From Wikipedia, the free encyclopedia
Elliptic analog of hypergeometric series
In mathematics, an elliptic hypergeometric series is a series Σc n c n c n −1elliptic function of n , analogous to
generalized hypergeometric series where the ratio is a
rational function of n , and
basic hypergeometric series where the ratio is a periodic function of the
complex number n . They were introduced by Date-Jimbo-Kuniba-Miwa-Okado (1987) and
Frenkel & Turaev (1997) in their study of elliptic
6-j symbols .
For surveys of elliptic hypergeometric series see
Gasper & Rahman (2004) ,
Spiridonov (2008) or
Rosengren (2016) .
Definitions The
q-Pochhammer symbol is defined by
(
a
;
q
)
n
=
∏
k
=
0
n
−
1
(
1
−
a
q
k
)
=
(
1
−
a
)
(
1
−
a
q
)
(
1
−
a
q
2
)
⋯
(
1
−
a
q
n
−
1
)
.
{\displaystyle \displaystyle (a;q)_{n}=\prod _{k=0}^{n-1}(1-aq^{k})=(1-a)(1-aq)(1-aq^{2})\cdots (1-aq^{n-1}).}
(
a
1
,
a
2
,
…
,
a
m
;
q
)
n
=
(
a
1
;
q
)
n
(
a
2
;
q
)
n
…
(
a
m
;
q
)
n
.
{\displaystyle \displaystyle (a_{1},a_{2},\ldots ,a_{m};q)_{n}=(a_{1};q)_{n}(a_{2};q)_{n}\ldots (a_{m};q)_{n}.}
The modified Jacobi theta function with argument x and
nome p is defined by
θ
(
x
;
p
)
=
(
x
,
p
/
x
;
p
)
∞
{\displaystyle \displaystyle \theta (x;p)=(x,p/x;p)_{\infty }}
θ
(
x
1
,
.
.
.
,
x
m
;
p
)
=
θ
(
x
1
;
p
)
.
.
.
θ
(
x
m
;
p
)
{\displaystyle \displaystyle \theta (x_{1},...,x_{m};p)=\theta (x_{1};p)...\theta (x_{m};p)}
The elliptic shifted factorial is defined by
(
a
;
q
,
p
)
n
=
θ
(
a
;
p
)
θ
(
a
q
;
p
)
.
.
.
θ
(
a
q
n
−
1
;
p
)
{\displaystyle \displaystyle (a;q,p)_{n}=\theta (a;p)\theta (aq;p)...\theta (aq^{n-1};p)}
(
a
1
,
.
.
.
,
a
m
;
q
,
p
)
n
=
(
a
1
;
q
,
p
)
n
⋯
(
a
m
;
q
,
p
)
n
{\displaystyle \displaystyle (a_{1},...,a_{m};q,p)_{n}=(a_{1};q,p)_{n}\cdots (a_{m};q,p)_{n}}
The theta hypergeometric series r +1E r
r
+
1
E
r
(
a
1
,
.
.
.
a
r
+
1
;
b
1
,
.
.
.
,
b
r
;
q
,
p
;
z
)
=
∑
n
=
0
∞
(
a
1
,
.
.
.
,
a
r
+
1
;
q
;
p
)
n
(
q
,
b
1
,
.
.
.
,
b
r
;
q
,
p
)
n
z
n
{\displaystyle \displaystyle {}_{r+1}E_{r}(a_{1},...a_{r+1};b_{1},...,b_{r};q,p;z)=\sum _{n=0}^{\infty }{\frac {(a_{1},...,a_{r+1};q;p)_{n}}{(q,b_{1},...,b_{r};q,p)_{n}}}z^{n}}
The very well poised theta hypergeometric series r +1V r
r
+
1
V
r
(
a
1
;
a
6
,
a
7
,
.
.
.
a
r
+
1
;
q
,
p
;
z
)
=
∑
n
=
0
∞
θ
(
a
1
q
2
n
;
p
)
θ
(
a
1
;
p
)
(
a
1
,
a
6
,
a
7
,
.
.
.
,
a
r
+
1
;
q
;
p
)
n
(
q
,
a
1
q
/
a
6
,
a
1
q
/
a
7
,
.
.
.
,
a
1
q
/
a
r
+
1
;
q
,
p
)
n
(
q
z
)
n
{\displaystyle \displaystyle {}_{r+1}V_{r}(a_{1};a_{6},a_{7},...a_{r+1};q,p;z)=\sum _{n=0}^{\infty }{\frac {\theta (a_{1}q^{2n};p)}{\theta (a_{1};p)}}{\frac {(a_{1},a_{6},a_{7},...,a_{r+1};q;p)_{n}}{(q,a_{1}q/a_{6},a_{1}q/a_{7},...,a_{1}q/a_{r+1};q,p)_{n}}}(qz)^{n}}
The bilateral theta hypergeometric series r G r
r
G
r
(
a
1
,
.
