Mathematical theorem
In mathematics , Ramanujan's Master Theorem , named after Srinivasa Ramanujan , is a technique that provides an analytic expression for the Mellin transform of an analytic function .
Page from Ramanujan's notebook stating his Master theorem. The result is stated as follows:
If a complex-valued function
f
(
x
)
{\textstyle f(x)}
f
(
x
)
=
∑
k
=
0
∞
φ
(
k
)
k
!
(
−
x
)
k
{\displaystyle f(x)=\sum _{k=0}^{\infty }{\frac {\,\varphi (k)\,}{k!}}(-x)^{k}}
then the Mellin transform of
f
(
x
)
{\textstyle f(x)}
∫
0
∞
x
s
−
1
f
(
x
)
d
x
=
Γ
(
s
)
φ
(
−
s
)
{\displaystyle \int _{0}^{\infty }x^{s-1}f(x)\,dx=\Gamma (s)\,\varphi (-s)}
where
Γ
(
s
)
{\textstyle \Gamma (s)}
gamma function .
It was widely used by Ramanujan to calculate definite integrals and infinite series .
Higher-dimensional versions of this theorem also appear in quantum physics through Feynman diagrams .
A similar result was also obtained by Glaisher .
Alternative formalism [ edit ] An alternative formulation of Ramanujan's Master Theorem is as follows:
∫
0
∞
x
s
−
1
(
λ
(
0
)
−
x
λ
(
1
)
+
x
2
λ
(
2
)
−
⋯
)
d
x
=
π
sin
(
π
s
)
λ
(
−
s
)
{\displaystyle \int _{0}^{\infty }x^{s-1}\left(\,\lambda (0)-x\,\lambda (1)+x^{2}\,\lambda (2)-\,\cdots \,\right)dx={\frac {\pi }{\,\sin(\pi s)\,}}\,\lambda (-s)}
which gets converted to the above form after substituting
λ
(
n
)
≡
φ
(
n
)
Γ
(
1
+
n
)
{\textstyle \lambda (n)\equiv {\frac {\varphi (n)}{\,\Gamma (1+n)\,}}}
gamma function .
The integral above is convergent for
0
<
R
e
(
s
)
<
1
{\textstyle 0<\operatorname {\mathcal {Re}} (s)<1}
φ
{\textstyle \varphi }
A proof subject to "natural" assumptions (though not the weakest necessary conditions) to Ramanujan's Master theorem was provided by G. H. Hardy (chapter XI) employing the residue theorem and the well-known Mellin inversion theorem .
Application to Bernoulli polynomials [ edit ] The generating function of the Bernoulli polynomials
B
k
(
x
)
{\textstyle B_{k}(x)}
z
e
x
z
e
z
−
1
=
∑
k
=
0
∞
B
k
(
x
)
z
k
k
!
{\displaystyle {\frac {z\,e^{x\,z}}{\,e^{z}-1\,}}=\sum _{k=0}^{\infty }B_{k}(x)\,{\frac {z^{k}}{k!}}}
These polynomials are given in terms of the Hurwitz zeta function :
ζ
(
s
,
a
)
=
∑
n
=
0
∞
1
(
n
+
a
)
s
{\displaystyle \zeta (s,a)=\sum _{n=0}^{\infty }{\frac {1}{\,(n+a)^{s}\,}}}
by
ζ
(
1
−
n
,
a
)
=
−
B
n
(
a
)
n
{\textstyle \zeta (1-n,a)=-{\frac {B_{n}(a)}{n}}}
n
≥
1
{\textstyle ~n\geq 1}
∫
0
∞
x
s
−
1
(
e
−
a
x
1
−
e
−
x
−
1
x
)
d
x
=
Γ
(
s
)
ζ
(
s
,
a
)
{\displaystyle \int _{0}^{\infty }x^{s-1}\left({\frac {e^{-ax}}{\,1-e^{-x}\,}}-{\frac {1}{x}}\right)dx=\Gamma (s)\,\zeta (s,a)\!}
which is valid for
0
<
R
e
(
s
)
<
1
{\textstyle 0<\operatorname {\mathcal {Re}} (s)<1}
Application to the gamma function [ edit ] Weierstrass's definition of the gamma function
Γ
(
x
)
=
e
−
γ
x
x
∏
n
=
1
∞
(
1
+
x
n
)
−
1
e
x
/
n
{\displaystyle \Gamma (x)={\frac {\,e^{-\gamma \,x\,}}{x}}\,\prod _{n=1}^{\infty }\left(\,1+{\frac {x}{n}}\,\right)^{-1}e^{x/n}\!}
is equivalent to expression
log
Γ
(
1
+
x
)
=
−
γ
x
+
∑
k
=
2
∞
ζ
(
k
)
k
(
−
x
)
k
{\displaystyle \log \Gamma (1+x)=-\gamma \,x+\sum _{k=2}^{\infty }{\frac {\,\zeta (k)\,}{k}}\,(-x)^{k}}
where
ζ
(
k
)
{\textstyle \zeta (k)}
Riemann zeta function .
