Lerch's Φ and the Polylogarithm at the Positive Integers
Abstract
We review the closed forms of the partial Fourier sums associated with k(n) from a previous paper and create an asymptotic expression for (n) as a way to obtain formulae for the full Fourier series (if |b|<1, one obtains a surprising pattern, (n) H(n)-Σk 2(-1)kζ(k)bk-1). Finally, the derived Fourier series formulae are used to obtain a formula for the Lerch transcendent function, Φ(ez,k,b), and by extension the polylogarithm, Lik(ez), at the positive integers k.
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