Reverse Hölder inequality and Fibonacci numbers
Resumen
In this paper we present reverse Hölder-type inequalities with power sums . We apply these results to sums involving Fibonacci numbers.
Descargas
Citas
H. Alzer, F. Luca, An inequality for the Fibonacci numbers, Math. Bohem. 147, 587-590, (2022).
H. Alzer, M. K. Kwong, Extension of an Inequality for Fibonacci Numbers, Integers 22, Paper No. A85, (2022).
A. Dujella, J. Jakšetic, J. Pecaric, Fibonacci numbers and Hölder inequality , Bull. Transilv. Univ. Brasov Ser. III, to appear.
R. P. Grimaldi, Fibonacci and Catalan numbers, John Wiley & Sons, Inc., Hoboken, NJ, (2012).
G. H. Hardy, J. E. Littlewood, G. Polya, Inequalities, 2nd ed. Cambridge Univ. Press, (1934).
D. S. Mitrinovic, J. E. Pecaric, A. M. Fink, Classical and New Inequalities in Analysis, Kluwer Academic, Dordrecht, (1993).
M. Nagy, S. R. Cowell, V. Beiu, Survey of Cubic Fibonacci Identities When Cuboids Carry Weight, International Journal of Computers Communications & Control, 17(2), (2022).
H. Ohtsuka, S. Nakamura, A new formula for the sum of the sixth powers of Fibonacci numbers, Congressus Numerantium, Proceedings of the thirteenth conference on Fibonacci numbers and their applications 201, 297—300, (2010).
P. G. Popescu, J. L. Díaz-Barrero, Certain inequalities for convex functions, J. Inequal. Pure Appl. Math. 7(2), Article 41, (2006).
K. G. Recke, Problem B - 153, The Fibonacci Quarterly, 7(3) (1969).
W. T. Sulaiman, Reverses of Minkowski’s, Hölder’s, and Hardy’s Integral Inequalities, International Journal of Modern Mathematical Sciences, 1(1), 14–24, (2012).
Derechos de autor 2025 Boletim da Sociedade Paranaense de Matemática
Esta obra está bajo licencia internacional Creative Commons Reconocimiento 4.0.
When the manuscript is accepted for publication, the authors agree automatically to transfer the copyright to the (SPM).
The journal utilize the Creative Common Attribution (CC-BY 4.0).