Then applying Ramanujan master theorem we have:
∫
0
∞
x
s
−
1
γ
x
+
log
Γ
(
1
+
x
)
x
2
d
x
=
π
sin
(
π
s
)
ζ
(
2
−
s
)
2
−
s
{\displaystyle \int _{0}^{\infty }x^{s-1}{\frac {\,\gamma \,x+\log \Gamma (1+x)\,}{x^{2}}}\mathrm {d} x={\frac {\pi }{\sin(\pi s)}}{\frac {\zeta (2-s)}{2-s}}\!}
valid for
0
<
R
e
(
s
)
<
1
{\textstyle 0<\operatorname {\mathcal {Re}} (s)<1}
Special cases of
s
=
1
2
{\textstyle s={\frac {1}{2}}}
s
=
3
4
{\textstyle s={\frac {3}{4}}}
∫
0
∞
γ
x
+
log
Γ
(
1
+
x
)
x
5
/
2
d
x
=
2
π
3
ζ
(
3
2
)
{\displaystyle \int _{0}^{\infty }{\frac {\,\gamma x+\log \Gamma (1+x)\,}{x^{5/2}}}\,\mathrm {d} x={\frac {2\pi }{3}}\,\zeta \left({\frac {3}{2}}\right)}
∫
0
∞
γ
x
+
log
Γ
(
1
+
x
)
x
9
/
4
d
x
=
2
4
π
5
ζ
(
5
4
)
{\displaystyle \int _{0}^{\infty }{\frac {\,\gamma \,x+\log \Gamma (1+x)\,}{x^{9/4}}}\,\mathrm {d} x={\sqrt {2}}{\frac {4\pi }{5}}\zeta \left({\frac {5}{4}}\right)}
Application to Bessel functions [ edit ] The Bessel function of the first kind has the power series
J
ν
(
z
)
=
∑
k
=
0
∞
(
−
1
)
k
Γ
(
k
+
ν
+
1
)
k
!
(
z
2
)
2
k
+
ν
{\displaystyle J_{\nu }(z)=\sum _{k=0}^{\infty }{\frac {(-1)^{k}}{\Gamma (k+\nu +1)k!}}{\bigg (}{\frac {z}{2}}{\bigg )}^{2k+\nu }}
By Ramanujan's Master Theorem, together with some identities for the gamma function and rearranging, we can evaluate the integral
2
ν
−
2
s
π
sin
(
π
(
s
−
ν
)
)
∫
0
∞
z
s
−
1
−
ν
/
2
J
ν
(
z
)
d
z
=
Γ
(
s
)
Γ
(
s
−
ν
)
{\displaystyle {\frac {2^{\nu -2s}\pi }{\sin {(\pi (s-\nu ))}}}\int _{0}^{\infty }z^{s-1-\nu /2}J_{\nu }({\sqrt {z}})\,dz=\Gamma (s)\Gamma (s-\nu )}
valid for
0
<
2
R
e
(
s
)
<
R
e
(
ν
)
+
3
2
{\textstyle 0<2\operatorname {\mathcal {Re}} (s)<\operatorname {\mathcal {Re}} (\nu )+{\tfrac {3}{2}}}
Equivalently, if the spherical Bessel function
j
ν
(
z
)
{\textstyle j_{\nu }(z)}
2
ν
−
2
s
π
(
1
−
2
s
+
2
ν
)
cos
(
π
(
s
−
ν
)
)
∫
0
∞
z
s
−
1
−
ν
/
2
j
ν
(
z
)
d
z
=
Γ
(
s
)
Γ
(
1
2
+
s
−
ν
)
{\displaystyle {\frac {2^{\nu -2s}{\sqrt {\pi }}(1-2s+2\nu )}{\cos {(\pi (s-\nu ))}}}\int _{0}^{\infty }z^{s-1-\nu /2}j_{\nu }({\sqrt {z}})\,dz=\Gamma (s)\Gamma {\bigg (}{\frac {1}{2}}+s-\nu {\bigg )}}
valid for
0
<
2
R
e
(
s
)
<
R
e
(
ν
)
+
2
{\textstyle 0<2\operatorname {\mathcal {Re}} (s)<\operatorname {\mathcal {Re}} (\nu )+2}
The solution is remarkable in that it is able to interpolate across the major identities for the gamma function. In particular, the choice of
J
0
(
z
)
{\textstyle J_{0}({\sqrt {z}})}
j
0
(
z
)
{\textstyle j_{0}({\sqrt {z}})}
duplication formula ,
z
−
1
/
2
J
1
(
z
)
{\textstyle z^{-1/2}J_{1}({\sqrt {z}})}
reflection formula , and fixing to the evaluable
s
=
1
2
{\textstyle s={\frac {1}{2}}}
s
=
1
{\textstyle s=1}
Bracket integration method [ edit ] The bracket integration method (method of brackets) applies Ramanujan's Master Theorem to a broad range of integrals. The bracket integration method generates the integrand's series expansion , creates a bracket series, identifies the series coefficient and formula parameters and computes the integral.
Integration formulas [ edit ] This section identifies the integration formulas for integrand's with and without consecutive integer exponents and for single and double integrals. The integration formula for double integrals may be generalized to any multiple integral . In all cases, there is a parameter value
n
∗
{\textstyle n^{\ast }}
N
∗
{\textstyle N^{\ast }}
linear equations derived from the exponent terms of the integrand's series expansion.
Consecutive integer exponents, 1 variable [ edit ] This is the function series expansion, integral and integration formula for an integral whose integrand's series expansion contains consecutive integer exponents.
f
(
y
)
=
∑
n
=
0
∞
(
−
1
)
n
n
!
φ
(
n
)
y
n
∫
0
∞
y
c
−
1
f
(
y
)
d
y
=
∫
0
∞
∑
n
=
0
∞
(
−
1
)
n
n
!
φ
(
n
)
y
n
+
c
−
1
d
y
=
Γ
(
−
n
∗
)
φ
(
n
∗
)
.
