![On the harmonic number expansion by Ramanujan | Journal of Inequalities and Applications | Full Text On the harmonic number expansion by Ramanujan | Journal of Inequalities and Applications | Full Text](https://media.springernature.com/full/springer-static/image/art%3A10.1186%2F1029-242X-2013-222/MediaObjects/13660_2012_Article_679_Equa_HTML.gif)
On the harmonic number expansion by Ramanujan | Journal of Inequalities and Applications | Full Text
arXiv:0707.3950v1 [math.CA] 26 Jul 2007 Ramanujan's Harmonic Number Expansion into NegativePowers of a Triangular Number
![PDF] Contributions to the theory of special functions and number theory motivated by works of Srinivasa Ramanujan by D. D. Somashekara · 3194162449 · OA.mg PDF] Contributions to the theory of special functions and number theory motivated by works of Srinivasa Ramanujan by D. D. Somashekara · 3194162449 · OA.mg](https://og.oa.mg/Contributions%20to%20the%20theory%20of%20special%20functions%20and%20number%20theory%20motivated%20by%20works%20of%20Srinivasa%20Ramanujan.png?author=%20D.%20D.%20Somashekara)
PDF] Contributions to the theory of special functions and number theory motivated by works of Srinivasa Ramanujan by D. D. Somashekara · 3194162449 · OA.mg
![Mathematics | Free Full-Text | Overview in Summabilities: Summation Methods for Divergent Series, Ramanujan Summation and Fractional Finite Sums Mathematics | Free Full-Text | Overview in Summabilities: Summation Methods for Divergent Series, Ramanujan Summation and Fractional Finite Sums](https://www.mdpi.com/mathematics/mathematics-09-02963/article_deploy/html/images/mathematics-09-02963-g001.png)
Mathematics | Free Full-Text | Overview in Summabilities: Summation Methods for Divergent Series, Ramanujan Summation and Fractional Finite Sums
![Further Ramanujan-like series containing harmonic numbers and squared binomial coefficients | SpringerLink Further Ramanujan-like series containing harmonic numbers and squared binomial coefficients | SpringerLink](https://media.springernature.com/lw685/springer-static/image/art%3A10.1007%2Fs11139-019-00140-5/MediaObjects/11139_2019_140_Figc_HTML.png)
Further Ramanujan-like series containing harmonic numbers and squared binomial coefficients | SpringerLink
![PDF) Harmonic number identities and Hermite–Padé approximations to the logarithm function | Wenchang Chu - Academia.edu PDF) Harmonic number identities and Hermite–Padé approximations to the logarithm function | Wenchang Chu - Academia.edu](https://0.academia-photos.com/attachment_thumbnails/44264013/mini_magick20190214-20715-iitsu0.png?1550204283)