Lambert summation method

A summation method for summing series of complex numbers which assigns a sum to certain divergent series: it is regular in that it assigns the sum in the usual sense to any convergent series (an Abelian theorem). The series $$ \sum_{n=1}^\infty a_n $$ is summable by Lambert's method to the number $A$, written ${} = A \ \mathrm{(L)}$ if $$ \lim_{y \searrow 0} F(y) = A $$ where $$ F(y) = \sum_{n=1}^\infty a_n \frac{n y \exp(-ny)}{1-\exp(-ny)} $$ for $y>0$, if the series on the right-hand side converges. The method was proposed by J.H. Lambert [1]. The summability of a series by the Cesàro summation method $(C,k)$ for some $k > -1$ (cf. Cesàro summation methods) to the sum $A$ implies its summability by the Lambert method to the same sum, and if the series is summable by the Lambert method to the sum $A$, then it is also summable by the Abel summation method to the same sum.

As an example, $$ \sum_{n=0}^\infty \frac{\mu(n)}{n} = 0\ \mathrm{(L)} $$ where $\mu$ is the Möbius function. Hence if this series converges at all, it converges to zero.

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