{\displaystyle {\begin{aligned}&f(y)=\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{n!}}\ \varphi (n)\ y^{n}\\&\int _{0}^{\infty }y^{c-1}f(y)\,dy\\&=\int _{0}^{\infty }\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{n!}}\ \varphi (n)\ y^{n+c-1}dy\\&=\Gamma (-n^{\ast })\,\varphi (n^{\ast }).\end{aligned}}}
The parameter
n
∗
{\displaystyle n^{\ast }}
is a solution to this linear equation.
n
∗
+
c
=
0
,
n
∗
=
−
c
{\displaystyle n^{\ast }+c=0,\ n^{\ast }=-c}
General exponents, 1 variable [ edit ] Applying the substitution
y
=
x
a
{\textstyle y=x^{a}}
f
(
x
)
=
∑
n
=
0
∞
(
−
1
)
n
n
!
φ
(
n
)
x
a
n
∫
0
∞
x
c
−
1
f
(
x
)
d
x
=
∫
0
∞
∑
n
=
0
∞
(
−
1
)
n
n
!
φ
(
n
)
x
a
n
+
c
−
1
d
x
=
a
−
1
Γ
(
−
n
∗
)
φ
(
n
∗
)
.
{\displaystyle {\begin{aligned}&f(x)=\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{n!}}\ \varphi (n)\ x^{an}\\&\int _{0}^{\infty }x^{c-1}f(x)\,dx\\&=\int _{0}^{\infty }\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{n!}}\ \varphi (n)\ x^{an+c-1}dx\\&=a^{-1}\ \Gamma (-n^{\ast })\,\varphi (n^{\ast }).\\\end{aligned}}}
The parameter
n
∗
{\textstyle n^{\ast }}
is a solution to this linear equation.
a
n
∗
+
c
=
0
,
n
∗
=
−
a
−
1
c
{\displaystyle a\ n^{\ast }+c=0,\ n^{\ast }=-a^{-1}c}
Consecutive integer exponents, double integral [ edit ] This is the function series expansion, integral and integration formula for a double integral whose integrand's series expansion contains consecutive integer exponents.
f
(
y
1
,
y
2
)
=
∑
n
=
0
∞
(
−
1
)
n
1
n
1
!
(
−
1
)
n
2
n
2
!
φ
(
n
1
,
n
2
)
y
1
n
1
y
2
n
2
∫
0
∞
y
1
c
1
−
1
y
2
c
2
−
1
f
(
y
1
,
y
2
)
d
y
1
d
y
2
=
∫
0
∞
∫
0
∞
∑
n
1
=
0
∞
∑
n
2
=
0
∞
(
−
1
)
n
1
n
1
!
(
−
1
)
n
2
n
2
!
φ
(
n
1
,
n
2
)
y
1
n
1
+
c
1
−
1
y
2
n
2
+
c
2
−
1
d
y
1
d
y
2
=
Γ
(
−
n
1
∗
)
Γ
(
−
n
2
∗
)
φ
(
n
1
∗
,
n
2
∗
)
.
{\displaystyle {\begin{aligned}&f(y_{1},y_{2})=\sum _{n=0}^{\infty }{\frac {(-1)^{n_{1}}}{n_{1}!}}{\frac {(-1)^{n_{2}}}{n_{2}!}}\ \varphi (n_{1},n_{2})\ y_{1}^{n_{1}}\ y_{2}^{n_{2}}\\&\int _{0}^{\infty }y_{1}^{c_{1}-1}y_{2}^{c_{2}-1}\ f(y_{1},y_{2})\ dy_{1}\ dy_{2}\\&=\int _{0}^{\infty }\int _{0}^{\infty }\sum _{n_{1}=0}^{\infty }\sum _{n_{2}=0}^{\infty }{\frac {(-1)^{n_{1}}}{n_{1}!}}{\frac {(-1)^{n_{2}}}{n_{2}!}}\ \varphi (n_{1},n_{2})\ y_{1}^{n_{1}+c_{1}-1}\ y_{2}^{n_{2}+c_{2}-1}\ dy_{1}\ dy_{2}\\&=\Gamma (-n_{1}^{\ast })\ \Gamma (-n_{2}^{\ast })\ \varphi (n_{1}^{\ast },n_{2}^{\ast }).\\\end{aligned}}}
The parameters
n
1
∗
{\textstyle n_{1}^{\ast }}
and
n
2
∗
{\textstyle n_{2}^{\ast }}
are solutions to these linear equations.
n
1
∗
+
c
1
=
0
,
n
2
∗
+
c
2
=
0
,
n
1
∗
=
−
c
1
,
n
2
∗
=
−
c
2
{\displaystyle n_{1}^{\ast }+c_{1}=0,\ n_{2}^{\ast }+c_{2}=0,\ n_{1}^{\ast }=-c_{1},\ n_{2}^{\ast }=-c_{2}}
General exponents, double integral [ edit ] This section describes the integration formula for a double integral whose integrand's series expansion may not contain consecutive integer exponents. Matrices contain the parameters needed to express the exponents in a series expansion of the integrand, and the determinant of invertible matrix
A
{\textstyle A}
det
|
A
|
{\textstyle \operatorname {det} |A|}
A
=
|
a
11
a
12
a
21
a
22
|
,
C
=
|
c
1
c
2
|
,
N
∗
=
|
n
1
∗
n
2
∗
|
{\displaystyle A={\begin{vmatrix}a_{11}&a_{12}\\a_{21}&a_{22}\end{vmatrix}},\ C={\begin{vmatrix}c_{1}\\c_{2}\end{vmatrix}},\ \ N^{\ast }={\begin{vmatrix}n_{1}^{\ast }\\n_{2}^{\ast }\end{vmatrix}}}
Substitute variables
y
1
,
y
2
{\textstyle y_{1},y_{2}}
with variables
x
1
,
x
2
{\textstyle x_{1},x_{2}}
to generate an integrand's series expansion whose exponents may not be consecutive integers.
y
1
=
x
1
a
11
x
2
a
21
,
y
2
=
x
1
a
12
x
2
a
22
{\displaystyle y_{1}=x_{1}^{a_{11}}x_{2}^{a_{21}},\quad y_{2}=x_{1}^{a_{12}}x_{2}^{a_{22}}}
This is the integral and integration formula.
