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Arab Journal of Basic and Applied Sciences Volume 30, 2023 - Issue 1
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Original Article

Interval valued Jensen’s inequalities for h-convex functions on time scales

Ammara Nosheena Department of Mathematics, University of Sargodha, Sargodha, Pakistan
,
Sadaf Nawazb Department of Mathematics, Lahore Institute of Modern Sciences Sargodha, Sargodha, Pakistan
,
Khuram Ali Khana Department of Mathematics, University of Sargodha, Sargodha, Pakistan
&
Rostin Matendo Mabelac Department of Maths and Computer Science, Faculty of Science, University of Kinshasa, Kinshasa, D. R. CongoCorrespondence[email protected]
Pages 341-353 | Received 26 Apr 2022, Accepted 06 May 2023, Published online: 31 May 2023

References

  • Agarwal, R., Bohner, M., & Peterson, A. (2001). Inequalities on time scales: A survey. Mathematical Inequalities & Applications, 21(4), 535–557. doi:10.7153/mia-04-48
  • Ammi, M. R. S., Ferreira, R. A. C., & Torres, D. F. M. (2008). Diamond-a Jensen’s inequality on time scales. Journal of Inequalities and Applications, 2008, 576876.
  • An, Y., Ye, G., Zhao, D., & Liu, W. (2019). Hermite-Hadamard type inequalities for interval (h1, h2)-convex functions. Mathematics, 7(5), 436. doi:10.3390/math7050436
  • Andrić, M. (2021). Jensen-type inequalities for (h, g; m)-convex functions. Mathematics, 9(24), 3312. doi:10.3390/math9243312
  • Awan, M. U., Noor, M. A., Noor, K. I., & Safdar, F. (2017). On strongly generalized convex functions. Filomat, 31(18), 5783–5790. doi:10.2298/FIL1718783A
  • Bohner, M., & Warth, H. (2007). The Beverton–Holt dynamic equation. Applicable Analysis, 86(8), 1007–1015. doi:10.1080/00036810701474140
  • Cabrerizo, M. J., & Marañón, E. (2022). Net effect of environmental fluctuations in multiple global-change drivers across the tree of life. PNAS, Ecology, 119(32), e2205495119.
  • Chalco-Cano, Y., Flores-Franulič, A., & Román-Flores, H. (2012). Ostrowski type inequalities for interval-valued functions using generalized Hukuhara derivative. Computational & Applied Mathematics, 31, 457–472.
  • Dinghas, A. (1956). Zum minkowskischen integralbegriff abgeschlossener mengen. Mathematische Zeitschrift, 66(1), 173–188. doi:10.1007/BF01186606
  • Dinu, C. (2008). Convex functions on time scales. Analele Universitatii din Craiova. Seria Matematica Informatica, 35, 87–96.
  • Dinu, C. (2008). Hermite-Hadamard inequality on time scales. Journal of Inequalities and Applications, 2008(1), 287947. doi:10.1155/2008/287947
  • Dragomir, S. S. (2015). Inequalities of Hermite-Hadamard type for h-convex functions on linear spaces. Proyecciones (Antofagasta), 34(4), 323–341. doi:10.4067/S0716-09172015000400002
  • Dragomir, S. S., & Keady, G. (1998). A Hadamard-Jensen inequality and an application to the elastic torsion problem. RGMIA Research Report Collection, 1(2), 1–10.
  • Gallego-Posada, J. D., & Puerta-Yepes, M. E. (2018). Internal analysis and optimization applied to parameter estimation under uncertainty. Boletim da Sociedade Paranaense de Matemática, 36(2), 107–124. doi:10.5269/bspm.v36i2.29309
  • Guo, Y., Ye, G., Zhao, D., & Liu, W. (2019). Some integral inequalities for log-h-convex interval-valued functions. IEEE Access, 7, 86739–86745. doi:10.1109/ACCESS.2019.2925153
  • Hilger, S. (1990). Analysis on measure chains–a unified approach to continuous and discrete calculus. Results in Mathematics, 18(1–2), 18–56. doi:10.1007/BF03323153
  • Khan, M. A., Ali, T., & Khan, T. U. (2017). Hermite-Hadamard type inequalities with applications. Fasciculi Mathematici, 59(1), 57–74. doi:10.1515/fascmath-2017-0017