.
.
a
r
;
b
1
,
.
.
.
,
b
r
;
q
,
p
;
z
)
=
∑
n
=
−
∞
∞
(
a
1
,
.
.
.
,
a
r
;
q
;
p
)
n
(
b
1
,
.
.
.
,
b
r
;
q
,
p
)
n
z
n
{\displaystyle \displaystyle {}_{r}G_{r}(a_{1},...a_{r};b_{1},...,b_{r};q,p;z)=\sum _{n=-\infty }^{\infty }{\frac {(a_{1},...,a_{r};q;p)_{n}}{(b_{1},...,b_{r};q,p)_{n}}}z^{n}}
Definitions of additive elliptic hypergeometric series The elliptic numbers are defined by
a
;
σ
,
τ
=
θ
1
(
π
σ
a
,
e
π
i
τ
)
θ
1
(
π
σ
,
e
π
i
τ
)
{\displaystyle [a;\sigma ,\tau ]={\frac {\theta _{1}(\pi \sigma a,e^{\pi i\tau })}{\theta _{1}(\pi \sigma ,e^{\pi i\tau })}}}
where the
Jacobi theta function is defined by
θ
1
(
x
,
q
)
=
∑
n
=
−
∞
∞
(
−
1
)
n
q
(
n
+
1
/
2
)
2
e
(
2
n
+
1
)
i
x
{\displaystyle \theta _{1}(x,q)=\sum _{n=-\infty }^{\infty }(-1)^{n}q^{(n+1/2)^{2}}e^{(2n+1)ix}}
The additive elliptic shifted factorials are defined by
a
;
σ
,
τ
n
=
a
;
σ
,
τ
a
+
1
;
σ
,
τ
.
.
.
a
+
n
−
1
;
σ
,
τ
{\displaystyle [a;\sigma ,\tau ]_{n}=[a;\sigma ,\tau ][a+1;\sigma ,\tau ]...[a+n-1;\sigma ,\tau ]}
a
1
,
.
.
.
,
a
m
;
σ
,
τ
=
a
1
;
σ
,
τ
.
.
.
a
m
;
σ
,
τ
{\displaystyle [a_{1},...,a_{m};\sigma ,\tau ]=[a_{1};\sigma ,\tau ]...[a_{m};\sigma ,\tau ]}
The additive theta hypergeometric series r +1e r
r
+
1
e
r
(
a
1
,
.
.
.
a
r
+
1
;
b
1
,
.
.
.
,
b
r
;
σ
,
τ
;
z
)
=
∑
n
=
0
∞
a
1
,
.
.
.
,
a
r
+
1
;
σ
;
τ
n
1
,
b
1
,
.
.
.
,
b
r
;
σ
,
τ
n
z
n
{\displaystyle \displaystyle {}_{r+1}e_{r}(a_{1},...a_{r+1};b_{1},...,b_{r};\sigma ,\tau ;z)=\sum _{n=0}^{\infty }{\frac {[a_{1},...,a_{r+1};\sigma ;\tau ]_{n}}{[1,b_{1},...,b_{r};\sigma ,\tau ]_{n}}}z^{n}}
The additive very well poised theta hypergeometric series r +1v r
r
+
1
v
r
(
a
1
;
a
6
,
.
.
.
a
r
+
1
;
σ
,
τ
;
z
)
=
∑
n
=
0
∞
a
1
+
2
n
;
σ
,
τ
a
1
;
σ
,
τ
a
1
,
a
6
,
.
.
.
,
a
r
+
1
;
σ
,
τ
n
1
,
1
+
a
1
−
a
6
,
.
.
.
,
1
+
a
1
−
a
r
+
1
;
σ
,
τ
n
z
n
{\displaystyle \displaystyle {}_{r+1}v_{r}(a_{1};a_{6},...a_{r+1};\sigma ,\tau ;z)=\sum _{n=0}^{\infty }{\frac {[a_{1}+2n;\sigma ,\tau ]}{[a_{1};\sigma ,\tau ]}}{\frac {[a_{1},a_{6},...,a_{r+1};\sigma ,\tau ]_{n}}{[1,1+a_{1}-a_{6},...,1+a_{1}-a_{r+1};\sigma ,\tau ]_{n}}}z^{n}}
Further reading Spiridonov, V. P. (2013). "Aspects of elliptic hypergeometric functions". In Berndt, Bruce C. (ed.). The Legacy of Srinivasa Ramanujan Proceedings of an International Conference in Celebration of the 125th Anniversary of Ramanujan's Birth; University of Delhi, 17-22 December 2012 . Ramanujan Mathematical Society Lecture Notes Series. Vol. 20. Ramanujan Mathematical Society. pp. 347–361.
arXiv :
1307.2876 .
