%0 Journal Article %T On conformable fractional calculus %A T. Abdeljawad %J J. Comput. Appl. Math. %D 2015 %V 279 %F Abdeljawad2015 %0 Journal Article %T Well-posedness of stochastic modified Kawahara equation %A P. Agarwal %A A.-A. Hyder %A M. Zakarya %J Adv. Difference Equ. %D 2020 %V 2020 %F Agarwal2020 %0 Journal Article %T Exact Solutions for a Class of Wick-Type Stochastic (3+1)-Dimensional Modified Benjamin-Bona-Mahony Equations %A P. Agarwal %A A. Hyder %A M. Zakarya %A G. AlNemer %A C. Cesarano %A D. Assante %J Axioms %D 2019 %V 8 %F Agarwal2019 %0 Book %T Hardy Type Inequalities on Time Scales %A R. P. Agarwal %A D. O’Regan %A S. H. Saker %D 2016 %I Springer %C Switzerland %F Agarwal2016 %0 Journal Article %T Some Dynamic Inequalities of Hilbert’s Type %A A. M. Ahmed %A G. AlNemer %A M. Zakarya %A H. M. Rezk %J J. Funct. Spaces %D 2020 %V 2020 %F Ahmed2020 %0 Journal Article %T On some integral inequalities for conformable fractional integrals %A A. Akkurt %A M. E. Yildirim %A H. Yildirim %J Asian J. Math. Comput. Res. %D 2017 %V 15 %F Akkurt2017 %0 Journal Article %T A conformable fractional calculus on arbitrary time scales %A N. Benkhettou %A S. Hassani %A D. F. M. Torres %J J. King Saud Univ. Sci. %D 2016 %V 28 %F Benkhettou2016 %0 Journal Article %T Some elementary inequalities %A G. Bennett %J Quart. J. Math. %D 1987 %V 38 %F Bennett1987 %0 Journal Article %T The best constant in a fractional Hardy inequality %A K. Bogdan %A B. Dyda %J Math. Nachr. %D 2011 %V 284 %F Bogdan2011 %0 Journal Article %T Fite–Hille–Wintner-type oscillation criteria for second-order half-linear dynamic equations with deviating arguments %A M. Bohner %A T. S. Hassan %A T. Li %J Indag. Math. %D 2019 %V 29 %F Bohner2019 %0 Journal Article %T Kamenev-type criteria for nonlinear damped dynamic equations %A M. Bohner %A T. Li %J Sci. China Math. %D 2015 %V 58 %F Bohner2015 %0 Book %T Dynamic Equations on Time Scales: An Introduction with Applications %A M. Bohner %A A. Peterson %D 2011 %I Birkhauser %C Boston %F Bohner2011 %0 Book %T Advances in Dynamic Equations on Time Scales %A M. Bohner %A A. Peterson %D 2003 %I Birkhauser %C Boston %F Bohner2003 %0 Journal Article %T Inequalities for α-fractional differentiable functions %A Y.-M. Chu %A M. A. Khan %A T. Ali %A S. S. Dragomir %J J. Inequal. Appl. %D 2017 %V 2017 %F Chu2017 %0 Journal Article %T Note on series of positive terms %A E. T. Copson %J J. London Math. Soc %D 1927 %V 2 %F Copson1927 %0 Journal Article %T Note on series of positive terms %A E. T. Copson %J J. London Math. Soc. %D 1928 %V 3 %F Copson1928 %0 Journal Article %T Some integral inequalities %A E. T. Copson %J Proc. Roy. Soc. Edinburgh Sect. A %D 1976 %V 75 %F Copson1976 %0 Journal Article %T Exact solutions of stochastic fractional Korteweg de-Vries equation with conformable derivatives %A H. A. Ghany %A A.-A. Hyder %A M. Zakarya %J Chin. Phys. B %D 2020 %V 29 %F Ghany2020 %0 Journal Article %T G. H. Hardy %A Notes on a theorem of Hilbert %J Math. Z. %D 1920 %V 6 %F Hilbert1920 %0 Journal Article %T Notes on some points in the integral calculus, LX. An inequality between integrals %A G. H. Hardy %J Messenger Math. %D 1925 %V 54 %F Hardy1925 %0 Journal Article %T Notes on some points in the integral calculus LXIV: Further inequalities between integrals %A G. H. Hardy %J Messenger Math. %D 1928 %V 57 %F Hardy1928 %0 Journal Article %T Analysis on measure chains--a unified approach to continuous and discrete calculus %A S. Hilger %J Results. Math. %D 1990 %V 18 %F Hilger1990 %0 Journal Article %T Synchronization of bidirectional N-coupled fractional-order chaotic systems with ring connection based on antisymmetric structure %A C. Jiang %A A. Zada %A M. T. S¸enel %A T. Li %J Adv. Difference Equ. %D 2019 %V 2019 %F Jiang2019 %0 Journal Article %T Lyapunov-type inequalities for a fractional differential equation with mixed boundary conditions %A M. Jleli %A B. Samet %J Math. Inequal. Appl. %D 2015 %V 18 %F Jleli2015 %0 Book %T Quantum Calculus %A V. Kac %A P. Cheung %D 2001 %I Springer %C New York %F Kac2001 %0 Journal Article %T A new definition of fractional derivative %A R. Khalil %A M. A. Horani %A A. Yousef %A M. Sababheh %J J. Comput. Appl. Math. %D 2014 %V 264 %F Khalil2014 %0 Journal Article %T Hermite-Hadamard type inequalities for conformable fractional integrals %A M. A. Khan %A T. Ali %A S. S. Dragomir %A M. Z. Sarikaya %J Rev. R. Acad. Cienc. Exactas Fıs. Nat., Ser. A Mat. %D 2017 %V 112 %F Khan2017 %0 Journal Article %T Generalization of inequalities of Hardy and Littlewood %A L. Leindler %J Acta Sci. Math., (Szeged) %D 1970 %V 31 %F Leindler1970 %0 Journal Article %T Generalization of an inequality of Hardy %A N. Levinson %J Duke Math. J. %D 1964 %V 31 %F Levinson1964 %0 Journal Article %T Chain rules and inequalities for the BHT fractional calculus on arbitrary timescales %A E. R. Nwaeze %A D. F. M. Torres %J Arab. J. Math., (Springer) %D 2017 %V 6 %F Nwaeze2017 %0 Journal Article %T Some nonlinear dynamic inequalities on time scales and applications %A S. H. Saker %J J. Math. Inequal. %D 2010 %V 4 %F Saker2010 %0 Journal Article %T Hardy-Leindler type inequalities on Time Scales %A S. H. Saker %J Appl. Math. Inf. Sci. %D 2014 %V 8 %F Saker2014 %0 Journal Article %T Some Fractional Dynamic Inequalities of Hardy’s Type Via Conformable Calculus %A S. H. Saker %A M. R. Kenawy %A G. AlNemer %A M. Zakarya %J J. Mathematics. %D 2020 %V 8 %F Saker2020 %0 Journal Article %T Some new generalized forms of Hardy’s type inequality on time scales %A S. H. Saker %A R. R. Mahmoud %A M. M. Osman %A R. P. Agarwal %J Math. Inequal. Appl. %D 2017 %V 20 %F Saker2017 %0 Journal Article %T Generalized Hardy, Copson, Leindler and Bennett inequalities on time scales %A S. H. Saker %A D. O’Regan %A R. Agarwal %J Math. Nachr. %D 2014 %V 287 %F Saker2014 %0 Journal Article %T Hardy Type Inequalities for Conformable Fractional Integrals %A M. Z. Sarikaya %J Konuralp J. Math. %D 2020 %V 8 %F Sarikaya2020 %0 Journal Article %T Opial type inequalities for conformable fractional integrals %A M. Z. Sarikaya %A H. Budak %J RGMIA Res. Rep. Collect. %D 2016 %V 19 %F Sarikaya2016 %0 Journal Article %T New inequalities of Opial type for conformable fractional integrals %A M. Z. Sarikaya %A H. Budak %J Turk J. Math. %D 2017 %V 41 %F Sarikaya2017 %0 Journal Article %T Steffensen’s integral inequality for conformable fractional integrals %A M. Z. Sarikaya %A H. Yaldiz %A H. Budak %J Int. J. Anal. Appl. %D 2017 %V 15 %F Sarikaya2017 %0 Journal Article %T Hermite-Hadamard type inequalities via conformable fractional integrals %A E. Set %A A. Gözpınar %A A. Ekinci %A %J Acta Math. Univ. Comen. %D 2017 %V 86 %F Set2017 %0 Journal Article %T Generalizations of some reverse integral inequalities %A G.-S. Yang %A D.-Y. Hwang %J J. Math. Anal. Appl. %D 1999 %V 233 %F Yang1999 %0 Journal Article %T Fractional integral inequalities for different functions %A C. Yildiz %A M. E. Özdemir %A H. K. Önelan %J New Trends in Math. Sci. %D 2015 %V 3 %F Yildiz2015