Some generalizations of reverse Hardy-type inequalities via Jensen integral inequality on time scales
Makharesh, S., El-Owaidy, H., El-Deeb, A. (2022). Some generalizations of reverse Hardy-type inequalities via Jensen integral inequality on time scales. EKB Journal Management System, 33(Issue 2-B), 59-69. doi: 10.21608/absb.2022.151322.1198
Samer D. Makharesh; Hassan M. El-Owaidy; Ahmed A. El-Deeb. "Some generalizations of reverse Hardy-type inequalities via Jensen integral inequality on time scales". EKB Journal Management System, 33, Issue 2-B, 2022, 59-69. doi: 10.21608/absb.2022.151322.1198
Makharesh, S., El-Owaidy, H., El-Deeb, A. (2022). 'Some generalizations of reverse Hardy-type inequalities via Jensen integral inequality on time scales', EKB Journal Management System, 33(Issue 2-B), pp. 59-69. doi: 10.21608/absb.2022.151322.1198
Makharesh, S., El-Owaidy, H., El-Deeb, A. Some generalizations of reverse Hardy-type inequalities via Jensen integral inequality on time scales. EKB Journal Management System, 2022; 33(Issue 2-B): 59-69. doi: 10.21608/absb.2022.151322.1198

Some generalizations of reverse Hardy-type inequalities via Jensen integral inequality on time scales

Al-Azhar Bulletin of Science
Article 5, Volume 33, Issue 2-B, December 2022, Page 59-69  XML PDF (458.46 K)
Document Type: Original Article
DOI: 10.21608/absb.2022.151322.1198
View on SCiNiTO View on SCiNiTO
Authors
Samer D. Makharesh; Hassan M. El-Owaidy; Ahmed A. El-Deeb email
Department of Mathematics, Faculty of Science (Boys), Al-Azhar University, Nasr City (11884), Cairo, Egypt.
Abstract
In this article, we will obtain some new dynamic inequalities of Hardy-type on time scales. Our results will be proved by using H lder's inequality and Jensen's inequality. We will apply the main results to the continuous calculus and  discrete calculus as special cases.
Keywords
Dynamic inequality; Hardy inequality; Time scale
References
[1]  Hardy G H. Note on a theorem of Hilbert. Math. Z., 6(3-4):314{317}, 1920.

[2]  Hardy G H. Notes on some points in the integral calculus (LX). Messenger of Mathematics,

         54:150{156, 1925.

[3] Sulaiman WT. Reverses of Minkowski's, Hölder's and Hardy's integral inequalities.  Int. J.

     Mod.Math. Sci. 1 (2012), no. 1, 14-24.

[4] Benaissa B.  More on reverses of Minkowski's inequalities and Hardy's integral inequalities.

     Asian-European Journal of Mathematics. 13 (2020), no. 03, 2050064.

[5] Benaissa  B,  Benguessour  A.  Reverses Hardy-type inequalities via Jensen's integral

        Inequality . Math Montis. 52 (2021): 43-51.

[6]  Hilger  S.  Ein Maℬkettenkalkul mit Anwendung auf Zentrumsmannigfaltigkeiten.  Ph.D. thesis,

     Universitat Wurzburg, 1988.

[7]  Sroysang  B. A generalization of some integral inequalities similar to Hardy's inequality.

     Math. Aeterna. 3 (2013), no. 7, 593-596.

 [8] Agarwal  R,  O'Regan  D,  Saker  S.   Dynamic inequalities on time scales. vol. 2014,

       Springer, 2014.                                  

 [9]  Bohner   M,   Peterson  A.  Dynamic equations on time scales.  Birkhauser Boston,Inc., Boston,

       MA, 2001, An introduction with applications. MR 1843232.

 [10]  Saker SH,  Rezk  HM,   Abohela  I,   Baleanu D. Refinement multidimensional dynamic   

    inequalities with general kernels and measures . Journal of Inequalities and Applications, 2019(1),

     pp.1-16.

[11]  Hamiaz  A,  Abuelela W, Saker SH,  Baleanu D. Some new dynamic inequalities with several           

      functions of Hardy type on time scales. Journal of Inequalities and Applications. 2021 Dec,    

      2021(1):1-5.

[12]  Saker SH, Osman MM, Anderson DR. On a new class of dynamic Hardy-type inequalities and   

        some relate  generalizations. Aequationes mathematicae. 2021 Jul 1:1-21.

[13] El-Deeb   A, Makharesh  S, Nwaeze  E, Iyiola  O, Baleanu D. On nabla conformable   fractional 

       Hardy-type inequalities on arbitrary time scales. Journal of Inequalities  and Applications, 

       2021(1), pp.1-23.

[14] El-Deeb  A,  Makharesh  S,  Askar  S, Baleanu  D.  Bennett-Leindler  nabla type

       inequalities via conformable fractional derivatives on time scales. AIMS Mathematics, 7(8),

       p. 14099–14116.

[15]  Kayar  Z, Kaymakçalan B. Applications of the novel diamond alpha Hardy–Copson type dynamic 

       inequalities to half linear difference equations. Journal of Difference Equations and Applications.

      2022 Apr 3;28(4):457-84.  

[16]  El-Deeb  A, Elsennary  H,  Baleanu  D. Some new Hardy-type inequalities   on time

          scales. Advances in Difference Equations, 2020(1), pp.1-21.

[17] El-Deeb  A,  Makharesh  S,  Baleanu  D.  Dynamic Hilbert-Type Inequalities with

         Fenchel-Legendre Transform. Symmetry, 12(4), p.582.

 [18]  El-Deeb  A, Rashid  S, Khan  Z, Makharesh  S. New dynamic Hilbert-type

          inequalities in two independent variables involving Fenchel–Legendre transform. Advances in

          Difference Equations, 2021(1), pp.1-24.

[19] El-Deeb  A, Makharesh, S, Askar  S,  Awrejcewicz  J.  A Variety of Nabla Hardy’s

        Type Inequality on Time Scales. Mathematics, 10(5), p.722.

[20] El-Deeb  A,  Awrejcewicz  J. Novel Fractional Dynamic Hardy–Hilbert-Type.

        Inequalities on Time Scales with Applications. Mathematics, 9(22), p.2964.

[21] El-Owaidy, H,  El-Deeb  A, Makharesh S, Baleanu  D, Cesarano  C. On some

[22] El-Deeb  A,   Elsennary  H, Cheung W, Some reverse Holder inequalities

        with Specht's ratio on time scales, J. Nonlinear Sci. Appl. 11 (2018), no. 4, 444{455}.

Statistics
Article View: 238
PDF Download: 108