Bibcode :
2013arXiv1307.2876S .
ISBN
9789380416137 Rosengren, Hjalmar (2016). "Elliptic Hypergeometric Functions".
arXiv :
1608.06161 [
math.CA ]. References Frenkel, Igor B.; Turaev, Vladimir G. (1997),
"Elliptic solutions of the Yang-Baxter equation and modular hypergeometric functions" , The Arnold-Gelfand mathematical seminars , Boston, MA: Birkhäuser Boston, pp. 171–204,
ISBN
978-0-8176-3883-2 MR
1429892 Gasper, George; Rahman, Mizan (2004), Basic hypergeometric series , Encyclopedia of Mathematics and its Applications, vol. 96 (2nd ed.),
Cambridge University Press ,
ISBN
978-0-521-83357-8 MR
2128719 Spiridonov, V. P. (2002), "Theta hypergeometric series", Asymptotic combinatorics with application to mathematical physics (St. Petersburg, 2001) , NATO Sci. Ser. II Math. Phys. Chem., vol. 77, Dordrecht: Kluwer Acad. Publ., pp. 307–327,
arXiv :
math/0303204 ,
Bibcode :
2003math......3204S ,
MR
2000728 Spiridonov, V. P. (2003), "Theta hypergeometric integrals", Rossiĭskaya Akademiya Nauk. Algebra i Analiz , 15 (6): 161–215,
arXiv :
math/0303205 ,
Bibcode :
2003math......3205S ,
doi :
10.1090/S1061-0022-04-00839-8 ,
MR
2044635 ,
S2CID
14471695 Spiridonov, V. P. (2008), "Essays on the theory of elliptic hypergeometric functions", Rossiĭskaya Akademiya Nauk. Moskovskoe Matematicheskoe Obshchestvo. Uspekhi Matematicheskikh Nauk , 63 (3): 3–72,
arXiv :
0805.3135 ,
Bibcode :
2008RuMaS..63..405S ,
doi :
10.1070/RM2008v063n03ABEH004533 ,
MR
2479997 ,
S2CID
16996893 Warnaar, S. Ole (2002), "Summation and transformation formulas for elliptic hypergeometric series", Constructive Approximation , 18 (4): 479–502,
arXiv :
math/0001006 ,
doi :
10.1007/s00365-002-0501-6 ,
MR
1920282 ,
S2CID
18102177
![{\displaystyle [a;\sigma ,\tau ]={\frac {\theta _{1}(\pi \sigma a,e^{\pi i\tau })}{\theta _{1}(\pi \sigma ,e^{\pi i\tau })}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/b94d8d0bb1b97924ff5cb8dcb7862b623aa311ce)
![{\displaystyle [a;\sigma ,\tau ]_{n}=[a;\sigma ,\tau ][a+1;\sigma ,\tau ]...[a+n-1;\sigma ,\tau ]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/ee2da38081b9cc727134b56777757ea212d8d0ca)
![{\displaystyle [a_{1},...,a_{m};\sigma ,\tau ]=[a_{1};\sigma ,\tau ]...[a_{m};\sigma ,\tau ]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/b392b65337d21af3f4f57af588c903f192db9a35)
![{\displaystyle \displaystyle {}_{r+1}e_{r}(a_{1},...a_{r+1};b_{1},...,b_{r};\sigma ,\tau ;z)=\sum _{n=0}^{\infty }{\frac {[a_{1},...,a_{r+1};\sigma ;\tau ]_{n}}{[1,b_{1},...,b_{r};\sigma ,\tau ]_{n}}}z^{n}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/a58afdad63c4f0c8a067eb0dccafd04990a7f5a2)
![{\displaystyle \displaystyle {}_{r+1}v_{r}(a_{1};a_{6},...a_{r+1};\sigma ,\tau ;z)=\sum _{n=0}^{\infty }{\frac {[a_{1}+2n;\sigma ,\tau ]}{[a_{1};\sigma ,\tau ]}}{\frac {[a_{1},a_{6},...,a_{r+1};\sigma ,\tau ]_{n}}{[1,1+a_{1}-a_{6},...,1+a_{1}-a_{r+1};\sigma ,\tau ]_{n}}}z^{n}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/63ad1ba53fcbf4c2e9c7ba290172f33b9e441216)
