+44-20-4587-4809Mathematica 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.
| 2021 | 2020 | 2019 | 2018 | |
|---|---|---|---|---|
Year wise published articles |
26 | 15 | 2 | 23 |
Year wise citations received |
60 | 61 | 64 | 53 |
| Journal total citations count | 449 |
| 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 2018 | 10 |
Important citations (1006)
Okur, n. u. r. g. Ü. l., & karahan, v. i. l. d. a. n. (2019). some hermite-hadamard type integral inequalities for s-convex stochastic processes on n-coordinates. communications faculty of sciences university of ankara series a1 mathematics and statistics, 68(2), 1959-73. |
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Materano, j. e., merentes, n., & lopez-valera, m. (2017). on inequalities of hermite-hadamard type for stochastic processes whose third derivative absolute values are quasi-convex. tamkang journal of mathematics, 48(2), 203-208. |
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Budak, h., sarikaya, m. z., & dahmani, z. (2017, april). chebyshev type inequalities for generalized stochastic fractional integrals. in aip conference proceedings (vol. 1833, no. 1, p. 020007). aip publishing llc. |
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Zhou, h., saleem, m. s., ghafoor, m., & li, j. (2020). generalization of-convex stochastic processes and some classical inequalities. mathematical problems in engineering, 2020. |
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Budak, h., & sarikaya, m. z. (2018). on generalized stochastic fractional integrals and related inequalities. modern stochastics: theory and applications, 5(4), 471-481. |
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Gonzales, l., materano, j., & lopez, m. v. (2016). ostrowski-type inequalities via hconvex stochastic processes. jp j. math. sci, 16, 15-29. |
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Budak, h., & sarikaya, m. z. (2016). a new hermite-hadamard inequality for h-convex stochastic processes. rgmia research report collection, 19, 30. |
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Materano, j., merentes, n., & valera-lópez, m. (2016). on ostrowski’s type inequalities via convex, s-convex and quasi-convex stochastic processes. mathematica aeterna, 6(1), 47-85. |
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Materano, j., merentes, n., & valera-lópez, m. (2015). some estimates on the simpson’s type inequalities through s-convex and quasi-convex stochastic processes. mathematica aeterna, 5(5), 673-705. |
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Li, l., & hao, z. (2017). on hermite–hadamard inequality for $${\varvec {h}} $$ h-convex stochastic processes. aequationes mathematicae, 91(5), 909-920. |
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González, l., merentes, n., & valera-lópez, m. (2015). some estimates on the hermite-hadamard inequality through convex and quasi-convex stochastic processes. mathematica aeterna, 5(5), 745-767. |
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?aferovi?, e. (2018). hijerarhija konveksnih funkcija (doctoral dissertation, university of zagreb. faculty of science. department of mathematics). |
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Lara, t., rangel, n. r., quintero, r., rosales, e., & sánchez, j. l. (2017). on strongly jensen m-convex functions. |
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Kashuri, a. new trapezium inequalities for generalized integral operators pertaining m-convex functions and their applications. |
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Lara, t., merentes, n., & rosales, e. (2020). m-convex functions of higher order. in annales mathematicae silesianae (vol. 34, no. 2, pp. 241-255). |
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Lara, t., & rosales, e. log m-convex functions. |
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Kashuri, a., & araci, s. (2020). integral inequalities for the strongly generalized nonconvex functions. appl. math, 14(2), 1-6. |
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Kashuri, a., raees, m., anwar, m., & farid, g. on some ostrowski type inequalities on fractal sets via generalized strongly m–convex mappings. |
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Noor, m. a., & noor, k. i. (2021). higher order strongly m-convex functions. in nonlinear analysis, differential equations, and applications (pp. 319-339). springer, cham. |
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Feng, x., feng, b., farid, g., bibi, s., xiaoyan, q., & wu, z. (2021). caputo fractional derivative hadamard inequalities for strongly-convex functions. journal of function spaces, 2021. |
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