∫
0
∞
∫
0
∞
∑
n
1
=
0
∞
∑
n
2
=
0
∞
(
−
1
)
n
1
n
1
!
(
−
1
)
n
2
n
2
!
φ
(
n
1
,
n
2
)
x
1
n
1
a
11
+
n
2
a
12
+
c
1
−
1
x
2
n
1
a
21
+
n
2
a
22
+
c
2
−
1
d
x
1
d
x
2
=
det
|
A
|
−
1
Γ
(
−
n
1
∗
)
Γ
(
−
n
2
∗
)
φ
(
n
1
∗
,
n
2
∗
)
{\displaystyle {\begin{aligned}&\int _{0}^{\infty }\int _{0}^{\infty }\sum _{n_{1}=0}^{\infty }\sum _{n_{2}=0}^{\infty }{\frac {(-1)^{n_{1}}}{n_{1}!}}{\frac {(-1)^{n_{2}}}{n_{2}!}}\ \varphi (n_{1},n_{2})\ x_{1}^{n_{1}a_{11}+n_{2}a_{12}+c_{1}-1}\ x_{2}^{n_{1}a_{21}+n_{2}a_{22}+c_{2}-1}\ dx_{1}\ dx_{2}\\&=\operatorname {det} |A|^{-1}\ \Gamma (-n_{1}^{\ast })\ \Gamma (-n_{2}^{\ast })\ \varphi (n_{1}^{\ast },n_{2}^{\ast })\\\end{aligned}}}
The parameter matrix
N
∗
{\textstyle N^{\ast }}
is a solution to this linear equation.
A
N
∗
+
C
=
0
,
N
∗
=
−
A
−
1
C
{\displaystyle A\ N^{\ast }+C=0,\quad N^{\ast }=-A^{-1}C}
.
Positive complexity index [ edit ] In some cases, there may be more sums then variables. For example, if the integrand is a product of 3 functions of a common single variable, and each function is converted to a series expansion sum, the integrand is now a product of 3 sums, each sum corresponding to a distinct series expansion.
The number of brackets is the number of linear equations associated with an integral. This term reflects the common practice of bracketing each linear equation.
The complexity index is the number of integrand sums minus the number of brackets (linear equations). Each series expansion of the integrand contributes one sum.
The summation indices (variables)
n
1
,
n
2
{\textstyle n_{1},n_{2}}
n
3
{\textstyle n_{3}}
The free summation indices (variables) Integrals with a positive complexity index [ edit ] The set of selected free indices,
F
{\textstyle F}
n
¯
1
,
…
,
n
¯
f
{\textstyle {\bar {n}}_{1},\ldots ,{\bar {n}}_{f}}
A
¯
{\textstyle {\bar {A}}}
N
¯
{\textstyle {\bar {N}}}
A
¯
=
|
a
¯
11
…
a
¯
1
f
⋮
⋮
a
¯
b
1
…
a
¯
b
f
|
,
N
¯
=
|
n
¯
1
⋮
n
¯
f
|
{\displaystyle {\bar {A}}={\begin{vmatrix}{\bar {a}}_{11}&\ldots &{\bar {a}}_{1f}\\\vdots &&\vdots \\{\bar {a}}_{b1}&\ldots &{\bar {a}}_{bf}\end{vmatrix}},\ {\bar {N}}={\begin{vmatrix}{\bar {n}}_{1}\\\vdots \\{\bar {n}}_{f}\end{vmatrix}}}
.
The remaining indices are set
B
{\textstyle B}
n
1
,
…
,
n
b
{\textstyle n_{1},\ldots ,n_{b}}
A
,
C
{\textstyle A,C}
N
∗
{\textstyle N^{\ast }}
A
{\textstyle A}
A
=
|
a
11
…
a
1
b
⋮
⋮
a
b
1
…
a
b
b
|
,
C
=
|
c
1
⋮
c
b
|
,
N
∗
=
|
n
1
∗
⋮
n
b
∗
|
{\displaystyle A={\begin{vmatrix}a_{11}&\ldots &a_{1b}\\\vdots &&\vdots \\a_{b1}&\ldots &a_{bb}\end{vmatrix}},\ C={\begin{vmatrix}c_{1}\\\vdots \\c_{b}\end{vmatrix}},\ \ N^{\ast }={\begin{vmatrix}n_{1}^{\ast }\\\vdots \\n_{b}^{\ast }\end{vmatrix}}}
.
This is the function's series expansion, integral and integration formula.
f
(
x
1
,
…
,
x
b
)
=
∑
n
∈
B
∞
∑
n
¯
∈
F
∞
(
−
1
)
n
1
n
1
!
(
−
1
)
n
¯
1
n
¯
1
!
…
(
−
1
)
n
b
n
b
!
(
−
1
)
n
f
¯
n
¯
f
!
