Euler's formula for zeta(2n) and Cauchy variables
Abstract
Euler's formulae for zeta(2n) are recovered from the computation in two dierent manners of the even moments of log(|C1C2|), for C1 and C2 two independent standard Cauchy variables. The method employed is generalized first to the L function associated to the character chi(4) and then to other trigonometric series.
Domains
Probability [math.PR]
Origin : Files produced by the author(s)
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