Popoviciu's inequality
In convex analysis, Popoviciu's inequality is an inequality about convex functions. It is similar to Jensen's inequality and was found in 1965 by Tiberiu Popoviciu,[1][2] a Romanian mathematician.
Formulation
Let f be a function from an interval to . If f is convex, then for any three points x, y, z in I,
If a function f is continuous, then it is convex if and only if the above inequality holds for all x, y, z from . When f is strictly convex, the inequality is strict except for x = y = z.[3]
Generalizations
It can be generalized to any finite number n of points instead of 3, taken on the right-hand side k at a time instead of 2 at a time:[4]
Let f be a continuous function from an interval to . Then f is convex if and only if, for any integers n and k where n ≥ 3 and , and any n points from I,
Weighted inequality
Popoviciu's inequality can also be generalized to a weighted inequality.[9]
Let f be a continuous function from an interval to . Let be three points from , and let be three nonnegative reals such that and . Then,
Notes
- Tiberiu Popoviciu (1965), "Sur certaines inégalités qui caractérisent les fonctions convexes", Analele ştiinţifice Univ. "Al.I. Cuza" Iasi, Secţia I a Mat., 11: 155–164
- Popoviciu's paper has been published in Romanian language, but the interested reader can find his results in the review Zbl 0166.06303. Page 1 Page 2
- Constantin Niculescu; Lars-Erik Persson (2006), Convex functions and their applications: a contemporary approach, Springer Science & Business, p. 12, ISBN 978-0-387-24300-9
- J. E. Pečarić; Frank Proschan; Yung Liang Tong (1992), Convex functions, partial orderings, and statistical applications, Academic Press, p. 171, ISBN 978-0-12-549250-8
- P. M. Vasić; Lj. R. Stanković (1976), "Some inequalities for convex functions", Math. Balkanica, no. 6 (1976), pp. 281–288
- Grinberg, Darij (2008). "Generalizations of Popoviciu's inequality". arXiv:0803.2958v1 [math.FA].
- M.Mihai; F.-C. Mitroi-Symeonidis (2016), "New extensions of Popoviciu's inequality", Mediterr. J. Math., Volume 13, vol. 13, no. 5, pp. 3121–3133, arXiv:1507.05304, doi:10.1007/s00009-015-0675-3, ISSN 1660-5446, S2CID 119720352
- M.W. Alomari (2021), "Popoviciu's type inequalities for h-MN-convex functions", e-Journal of Analysis and Applied Mathematics, Volume 2021, vol. 2021, no. 1, pp. 48–89, doi:10.2478/ejaam-2021-0005
- Darij Grinberg, Generalizations of Popoviciu’s inequality (PDF)