Difference between revisions of "Jacobi P"
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− | The Jacobi polynomial $P_n^{(\alpha,\beta)}$ are [[orthogonal polynomials]] | + | Let $\alpha > -1$ and $\beta > -1$. The Jacobi polynomial $P_n^{(\alpha,\beta)}$ are [[orthogonal polynomials]] with [[weight function]] $w(x)=(1-x)^{\alpha}(1-x)^{\beta}$ on the interval $[-1,1]$ that obey $P_n^{(\alpha,\beta)}(1) = {{n + \alpha} \choose n}$. |
− | + | $$P_n^{(\alpha,\beta)}(z)=\dfrac{(\alpha+1)^{\overline{n}}}{n!} {}_2F_1 \left(-n, 1+\alpha+\beta+n;\alpha+1; \dfrac{1}{2}(1-z) \right),$$ | |
− | + | where ${}_2F_1$ is the [[Hypergeometric pFq|generalized hypergeometries series]]. | |
− | + | ||
− | + | =Properties= | |
+ | [[Relationship between the Gegenbauer C polynomials and the Jacobi P polynomials]]<br /> | ||
+ | [[Differential equation for Jacobi P]]<br /> | ||
+ | |||
+ | =References= | ||
+ | * {{BookReference|Orthogonal Polynomials|1975|Gabor Szegő|edpage = Fourth Edition|prev=findme|next=findme}}: page 58 | ||
+ | |||
+ | {{:Orthogonal polynomials footer}} | ||
+ | |||
+ | [[Category:SpecialFunction]] |
Latest revision as of 03:30, 11 June 2016
Let $\alpha > -1$ and $\beta > -1$. The Jacobi polynomial $P_n^{(\alpha,\beta)}$ are orthogonal polynomials with weight function $w(x)=(1-x)^{\alpha}(1-x)^{\beta}$ on the interval $[-1,1]$ that obey $P_n^{(\alpha,\beta)}(1) = {{n + \alpha} \choose n}$. $$P_n^{(\alpha,\beta)}(z)=\dfrac{(\alpha+1)^{\overline{n}}}{n!} {}_2F_1 \left(-n, 1+\alpha+\beta+n;\alpha+1; \dfrac{1}{2}(1-z) \right),$$ where ${}_2F_1$ is the generalized hypergeometries series.
Properties
Relationship between the Gegenbauer C polynomials and the Jacobi P polynomials
Differential equation for Jacobi P
References
- 1975: Gabor Szegő: Orthogonal Polynomials ... (previous) ... (next): page 58