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Ramanujan's master theorem

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Ramanujan's master theorem

In mathematics, Ramanujan's master theorem (named after mathematician Srinivasa Ramanujan) is a technique that provides an analytic expression for the Mellin transform of an analytic function.

Contents

The result is stated as follows:

If a complex-valued function f ( x ) has an expansion of the form

f ( x ) = k = 0 ϕ ( k ) k ! ( x ) k

then the Mellin transform of f ( x ) is given by

0 x s 1 f ( x ) d x = Γ ( s ) ϕ ( s )

where Γ ( s ) is the 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 J. W. L. Glaisher.

Alternative formalism

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 )

which gets converted to the above form after substituting λ ( n ) = ϕ ( n ) Γ ( 1 + n ) and using the functional equation for the gamma function.

The integral above is convergent for 0 < Re ( s ) < 1 .

Proof

The proof of Ramanujan's Master Theorem provided by G. H. Hardy employs the Cauchy's residue theorem and the well-known Mellin inversion theorem.

Application to Bernoulli polynomials

The generating function of the Bernoulli polynomials B k ( x ) is given by:

z e x z e z 1 = k = 0 B k ( x ) z k k !

These polynomials are given in terms of Hurwitz zeta function:

ζ ( s , a ) = n = 0 1 ( n + a ) s

by ζ ( 1 n , a ) = B n ( a ) n for n 1 . By means of Ramanujan master theorem and generating function of Bernoulli polynomials one will have following integral representation:

0 x s 1 ( e a x 1 e x 1 x ) d x = Γ ( s ) ζ ( s , a )

valid for 0 < Re ( s ) < 1 .

Application to the Gamma function

Weierstrass's definition of the Gamma function

Γ ( x ) = e γ x x n = 1 ( 1 + x n ) 1 e x / n

is equivalent to expression

log Γ ( 1 + x ) = γ x + k = 2 ζ ( k ) k ( x ) k

where ζ ( k ) is the 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

valid for 0 < R e ( s ) < 1 .

Special cases of s = 1 2 and s = 3 4 are

0 γ x + log Γ ( 1 + x ) x 5 / 2 d x = 2 π 3 ζ ( 3 2 ) 0 γ x + log Γ ( 1 + x ) x 9 / 4 d x = 2 4 π 5 ζ ( 5 4 )

Mathematica 7 is unable to compute these examples.

References

Ramanujan's master theorem Wikipedia
(Text) CC BY-SA


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