+44-77-2385-9429Mathematica Eterna : Citations & Metrics Report
Articles published in Mathematica Eterna have been cited by esteemed scholars and scientists all around the world. Mathematica Eterna has got h-index 11, which means every article in Mathematica Eterna has got 11 average citations.
Following are the list of articles that have cited the articles published in Mathematica Eterna.
| 2024 | 2023 | 2022 | 2021 | 2020 | 2019 | 2018 | 2017 | |
|---|---|---|---|---|---|---|---|---|
Total published articles |
31 | 36 | 20 | 26 | 15 | 2 | 23 | 36 |
Conference proceedings |
0 | 0 | 0 | 0 | 0 | 0 | 0 | 0 |
Citations received as per Google Scholar, other indexing platforms and portals |
109 | 161 | 184 | 183 | 194 | 184 | 176 | 129 |
| Journal total citations count | 1892 |
| Journal impact factor | 4.13 |
| Journal 5 years impact factor | 4.25 |
| Journal cite score | 3.35 |
| Journal h-index | 11 |
| Journal h-index since 2019 | 10 |
Important citations (1006)
gong wm, shao zh, qian wm, chu ym. optimal lehmer mean bounds for the neuman-sándor mean. pacific journal of applied mathematics. 2014 oct 1;6(4):243. |
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li wh, qi f. a unified proof of inequalities and some new inequalities involving neuman-s\'andor mean. arxiv preprint arxiv:1312.3500. 2013 dec 12. |
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huang hy, wang n, long by. optimal bounds for neuman-sándor mean in terms of the geometric convex combination of two seiffert means. journal of inequalities and applications. 2016 dec;2016(1):14. |
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sun h, zhao th, chu ym, liu by. a note on the neuman–sándor mean. j. math. inequal. 2014 jun 1;8(2):287-97. |
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zhang f, chu ym, qian wm. bounds for the arithmetic mean in terms of the neuman-sándor and other bivariate means. journal of applied mathematics. 2013;2013. |
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neuman e. on a new family of bivariate means. j. math. inequal. 2017 sep 1;11(3):673-81. |
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yuming ch, tiehong zh, yingqing so. sharp bounds for neuman-sándor mean in terms of the convex combination of quadratic and first seiffert means. acta mathematica scientia. 2014 may 1;34(3):797-806. |
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qi f, li wh. a unified proof of several inequalities and some new inequalities involving neuman-sándor mean. miskolc mathematical notes. 2014;15(2):665-75. |
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xia w, chu y. optimal inequalities between neuman–sándor, centroidal and harmonic means. j. math. inequal. 2013 dec 1;7(4):593-600. |
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qian wm, chu ym. optimal bounds for neuman means in terms of geometric, arithmetic and quadratic means. journal of inequalities and applications. 2014 dec 1;2014(1):175. |
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neuman ed. inequalities involving certain bivariate means. bull. internat. math. virtual inst. 2013;3:49-57. |
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qian wm, chu ym. on certain inequalities for neuman-sándor mean. inabstr. appl. anal 2013 jan 1. |
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chu ym, qian wm. refinements of bounds for neuman means. inabstract and applied analysis 2014 (vol. 2014). hindawi. |
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yang zh. estimates for neuman-sándor mean by power means and their relative errors. j. math. inequal. 2013 dec 1;7(4):711-26. |
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neuman e. sharp inequalities involving neuman-sándor and logarithmic means. j. math. inequal. 2013 sep 1;7(3):413-9. |
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he zy, qian wm, jiang yl, song yq, chu ym. bounds for the combinations of neuman-sándor, arithmetic, and second seiffert means in terms of contraharmonic mean. inabstr. appl. anal 2013 jan 1 (p. 903982). |
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zhao th, chu ym, jiang yl, li ym. best possible bounds for neuman-sándor mean by the identric, quadratic and contraharmonic means. inabstract and applied analysis 2013 (vol. 2013). hindawi. |
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he zy, chu ym, wang mk. optimal bounds for neuman means in terms of harmonic and contraharmonic means. journal of applied mathematics. 2013;2013. |
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he zy, chu ym, wang mk. optimal bounds for neuman means in terms of harmonic and contraharmonic means. journal of applied mathematics. 2013;2013. |
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khan ma, begum s, khurshid y, chu ym. ostrowski type inequalities involving conformable fractional integrals. journal of inequalities and applications. 2018 dec;2018(1):70. |
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