  • Khan, M. B., Srivastava, H. M., Mohammed, P. O., Nonlaopon, K., & Hamed, Y. S. (2022). Some new Jensen, Schur and Hermite-Hadamard inequalities for log convex fuzzy interval-valued functions. AIMS Mathematics, 7, 4338–4358.
  • Lara, T., Merentes, N., & Nikodem, K. (2016). Strong h-convexity and separation theorems. International Journal of Analysis, 2016, 1–5. doi:10.1155/2016/7160348
  • Liu, X., Ye, G., Zhao, D., & Liu, W. (2019). Fractional Hermite–Hadamard type inequalities for interval-valued functions. Journal of Inequalities and Applications, 2019(1), 1–11. doi:10.1186/s13660-019-2217-1
  • Markov, S. (1979). Calculus for interval functions of a real variable. Computing, 22(4), 325–337. doi:10.1007/BF02265313
  • Mohammed, P. O., Ryoo, C. S., Kashuri, A., Hamed, Y. S., & Abualnaja, K. M. (2021). Some Hermite–Hadamard and Opial dynamic inequalities on time scales. Journal of Inequalities and Applications, 2021(1), 1–11. doi:10.1186/s13660-021-02624-9
  • Moore, R. E. (1979). Methods and applications of interval analysis. SIAM.
  • Moore, R. E. (1996). Interval analysis (p. 4). Prentice-Hall Englewood Cliffs.
  • Mughal, A. A., Almusawa, H., Haq, A. U., & Baloch, I. A. (2021). Properties and bounds of Jensen-type functionals via harmonic convex functions. Journal of Mathematics, 2021, 1–13. doi:10.1155/2021/5561611
  • Niculescu, C., & Persson, L.-E. (2006). Convex functions and their applications. Canadian Mathematical Society, Springer.
  • Noor, M. A., Noor, K. I., & Awan, M. U. (2015). A new Hermite-Hadamard type inequality for h-convex functions. Creative Mathematics and Informatics, 24, 191–197.
  • Pečarić, J. E., & Tong, Y. L. (1992). Convex functions, partial orderings, and statistical applications, vol. 187, Mathematics in Science and Engineering. Boston: Academic Press.
  • Rodić, M. (2022). Some generalizations of the Jensen-type inequalities with applications. Axioms, 11(5), 227. doi:10.3390/axioms11050227
  • Ruel, J. J., & Ayres, M. P. (1999). Jensen’s inequality predicts effects of environmental variation. Trends in Ecology & Evolution, 14(9), 361–366. doi:10.1016/s0169-5347(99)01664-x
  • Sarikaya, M. Z., Saglam, A., & Yildirim, H. (2008). On some Hadamard-type inequalities for h-convex functions. Journal of Mathematical Inequalities, 2(3), 335–341. doi:10.7153/jmi-02-30
  • Sheng, Q., Fadag, M., Henderson, J., & Davis, J. M. (2006). An exploration of combined dynamic derivatives on time scales and their applications. Nonlinear Analysis: Real World Applications, 7(3), 395–413. doi:10.1016/j.nonrwa.2005.03.008
  • Stefanini, L. (2010). A generalization of Hukuhara difference and division for interval and fuzzy arithmetic. Fuzzy Sets and Systems, 161(11), 1564–1584. doi:10.1016/j.fss.2009.06.009
  • Yadav, V., Bhurjee, A. K., Karmakar, S., & Dikshit, A. K. (2017). A facility location model for municipal solid waste management system under uncertain environment. Science of the Total Environment, 603–604, 760–771. doi:10.1016/j.scitotenv.2017.02.207
  • Younus, A., Asif, M., & Farhad, K. (2015). On Gronwall type inequalities for interval-valued functions on time scales. Journal of Inequalities and Applications, 2015(1), 1–18. doi:10.1186/s13660-015-0797-y
  • Zalinescu, C. (2002). Convex analysis in general vector spaces, World Scientific. doi:10.1142/5021
  • Zhao, D., An, T., Ye, G., & Liu, W. (2018). New Jensen and Hermite–Hadamard type inequalities for h-convex interval-valued functions. Journal of Inequalities and Applications, 2018(1), 1–11. doi:10.1186/s13660-018-1896-3
  • Zhao, D., Ye, G., Liu, W., & Torres, D. F. (2019). Some inequalities for interval-valued functions on time scales. Soft Computing, 23(15), 6005–6015. doi:10.1007/s00500-018-3538-6

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