雙重哈恩多項式 (Dual Hahn polynomials)是一個正交多項式,定義如下[ 1]
Dual Hahn polynomials plot
Dual Hahn polynomials plot
R
n
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λ
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x
)
;
γ
,
δ
,
N
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=
3
F
2
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−
n
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−
x
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x
+
γ
+
δ
+
1
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γ
+
1
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−
N
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1
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.
{\displaystyle R_{n}(\lambda (x);\gamma ,\delta ,N)={}_{3}F_{2}(-n,-x,x+\gamma +\delta +1;\gamma +1,-N;1).}
其中0≤n ≤N
雙重哈恩多項式的前幾個:
正交性
雙重哈恩多項式滿足下列正交關係:[ 2]
∑
x
=
0
N
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2
x
+
γ
+
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+
1
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γ
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1
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x
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x
N
!
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−
1
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x
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+
γ
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N
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1
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x
x
!
{\displaystyle \sum _{x=0}^{N}{\frac {(2x+\gamma +\delta +1)(\gamma +1)_{x}(-N)_{x}N!}{(-1)^{x}(x+\gamma +\delta +1)_{N+1}(\delta +1)_{x}x!}}}
*
R
m
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λ
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x
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;
γ
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δ
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N
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R
n
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λ
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=
δ
m
n
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γ
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n
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−
n
N
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n
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{\displaystyle R_{m}(\lambda (x);\gamma ,\delta ,N)R_{n}(\lambda (x);\gamma ,\delta ,N)={\frac {\delta _{mn}}{{\gamma +n \choose n}{\delta +N-n \choose N-n}}}}
極限關係
拉卡多項式 →雙重哈恩多項式
lim
β
→
∞
R
n
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λ
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x
)
;
−
N
−
1
,
β
,
γ
,
δ
)
=
R
n
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λ
(
lim
β
→
∞
R
n
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λ
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x
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;
−
x
)
;
γ
,
δ
,
N
)
{\displaystyle \lim _{\beta \to \infty }R_{n}(\lambda (x);-N-1,\beta ,\gamma ,\delta )=R_{n}(\lambda (\lim _{\beta \to \infty }R_{n}(\lambda (x);-x);\gamma ,\delta ,N)}
雙重哈恩多項式 →梅西納多項式
lim
N
→
∞
R
n
(
λ
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x
)
;
β
−
1
,
N
(
1
−
c
)
c
−
1
,
N
)
=
M
n
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x
;
β
,
c
)
{\displaystyle \lim _{N\to \infty }R_{n}(\lambda (x);\beta -1,N(1-c)c^{-1},N)=M_{n}(x;\beta ,c)}
參考文獻
^ Koekoek, Roelof; Lesky, Peter A.; Swarttouw, René F. (2010), Hypergeometric orthogonal polynomials and their q-analogues, Springer Monographs in Mathematics, Berlin, New York
^ KoeKoef p209