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23
Weierstrass Elliptic and Modular
Functions
Weierstrass Elliptic Functions
23.10
Addition Theorems and Other Identities
23.12
Asymptotic Approximations
§23.11
Integral Representations
ⓘ
Keywords:
Weierstrass elliptic functions
,
integral representations
Notes:
See
Dienstfrey and Huang (
2006
)
.
Permalink:
http://dlmf.nist.gov/23.11
See also:
Annotations for
Ch.23
Let
τ
=
ω
3
/
ω
1
and
23.11.1
f
1
(
s
,
τ
)
=
cosh
2
(
1
2
τ
s
)
1
−
2
e
−
s
cosh
(
τ
s
)
+
e
−
2
s
,
f
2
(
s
,
τ
)
=
cos
2
(
1
2
s
)
1
−
2
e
i
τ
s
cos
s
+
e
2
i
τ
s
.
ⓘ
Symbols:
cos
z
: cosine function
,
e
: base of natural logarithm
,
cosh
z
: hyperbolic cosine function
,
i
: imaginary unit
,
τ
: complex variable
and
f
j
(
s
,
τ
)
: functions
Permalink:
http://dlmf.nist.gov/23.11.E1
Encodings:
TeX
,
TeX
,
pMML
,
pMML
,
png
,
png
See also:
Annotations for
§23.11
and
Ch.23
Then
23.11.2
℘
(
z
)
=
1
z
2
+
8
∫
0
∞
s
(
e
−
s
sinh
2
(
1
2
z
s
)
f
1
(
s
,
τ
)
+
e
i
τ
s
sin
2
(
1
2
z
s
)
f
2
(
s
,
τ
)
)
d
s
,
ⓘ
Symbols:
℘
(
z
)
(=
℘
(
z
|
𝕃
)
=
℘
(
z
;
g
2
,
g
3
)
): Weierstrass
℘
-function
,
d
x
: differential of
x
,
e
: base of natural logarithm
,
sinh
z
: hyperbolic sine function
,
i
: imaginary unit
,
∫
: integral
,
sin
z
: sine function
,
𝕃
: lattice
,
z
: complex
,
τ
: complex variable
and
f
j
(
s
,
τ
)
: functions
Permalink:
http://dlmf.nist.gov/23.11.E2
Encodings:
TeX
,
pMML
,
png
See also:
Annotations for
§23.11
and
Ch.23
and
23.11.3
ζ
(
z
)
=
1
z
+
∫
0
∞
(
e
−
s
(
z
s
−
sinh
(
z
s
)
)
f
1
(
s
,
τ
)
−
e
i
τ
s
(
z
s
−
sin
(
z
s
)
)
f
2
(
s
,
τ
)
)
d
s
,
ⓘ
Symbols:
ζ
(
z
)
(=
ζ
(
z
|
𝕃
)
=
ζ
(
z
;
g
2
,
g
3
)
): Weierstrass zeta function
,
d
x
: differential of
x
,
e
: base of natural logarithm
,
sinh
z
: hyperbolic sine function
,
i
: imaginary unit
,
∫
: integral
,
sin
z
: sine function
,
𝕃
: lattice
,
z
: complex
,
τ
: complex variable
and
f
j
(
s
,
τ
)
: functions
Permalink:
http://dlmf.nist.gov/23.11.E3
Encodings:
TeX
,
pMML
,
png
See also:
Annotations for
§23.11
and
Ch.23
provided that
−
1
<
ℜ
(
z
+
τ
)
<
1
and
|
ℑ
z
|
<
ℑ
τ
.