φ
(
n
1
,
…
,
n
b
,
n
¯
1
,
…
,
n
¯
f
)
∏
x
k
∈
B
x
k
n
1
a
k
1
+
⋯
+
n
¯
1
a
¯
k
1
+
⋯
+
c
k
−
1
∫
0
∞
…
∫
0
∞
x
c
1
−
1
…
x
c
b
−
1
f
(
x
1
,
…
,
x
b
)
d
x
1
…
d
x
b
=
det
|
A
|
−
1
∑
n
¯
∈
F
∞
(
−
1
)
n
¯
1
n
¯
1
!
…
(
−
1
)
n
¯
f
n
¯
f
!
Γ
(
−
n
1
∗
)
…
Γ
(
−
n
b
∗
)
φ
(
n
1
∗
,
…
,
n
b
∗
,
n
¯
1
,
…
,
n
¯
f
)
.
{\displaystyle {\begin{aligned}&f(x_{1},\ldots ,x_{b})\\&=\sum _{n\in B}^{\infty }\sum _{{\bar {n}}\in F}^{\infty }{\frac {(-1)^{n_{1}}}{n_{1}!}}{\frac {(-1)^{{\bar {n}}_{1}}}{{\bar {n}}_{1}!}}\ldots {\frac {(-1)^{n_{b}}}{n_{b}!}}{\frac {(-1)^{\bar {n_{f}}}}{{\bar {n}}_{f}!}}\varphi (n_{1},\ldots ,n_{b},{\bar {n}}_{1},\dots ,{\bar {n}}_{f})\prod _{x_{k}\in B}x_{k}^{n_{1}a_{k1}+\dots +{\bar {n}}_{1}{\bar {a}}_{k1}+\dots +c_{k}-1}\\&\int _{0}^{\infty }\ldots \int _{0}^{\infty }x^{c_{1}-1}\dots x^{c_{b}-1}f(x_{1},\ldots ,x_{b})\ dx_{1}\ldots dx_{b}\\&=\operatorname {det} |A|^{-1}\sum _{{\bar {n}}\in F}^{\infty }{\frac {(-1)^{{\bar {n}}_{1}}}{{\bar {n}}_{1}!}}\ldots {\frac {(-1)^{{\bar {n}}_{f}}}{{\bar {n}}_{f}!}}\ \Gamma (-n_{1}^{\ast })\ldots \Gamma (-n_{b}^{\ast })\ \varphi (n_{1}^{\ast },\ldots ,n_{b}^{\ast },{\bar {n}}_{1},\dots ,{\bar {n}}_{f}).\end{aligned}}}
The parameters
n
1
∗
,
…
,
n
b
∗
{\textstyle n_{1}^{\ast },\ldots ,n_{b}^{\ast }}
are linear functions of the parameters
n
¯
1
∗
,
…
,
n
¯
f
∗
{\textstyle {\bar {n}}_{1}^{\ast },\ldots ,{\bar {n}}_{f}^{\ast }}
.
A
N
∗
+
A
¯
N
¯
+
C
=
0
,
N
∗
=
−
A
−
1
(
A
¯
N
¯
+
C
)
{\displaystyle A\ N^{\ast }+{\bar {A}}\ {\bar {N}}+C=0,\ N^{\ast }=-A^{-1}({\bar {A}}\ {\bar {N}}+C)}
.
Algorithm [ edit ] Generate the integrand's series expansion [ edit ] This may be a single series expansion or a product of series expansions.
Create a bracket series [ edit ] A bracket series arises by substituting simplified bracket notations for terms of the integrand's series expansion.
The indicator notation,
ϕ
{\textstyle \phi }
(
−
1
)
n
n
!
→
ϕ
n
{\displaystyle {\frac {(-1)^{n}}{n!}}\ \to \ \phi _{n}}
∏
j
=
1
N
(
(
−
1
)
n
j
n
j
!
)
→
ϕ
n
1
,
…
,
n
N
{\displaystyle \prod _{j=1}^{N}\left({\frac {(-1)^{n_{j}}}{n_{j}!}}\right)\ \to \ \phi _{n_{1},\ldots ,n_{N}}}
.
The bracket notation,
⟨
⋯
⟩
{\textstyle \langle \cdots \rangle }
∫
0
∞
x
c
+
a
n
−
1
d
x
→
⟨
c
+
a
n
⟩
{\displaystyle \int _{0}^{\infty }x^{c+a\ n-1}\ dx\ \to \langle c+a\ n\rangle }
The reciprocal of a sum of variables raised to a positive power ,
α
{\displaystyle \alpha }
1
(
x
1
+
…
+
x
b
)
α
{\displaystyle {\frac {1}{(x_{1}+\ldots +x_{b})^{\alpha }}}}
→
∑
m
1
…
∑
m
b
ϕ
m
1
,
…
,
m
b
x
m
1
…
x
m
b
⟨
α
+
m
1
+
…
+
m
b
⟩
Γ
(
α
)
{\displaystyle \to \sum _{m_{1}}\ldots \sum _{m_{b}}\ \phi _{m_{1},\dots ,m_{b}}\ x^{m_{1}}\dots x^{m_{b}}{\frac {\langle \alpha +m_{1}+\ldots +m_{b}\rangle }{\Gamma (\alpha )}}}
This example transforms a series expansion to a bracket series.
∫
0
∞
∫
0
∞
∑
n
1
=
0
∞
∑
n
2
=
0
∞
(
−
1
)
n
1
n
1
!
(
−
1
)
n
2
n
2
!
