1403/01/10
حسین جعفری

حسین جعفری

مرتبه علمی: استاد
ارکید:
تحصیلات: دکترای تخصصی
اسکاپوس:
دانشکده: دانشکده علوم ریاضی
نشانی:
تلفن: 2466

مشخصات پژوهش

عنوان
More efficient estimates via h -discrete fractional calculus theory and applications
نوع پژوهش
JournalPaper
کلیدواژه‌ها
Grüss inequality, Young inequality, h -discrete fractional operators, Discrete h -proportional fractional operator, Arithmetic-geometric mean inequality Young’s inequality
سال
2021
مجله CHAOS SOLITONS & FRACTALS
شناسه DOI
پژوهشگران Sima Rashid ، Sobia Sultana ، Fahd Jarad ، Hossein Jafari ، Y.S. Hamed

چکیده

Discrete fractional calculus ( DFC ) is continuously spreading in the engineering practice, neural networks, chaotic maps, and image encryption, which is appropriately assumed for discrete-time modelling in continuum problems. First, we start with a novel discrete h -proportional fractional sum defined on the time scale h Z so as to give the premise to the more broad and complex structures, for example, the suit- ably accustomed transformations conjuring the property of observing the new chaotic behaviors of the logistic map. Here, we aim to present the novel discrete versions of Grüss and certain other associated variants by employing discrete h -proportional fractional sums are established. Moreover, several novel consequences are recaptured by the h -discrete fractional sums. The present study deals with the modifi- cation of Young, weighted-arithmetic and geometric mean formula by taking into account changes in the exponential function in the kernel represented by the parameters of the operator, varying delivery noted outcomes. In addition, two illustrative examples are apprehended to demonstrate the applicability and efficiency of the proposed technique.