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Lerch zeta function

(Redirected from Lerch transcendant)

In mathematics, the Lerch zeta function is a special function that generalizes the Hurwitz zeta function and the polylogarithm. It is given by

$L(\lambda, \alpha, s) = \sum_{n=0}^\infty \frac { \exp (2\pi i\lambda n)} {(n+\alpha)^s}$

The Lerch zeta is related to the Lerch Transcendent, which is given by

$\Phi(z, s, \alpha) = \sum_{n=0}^\infty \frac { z^n} {(n+\alpha)^s}$

by

Φ(exp(2π i λ), s,α) = L (λ,α, s)

The Hurwitz zeta function is a special case, given by

ζ(s,α) = L (0,α, s) = Φ(1, s,α)

The polylogarithm is a special case of the Lerch Zeta, given by

Li s (x) = z Φ(z, s,1)

The Legendre chi function is a special case, given by

χ n (z) = 2 - n z Φ(z 2, n,1 / 2)

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Categories: Zeta functions

01-04-2007 01:30:44
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