φ
(
n
1
,
n
2
)
x
1
n
1
a
11
+
n
2
a
12
+
c
1
−
1
x
2
n
1
a
21
+
n
2
a
22
+
c
2
−
1
d
x
1
d
x
2
{\displaystyle \int _{0}^{\infty }\int _{0}^{\infty }\sum _{n_{1}=0}^{\infty }\sum _{n_{2}=0}^{\infty }{\frac {(-1)^{n_{1}}}{n_{1}!}}{\frac {(-1)^{n_{2}}}{n_{2}!}}\ \varphi (n_{1},n_{2})\ x_{1}^{n_{1}a_{11}+n_{2}a_{12}+c_{1}-1}\ x_{2}^{n_{1}a_{21}+n_{2}a_{22}+c_{2}-1}\ dx_{1}\ dx_{2}}
→
∑
n
1
=
0
∞
∑
n
2
=
0
∞
ϕ
n
1
,
n
2
φ
(
n
1
,
n
2
)
⟨
n
1
a
11
+
n
2
a
12
+
c
1
⟩
⟨
n
1
a
21
+
n
2
a
22
+
c
2
⟩
{\displaystyle \to \sum _{n_{1}=0}^{\infty }\sum _{n_{2}=0}^{\infty }\phi _{n_{1},n_{2}}\varphi (n_{1},n_{2})\langle n_{1}a_{11}+n_{2}a_{12}+c_{1}\rangle \langle n_{1}a_{21}+n_{2}a_{22}+c_{2}\rangle }
Identify the linear equation(s) [ edit ] Set the expressions in brackets equal to zero. For multiple integrals, this generates equations involving matrices
A
,
N
∗
{\textstyle A,N^{\ast }}
C
{\textstyle C}
A
¯
{\textstyle {\bar {A}}}
N
¯
{\textstyle {\bar {N}}}
Identify the series coefficient and parameters [ edit ] Inspect the bracket series and identify the series coefficient
φ
(
)
{\textstyle \varphi ()}
a
{\textstyle a}
det
|
A
|
{\textstyle \operatorname {det} |A|}
n
∗
{\textstyle n^{\ast }}
N
∗
{\textstyle N^{\ast }}
Compute integrals [ edit ] If the complexity index is negative, more brackets than sums, the bracket series is assigned no value.
If the complexity index is zero, this is the function series expansion, single integral and integration formula.
f
(
x
)
=
∑
n
=
0
∞
(
−
1
)
n
n
!
φ
(
n
)
x
a
n
∫
0
∞
x
c
−
1
f
(
x
)
d
x
=
∫
0
∞
∑
n
=
0
∞
(
−
1
)
n
n
!
φ
(
n
)
x
a
n
+
c
−
1
d
x
=
a
−
1
Γ
(
−
n
∗
)
φ
(
n
∗
)
n
∗
=
−
c
/
a
{\displaystyle {\begin{aligned}&f(x)=\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{n!}}\ \varphi (n)\ x^{an}\\&\int _{0}^{\infty }x^{c-1}f(x)\,dx\\&=\int _{0}^{\infty }\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{n!}}\ \varphi (n)\ x^{an+c-1}dx\\&=a^{-1}\ \Gamma (-n^{\ast })\,\varphi (n^{\ast })\quad n^{\ast }=-c/a\\\end{aligned}}}
If the complexity index is zero, this is the function series expansion, multiple integral and integration formula.
∫
0
∞
…
∫
0
∞
x
c
1
−
1
…
x
c
b
−
1
f
(
x
1
,
…
,
x
b
)
d
x
1
…
d
x
b
{\displaystyle \int _{0}^{\infty }\ldots \int _{0}^{\infty }x^{c_{1}-1}\dots x^{c_{b}-1}f(x_{1},\ldots ,x_{b})\ dx_{1}\ldots dx_{b}}
=
det
|
A
|
−
1
Γ
(
−
n
1
∗
)
…
Γ
(
−
n
b
∗
)
φ
(
n
1
∗
,
…
,
n
b
∗
)
{\displaystyle =\operatorname {det} |A|^{-1}\ \Gamma (-n_{1}^{\ast })\ldots \Gamma (-n_{b}^{\ast })\ \varphi (n_{1}^{\ast },\ldots ,n_{b}^{\ast })\ }
N
∗
=
−
A
−
1
C
{\displaystyle N^{\ast }=-A^{-1}C}
If the complexity index is positive, this is the integral and integration formula.
∫
0
∞
…
∫
0
∞
x
c
1
−
1
…
x
c
b
−
1
f
(
x
1
,
…
,
x
b
)
d
x
1
…
d
x
b
{\displaystyle \int _{0}^{\infty }\ldots \int _{0}^{\infty }x^{c_{1}-1}\dots x^{c_{b}-1}f(x_{1},\ldots ,x_{b})\ dx_{1}\ldots dx_{b}}
=
det
|
A
|
−
1
∑
n
¯
∈
F
∞
(
−
1
)
n
¯
1
n
¯
1
!
…
(
−
1
)
n
¯
f
n
¯
f
!
Γ
(
−
n
1
∗
)
…
Γ
(
−
n
b
∗
)
φ
(
n
1
∗
,
…
,
n
b
∗
,
n
¯
1
,
…
,
n
¯
f
)
{\displaystyle =\operatorname {det} |A|^{-1}\sum _{{\bar {n}}\in F}^{\infty }{\frac {(-1)^{{\bar {n}}_{1}}}{{\bar {n}}_{1}!}}\ldots {\frac {(-1)^{{\bar {n}}_{f}}}{{\bar {n}}_{f}!}}\ \Gamma (-n_{1}^{\ast })\ldots \Gamma (-n_{b}^{\ast })\ \varphi (n_{1}^{\ast },\ldots ,n_{b}^{\ast },{\bar {n}}_{1},\dots ,{\bar {n}}_{f})}
N
∗
=
−
A
−
1
(
A
¯
N
¯
+
C
)
{\displaystyle N^{\ast }=-A^{-1}({\bar {A}}\ {\bar {N}}+C)}
.
