; 1,1;1 \right),$$ where ${}_3F_2$ denotes the generalized hypergeometric function. The first few Bateman polynomials are $$\begin{array}{l|l} n & F_n(z) \\ \hline 0 & 1 \\ 1 & -z \\ 2 & \dfrac{3}{4}z^2+\dfrac{1}{4} \\ 3 & -\dfrac{5}{12}z^3-\dfrac{7}{12}z^2 \\ 4 & \dfrac{35}{192}z^4 + \dfrac{65}{96}z^2+\dfrac{9}{64} \\ 5 & -\dfrac{21}{320}z^5 - \dfrac{49}{96}z^3 - \dfrac{407}{960}z \\ \vdots & \vdots \end{array}$$

Properties

Generating relation for Bateman F
Three-term recurrence for Bateman F
Orthogonality of Bateman F on R

References

Orthogonal polynomials
Associatedlaguerrelthumb.png
Laguerre $L_n^{(\alpha)}$
Batemanpolynomialthumb.png
Bateman $F_n$
Bernoullibthumb.png
Bernoulli $B$
Besselpolynomialsthumb.png
Bessel poly
Chebyshevtthumb.png
Chebyshev T
Chebyshevuthumb.png
Chebyshev U
Dicksonthumb.png
Dickson
Eulerethumb.png
Euler $E$
Gegenbauercthumb.png
Gegenbauer $C$
Hermitephysthumb.png
Hermite (phys)
Hermiteprobthumb.png
Hermite (prob)
Jacobipthumb.png
Jacobi $P^{(\alpha,\beta)}$
Laguerrelthumb.png
Laguerre $L$
Legendrepthumb.png
Legendre $P$
Bernoullibthumb.png
Bernoulli $B$
Chebyshevtthumb.png
Chebyshev $T$
Fibonaccithumb.png
Fibonacci
Lucasthumb.png
Lucas
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