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Pannon."},{"key":"ref_2","first-page":"221","article-title":"Aufgabe \u03b2 16","volume":"29","author":"Seiffert","year":"1995","journal-title":"Wurzel"},{"key":"ref_3","first-page":"176","article-title":"Problem 887","volume":"11","author":"Seiffert","year":"1993","journal-title":"Nieuw Arch. Wiskd."},{"key":"ref_4","doi-asserted-by":"crossref","first-page":"6","DOI":"10.1155\/2013\/832591","article-title":"Bounds of the Neuman\u2013S\u00e1ndor mean using power and identric means","volume":"2013","author":"Chu","year":"2013","journal-title":"Abstr. Appl. Anal."},{"key":"ref_5","doi-asserted-by":"crossref","first-page":"13","DOI":"10.1186\/1029-242X-2013-10","article-title":"Sharp bounds for Seiffert and Neuman\u2013S\u00e1ndor means in terms of generalized logarithmic means","volume":"2013","author":"Chu","year":"2013","journal-title":"J. Inequal. Appl."},{"key":"ref_6","first-page":"7","article-title":"Two sharp double inequalities for Seiffert mean","volume":"2011","author":"Chu","year":"2011","journal-title":"J. Inequal. Appl."},{"key":"ref_7","doi-asserted-by":"crossref","first-page":"429","DOI":"10.7153\/jmi-05-37","article-title":"Optimal convex combination bounds of Seiffert and geometric means for the arithmetic mean","volume":"5","author":"Chu","year":"2011","journal-title":"J. Math. Inequal."},{"key":"ref_8","doi-asserted-by":"crossref","first-page":"593","DOI":"10.7153\/jmi-06-57","article-title":"Some sharp inequalities involving reciprocals of the Seiffert and other means","volume":"6","author":"Jiang","year":"2012","journal-title":"J. Math. Inequal."},{"key":"ref_9","doi-asserted-by":"crossref","first-page":"134","DOI":"10.1007\/s10998-014-0057-9","article-title":"Sharp bounds for Neuman-S\u00e1ndor\u2019s mean in terms of the root-mean-square","volume":"69","author":"Jiang","year":"2014","journal-title":"Period. Math. Hungar."},{"key":"ref_10","doi-asserted-by":"crossref","first-page":"7","DOI":"10.1080\/23311835.2014.995951","article-title":"Sharp bounds for the Neuman-S\u00e1ndor mean in terms of the power and contraharmonic means","volume":"2","author":"Jiang","year":"2015","journal-title":"Cogent Math."},{"key":"ref_11","doi-asserted-by":"crossref","first-page":"567","DOI":"10.7153\/jmi-06-54","article-title":"Sharp bounds for the Neuman-S\u00e1ndor mean in terms of generalized logarithmic mean","volume":"6","author":"Li","year":"2012","journal-title":"J. Math. Inequal."},{"key":"ref_12","doi-asserted-by":"crossref","first-page":"9","DOI":"10.1155\/2011\/686834","article-title":"The optimal convex combination bounds for Seiffert\u2019s mean","volume":"2011","author":"Liu","year":"2011","journal-title":"J. Inequal. Appl."},{"key":"ref_13","doi-asserted-by":"crossref","first-page":"637","DOI":"10.7153\/jmi-06-62","article-title":"A note on a certain bivariate mean","volume":"6","author":"Neuman","year":"2012","journal-title":"J. Math. Inequal."},{"key":"ref_14","doi-asserted-by":"crossref","first-page":"601","DOI":"10.7153\/jmi-05-52","article-title":"Inequalities for the Schwab-Borchardt mean and their applications","volume":"5","author":"Neuman","year":"2011","journal-title":"J. Math. Inequal."},{"key":"ref_15","doi-asserted-by":"crossref","first-page":"665","DOI":"10.18514\/MMN.2014.1176","article-title":"A unified proof of inequalities and some new inequalities involving Neuman\u2013S\u00e1ndor mean","volume":"15","author":"Qi","year":"2014","journal-title":"Miskolc Math. Notes"},{"key":"ref_16","first-page":"4363","article-title":"Optimal bounds for the Neuman-S\u00e1ndor means in terms of geometric and contraharmonic means","volume":"7","author":"Sun","year":"2013","journal-title":"Appl. Math. Sci. (Ruse)"},{"key":"ref_17","doi-asserted-by":"crossref","first-page":"287","DOI":"10.7153\/jmi-08-20","article-title":"A note on the Neuman-S\u00e1ndor mean","volume":"8","author":"Sun","year":"2014","journal-title":"J. Math. Inequal."},{"key":"ref_18","doi-asserted-by":"crossref","first-page":"115","DOI":"10.33993\/jnaat422-987","article-title":"Sharp inequalities for the Neuman-S\u00e1ndor mean in terms of arithmetic and contra-harmonic means","volume":"42","author":"Wang","year":"2013","journal-title":"Rev. Anal. Num\u00e9r. Th\u00e9or. Approx."},{"key":"ref_19","doi-asserted-by":"crossref","first-page":"551","DOI":"10.1360\/012013-128","article-title":"A sharp double inequality involving identric, Neuman-S\u00e1ndor, and quadratic means","volume":"43","author":"Zhao","year":"2013","journal-title":"Sci. Sin. Math."},{"key":"ref_20","doi-asserted-by":"crossref","first-page":"9","DOI":"10.1155\/2012\/302635","article-title":"Optimal bounds for Neuman-S\u00e1ndor mean in terms of the convex cobinations of harmonic, geometric, quadratic, and contra-harmonic means","volume":"2012","author":"Zhao","year":"2012","journal-title":"Abstr. Appl. Anal."