Erratum and Addendum to: Rediscovery of Malmsten’s integrals, their evaluation by contour integration methods and some related results [Ramanujan J. (2014), 35:21–110]

@article{Blagouchine2017ErratumAA,
  title={Erratum and Addendum to: Rediscovery of Malmsten’s integrals, their evaluation by contour integration methods and some related results [Ramanujan J. (2014), 35:21–110]},
  author={Iaroslav V. Blagouchine},
  journal={The Ramanujan Journal},
  year={2017},
  volume={42},
  pages={777-781}
}
The historical analysis of functional Eqs. (20)–(22) on pp. 35–37 is far fromexhaustive. In order to give a larger vision of this subject, several complimentary remarks may be needed. First, on p. 37, lines 1–5, the text “By the way, the above reflection formula (21) for L(s)was also obtained by Oscar Schlömilch; in 1849 he presented it as an exercise for students [55], and then, in 1858, he published the proof [56]. Yet, it should be recalled that an analog of formula (20) for the alternating… 
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Computing Stieltjes constants using complex integration
TLDR
This appears to be the first algorithm for Stieltjes constants with uniformly low complexity with respect to both $n$ and $p$.

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