[3] J. Sándor, Some diophantine equations for particular arithmetic functions (Romanian), Seminarul de t. structurilor, Univ. Timi¸soara, 53 (1989), 1-10.Search in Google Scholar

[4] J. Sándor, D. S. Mitrinović, B. Crstici, Handbook of number theory I., Springer Verlag, 2006 (first ed. by Kluwer Acad. Publ., 1995).Search in Google Scholar

[5] J. Sándor, On an arithmetic inequality, Anal. S¸t. Univ. Ovidius Constant¸a, 22 (1) (2014), 257-261.10.2478/auom-2014-0021Search in Google Scholar

[6] J. Sándor, On certain inequalities for σ, ϕ, ψ and related functions, Notes Number Th. Discr. Math., 20 (2) (2014), 52-60.Search in Google Scholar

[7] J. Sándor, On an inequality of Klamkin with arithmetical applications, Int. J. Math. Ed. Sci. Techn., 25 (1994), 157-158.Search in Google Scholar

[8] J. Sándor, On an inequality of Klamkin, Proc. Jangjeon Math. Soc., 13 (2010), 49-54.Search in Google Scholar

[9] J. Sándor, Two arithmetic inequalities, Adv. Stud. Contemp. Math., 20 (2) (2010), 197-202.Search in Google Scholar

[10] J. Sándor, L. Kovács, A note on the arithmetical functions d(n) and σ(n), Octogon Math. Mag., 16 (1A) (2008), 270-274.Search in Google Scholar

[11] J. Sándor, L. Kovács, On an arithmetic inequality by K. T. Atanassov, Proc. Jangjeon Math. Soc., 13 (3) (2010), 313-319.Search in Google Scholar

[12] K. T. Atanassov, Note on ϕ, ψ and σ-functions. Part 7, Notes Number Th. Discr. Math., 20 (3) (2014), 50-53. Search in Google Scholar

eISSN:: 2066-7752
Language:: English

Publication timeframe:: 2 times per year
Journal Subjects:: Mathematics, General Mathematics

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On certain upper bounds for the sum of divisors function σ(n)

Published Online: Feb 09, 2016

Page range: 265 - 277

Received: Feb 09, 2015

DOI: https://doi.org/10.1515/ausm-2015-0018

Keywordsarithmetic functions, inequalities

© 2016

This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 License.

Keywords
arithmetic functions, inequalities