For a positive complexity index bracket series, apply these rules.
Generate a series for each possible choice of free summation indices.
Among all bracket series representations of an integral, the representation with a minimal complexity index is preferred.
If a choice generates a divergent series or null series (a series with zero valued terms), the series is rejected.
If all series are rejected, then the method cannot be applied.
Series converging in a common region are added. Example [ edit ] Zero complexity index [ edit ] The bracket method will integrate this integral.
∫
0
∞
x
3
/
2
e
−
x
3
/
2
d
x
{\displaystyle \int _{0}^{\infty }x^{3/2}\ e^{-x^{3}/2}\ dx}
Generate the integrand's series expansion.
∫
0
∞
∑
n
=
0
∞
2
−
n
(
−
1
)
n
n
!
x
(
3
⋅
n
+
5
/
2
)
−
1
d
x
{\displaystyle \int _{0}^{\infty }\sum _{n=0}^{\infty }2^{-n}\ {\frac {(-1)^{n}}{n!}}\ x^{(3\cdot n+5/2)-1}\ dx}
∑
n
=
0
∞
2
−
n
ϕ
(
n
)
⋅
⟨
3
n
+
5
2
⟩
{\displaystyle \sum _{n=0}^{\infty }2^{-n}\ \phi (n)\cdot \langle 3\ n+{\frac {5}{2}}\rangle }
This is the linear equation.
3
n
∗
+
5
2
=
0
{\displaystyle 3\ n^{\ast }+{\frac {5}{2}}=0}
There is 1 bracket and 1 sum so the complexity index is zero. Identify the series coefficient and parameters.
φ
(
n
)
=
2
−
n
{\displaystyle \varphi (n)=2^{-n}}
a
=
3
,
c
=
5
/
2
,
n
∗
=
−
c
/
a
=
−
5
/
6
{\displaystyle a=3,\ c=5/2,\ n^{\ast }=-c/a=-5/6}
∫
0
∞
x
3
/
2
⋅
e
−
x
3
/
2
d
x
{\displaystyle \int _{0}^{\infty }x^{3/2}\cdot e^{-x^{3}/2}\ dx}
=
a
−
1
Γ
(
−
n
∗
)
φ
(
n
∗
)
{\displaystyle =a^{-1}\ \Gamma (-n^{\ast })\ \varphi (n^{\ast })}
=
Γ
(
5
6
)
2
5
/
6
3
{\displaystyle ={\frac {\Gamma \left({\frac {5}{6}}\right)\ 2^{5/6}}{3}}}
Positive complexity index [ edit ] The bracket method will integrate this integral.
∫
0
∞
1
(
1
+
x
3
+
x
5
)
1
/
2
d
x
{\displaystyle \int _{0}^{\infty }{\frac {1}{(1+x^{3}+x^{5})^{1/2}}}\ dx}
Substitute the bracket series for the reciprocal of a sum raised to a power.
∫
0
∞
∑
n
1
,
n
2
,
n
3
1
Γ
(
1
/
2
)
ϕ
123
1
n
1
x
5
n
2
+
3
n
3
⟨
n
1
+
n
2
+
n
3
+
1
/
2
⟩
d
x
{\displaystyle \int _{0}^{\infty }\sum _{n_{1},n_{2},n_{3}}\ {\frac {1}{\sqrt {\Gamma (1/2)}}}\phi _{123}1^{n_{1}}x^{5n_{2}+3n_{3}}\langle n_{1}+n_{2}+n_{3}+1/2\rangle \ dx}
Apply the bracket notation.
∫
0
∞
∑
n
1
,
n
n
,
n
3
1
Γ
(
1
/
2
)
ϕ
123
⟨
5
n
2
+
3
n
3
+
1
⟩
⟨
n
1
+
n
2
+
n
3
+
1
/
2
⟩
{\displaystyle \int _{0}^{\infty }\sum _{n_{1},n_{n},n_{3}}{\frac {1}{\sqrt {\Gamma (1/2)}}}\phi _{123}\langle 5\ n_{2}+3\ n_{3}+1\rangle \langle n_{1}+n_{2}+n_{3}+1/2\rangle }
There are 3 sums and 2 brackets; therefore, the complexity index is 1, and 1 index must be selected as a free index. Select
n
3
{\textstyle n_{3}}
as the free index,
n
¯
3
{\textstyle {\bar {n}}_{3}}
, and identify the linear equations.