},{"key":"ref_21","first-page":"49","article-title":"On the Schwab-Borchardt mean II","volume":"17","author":"Neuman","year":"2006","journal-title":"Math. Pannon."},{"key":"ref_22","doi-asserted-by":"crossref","first-page":"285","DOI":"10.4169\/college.math.j.43.4.285","article-title":"The hyperbolic sine cardinal and the catenary","volume":"43","year":"2012","journal-title":"Coll. Math. J."},{"key":"ref_23","doi-asserted-by":"crossref","unstructured":"Li, W.-H., Miao, P., and Guo, B.-N. (2022). Bounds for the Neuman\u2013S\u00e1ndor mean in terms of the arithmetic and contra-harmonic means. Axioms, 11.","DOI":"10.3390\/axioms11050236"},{"key":"ref_24","unstructured":"Anderson, G.D., Vamanamurthy, M.K., and Vuorinen, M. (1997). Conformal Invariants, Inequalities, and Quasiconformal Maps, John Wiley & Sons."},{"key":"ref_25","first-page":"11","article-title":"Landen inequalities for zero-balanced hypergeometric function","volume":"2012","author":"Vuorinen","year":"2012","journal-title":"Abstr. Appl. Anal."},{"key":"ref_26","doi-asserted-by":"crossref","unstructured":"Temme, N.M. (1996). Special Functions: An Introduction to Classical Functions of Mathematical Physics, publisher-name>John Wiley & Sons, Inc.","DOI":"10.1002\/9781118032572"},{"key":"ref_27","doi-asserted-by":"crossref","first-page":"1","DOI":"10.1016\/j.cam.2018.10.049","article-title":"A double inequality for the ratio of two non-zero neighbouring Bernoulli numbers","volume":"351","author":"Qi","year":"2019","journal-title":"J. Comput. Appl. Math."},{"key":"ref_28","first-page":"2","article-title":"On signs of certain Toeplitz\u2013Hessenberg determinants whose elements involve Bernoulli numbers","volume":"17","author":"Qi","year":"2022","journal-title":"Contrib. Discrete Math."},{"key":"ref_29","first-page":"12","article-title":"Logarithmic convexity and increasing property of the Bernoulli numbers and their ratios","volume":"115","author":"Shuang","year":"2021","journal-title":"Rev. R. Acad. Cienc. Exactas F\u00eds. Nat. Ser. A Mat."},{"key":"ref_30","unstructured":"Qi, F., and Taylor, P. (2022). Several series expansions for real powers and several formulas for partial Bell polynomials of sinc and sinhc functions in terms of central factorial and Stirling numbers of second kind. arXiv."},{"key":"ref_31","unstructured":"Abramowitz, M., and Stegun, I.A. (1972). Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables, Dover Publications."},{"key":"ref_32","unstructured":"Jeffrey, A. (2004). Handbook of Mathematical Formulas and Integrals, Elsevier Academic Press. [3rd ed.]."},{"key":"ref_33","doi-asserted-by":"crossref","first-page":"2","DOI":"10.2298\/AADM210401017G","article-title":"Maclaurin\u2019s series expansions for positive integer powers of inverse (hyperbolic) sine and tangent functions, closed-form formula of specific partial Bell polynomials, and series representation of generalized logsine function","volume":"16","author":"Guo","year":"2022","journal-title":"Appl. Anal. Discrete Math."},{"key":"ref_34","doi-asserted-by":"crossref","first-page":"7494","DOI":"10.3934\/math.2021438","article-title":"Series expansions of powers of arcsine, closed forms for special values of Bell polynomials, and series representations of generalized logsine functions","volume":"6","author":"Guo","year":"2021","journal-title":"AIMS Math."},{"key":"ref_35","doi-asserted-by":"crossref","unstructured":"Qi, F. (2021). Explicit Formulas for Partial Bell Polynomials, Maclaurin\u2019s Series Expansions of Real Powers of Inverse (Hyperbolic) Cosine and Sine, and Series Representations of Powers of Pi, Research Square.","DOI":"10.21203\/rs.3.rs-959177\/v3"},{"key":"ref_36","doi-asserted-by":"crossref","unstructured":"Qi, F. (2021). Taylor\u2019s series expansions for real powers of functions containing squares of inverse (hyperbolic) cosine functions, explicit formulas for special partial Bell polynomials, and series representations for powers of circular constant. arXiv.","DOI":"10.1515\/dema-2022-0157"}],"container-title":["Axioms"],"original-title":[],"language":"en","link":[{"URL":"https:\/\/www.mdpi.com\/2075-1680\/11\/7\/304\/pdf","content-type":"unspecified","content-version":"vor","intended-application":"similarity-checking"}],"deposited":{"date-parts":[[2025,10,10]],"date-time":"2025-10-10T23:38:19Z","timestamp":1760139499000},"score":1,"resource":{"primary":{"URL":"https:\/\/www.mdpi.com\/2075-1680\/11\/7\/304"}},"subtitle":[],"short-title":[],"issued":{"date-parts":[[2022,6,23]]},"references-count":36,"journal-issue":{"issue":"7","published-online":{"date-parts":[[2022,7]]}},"alternative-id":["axioms11070304"],"URL":"https:\/\/doi.org\/10.3390\/axioms11070304","relation":{},"ISSN":["2075-1680"],"issn-type":[{"type":"electronic","value":"2075-1680"}],"subject":[],"published":{"date-parts":[[2022,6,23]]}}}