On Ramanujan's formula for ζ(1/2) and ζ(2m+1)
Abstract
Page 332 of Ramanujan's Lost Notebook contains a compelling identity for ζ(1/2), which has been studied by many mathematicians over the years. On the same page, Ramanujan also recorded the series, align* 1r(1s x) - 1 + 2r(2s x) - 1 + 3r(3s x) - 1 + ·s, align* where s is a positive integer and r-s is any even integer. Unfortunately, Ramanujan doesn't give any formula for it. This series was rediscovered by Kanemitsu, Tanigawa, and Yoshimoto, although they studied it only when r-s is a negative even integer. Recently, Dixit and the second author generalized the work of Kanemitsu et al. and obtained a transformation formula for the aforementioned series with r-s is any even integer. While extending the work of Kanemitsu et al., Dixit and the second author obtained a beautiful generalization of Ramanujan's formula for odd zeta values. In the current paper, we investigate transformation formulas for an infinite series, and interestingly, we derive Ramanujan's formula for ζ(1/2), Wigert's formula for ζ(1/k) as well as Ramanujan's formula for ζ(2m+1). Furthermore, we obtain a new identity for ζ(-1/2) in the spirit of Ramanujan.
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