5
n
2
∗
+
3
n
¯
3
+
1
=
0
,
n
1
∗
+
n
2
∗
+
n
¯
3
+
1
/
2
=
0
{\displaystyle 5n_{2}^{\ast }+3{\bar {n}}_{3}+1=0,\ n_{1}^{\ast }+n_{2}^{\ast }+{\bar {n}}_{3}+1/2=0}
A
N
∗
+
A
¯
N
¯
+
C
=
0
{\displaystyle AN^{\ast }+{\bar {A}}{\bar {N}}+C=0}
|
1
1
0
5
|
|
n
1
∗
n
2
∗
|
+
|
1
3
|
|
n
¯
3
|
+
|
1
/
2
1
|
=
0
{\displaystyle {\begin{vmatrix}1&1\\0&5\end{vmatrix}}{\begin{vmatrix}n_{1}^{\ast }\\n_{2}^{\ast }\end{vmatrix}}+{\begin{vmatrix}1\\3\end{vmatrix}}{\begin{vmatrix}{\bar {n}}_{3}\end{vmatrix}}+{\begin{vmatrix}1/2\\1\end{vmatrix}}=0}
Identify series coefficient function and parameters
φ
(
n
1
∗
,
n
2
∗
,
n
¯
3
)
=
1
Γ
(
1
/
2
)
=
1
π
{\displaystyle \varphi (n_{1}^{\ast },n_{2}^{\ast },{\bar {n}}_{3})={\frac {1}{\sqrt {\Gamma (1/2)}}}={\frac {1}{\sqrt {\pi }}}}
det
|
A
|
=
5
{\displaystyle \operatorname {det} |A|=5}
n
1
∗
=
−
2
5
n
¯
3
−
3
10
,
n
2
∗
=
−
3
5
n
¯
3
−
1
5
{\displaystyle n_{1}^{\ast }=-{\frac {2}{5}}{\bar {n}}_{3}-{\frac {3}{10}},\ n_{2}^{\ast }=-{\frac {3}{5}}{\bar {n}}_{3}-{\frac {1}{5}}}
Compute the integral.
∫
0
∞
1
(
1
+
x
3
+
x
5
)
1
/
2
d
x
=
∑
n
¯
3
=
0
∞
(
−
1
)
n
¯
3
n
¯
3
!
det
|
A
|
−
1
Γ
(
−
n
1
∗
)
Γ
(
−
n
2
∗
)
φ
(
n
1
∗
,
n
2
∗
,
n
¯
3
)
=
∑
n
¯
3
=
0
∞
(
−
1
)
n
¯
3
n
¯
3
!
Γ
(
2
5
n
¯
3
+
3
10
)
Γ
(
3
5
n
¯
3
+
1
5
)
5
π
{\displaystyle {\begin{aligned}&\int _{0}^{\infty }{\frac {1}{(1+x^{3}+x^{5})^{1/2}}}\ dx\\&=\sum _{{\bar {n}}_{3}=0}^{\infty }{\frac {(-1)^{{\bar {n}}_{3}}}{{\bar {n}}_{3}!}}\operatorname {det} |A|^{-1}\Gamma (-n_{1}^{\ast })\Gamma (-n_{2}^{\ast })\varphi (n_{1}^{\ast },n_{2}^{\ast },{\bar {n}}_{3})\\&=\sum _{{\bar {n}}_{3}=0}^{\infty }{\frac {(-1)^{{\bar {n}}_{3}}}{{\bar {n}}_{3}!}}{\frac {\Gamma ({\frac {2}{5}}{\bar {n}}_{3}+{\frac {3}{10}})\Gamma ({\frac {3}{5}}{\bar {n}}_{3}+{\frac {1}{5}})}{5{\sqrt {\pi }}}}\end{aligned}}}
Citations [ edit ] References [ edit ]
Amdeberhan, Tewodros; Gonzalez, Ivan; Harrison, Marshall; Moll, Victor H.; Straub, Armin (2012). "Ramanujan's Master Theorem". The Ramanujan Journal . 29 (1–3): 103–120. CiteSeerX 10.1.1.232.8448 doi :10.1007/s11139-011-9333-y . S2CID 8886049 . Ananthanarayan, B.; Banik, Sumit; Friot, Samuel; Pathak, Tanay (2023). "Method of Brackets: Revisiting a technique for calculating Feynman integrals and certain definite integrals" . Physical Review D . 108 (8). Berndt, B. (1985). Ramanujan's Notebooks, Part I . New York: Springer-Verlag. Glaisher, J.W.L. (1874). "A new formula in definite integrals". The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science . 48 (315): 53–55. doi :10.1080/14786447408641072 . González, Iván; Moll, V.H.; Schmidt, Iván (2011). "A generalized Ramanujan Master Theorem applied to the evaluation of Feynman diagrams". arXiv :1103.0588 math-ph ]. Gonzalez, Ivan; Moll, Victor H. (2010). "Definite integrals by the method of brackets. Part 1,". Advances in Applied Mathematics . 45 (1): 50–73. doi :10.1016/j.aam.2009.11.003 . Gonzalez, Ivan; Kohl, Karen; Jiu, Lin; Moll, Victor H. (1 January 2017). "An extension of the method of brackets. Part 1" . Open Mathematics . 15 (1): 1181–1211. doi :10.1515/math-2017-0100 . ISSN 2391-5455 . Gonzalez, Ivan; Kohl, Karen; Jiu, Lin; Moll, Victor H. (March 2018). "The Method of Brackets in Experimental Mathematics". Frontiers in Orthogonal Polynomials and q -Series ISBN 978-981-322-887-0 Gonzalez, Ivan; Jiu, Lin; Moll, Victor H. (2020). "An extension of the method of brackets. Part 2" . Open Mathematics . 18 (1): 983–995. arXiv :1707.08942 doi :10.1515/math-2020-0062 ISSN 2391-5455 . Gonzalez, Ivan; Kondrashuk, Igor; Moll, Victor H.; Recabarren, Luis M. (2022). "Mellin–Barnes integrals and the method of brackets" . The European Physical Journal C . 82 (1): 28. doi :10.1140/epjc/s10052-021-09977-x . ISSN 1434-6052 . Hardy, G.H. (1978). Ramanujan: Twelve lectures on subjects suggested by his life and work (3rd ed.). New York, NY: Chelsea. ISBN 978-0-8284-0136-4
External links [ edit ] 
