当前位置: X-MOL 学术J. Taibah Univ. Sci. › 论文详情
Our official English website, www.x-mol.net, welcomes your feedback! (Note: you will need to create a separate account there.)
Geometric process solving a class of analytic functions using q-convolution differential operator
Journal of Taibah University for Science ( IF 2.8 ) Pub Date : 2020-05-18 , DOI: 10.1080/16583655.2020.1769262
Rabha W. Ibrahim 1, 2
Affiliation  

ABSTRACT

In current realization, our object is to use the convolution product in terms of the notion quantum calculus to deliver a propagated q-derivative factor taking a more generalized Sàlàgean formula. By joining both the new factor together with the Janowski formula, we designate a special category of analytic factors in domain of unit disk. Finally, we deliberate a set of significant inequalities involving these classes. As applications, we seek the q-differential translator to generalize a denomination of differential equations species Briot-Bouquet and formulate its upper analytic solution using the subordination idea. This application can be employed in information theory and thermo dynamical systems.



中文翻译:

使用q卷积微分算子求解一类解析函数的几何过程

摘要

在当前实现中,我们的目标是根据概念量子演算使用卷积积,以采用更广义的Sàlàgean公式来传递传播的q导数。通过将新因子和Janowski公式结合在一起,我们在单位圆盘的域中指定了特殊类别的分析因子。最后,我们讨论了涉及这些类别的一系列重大不平等现象。作为应用,我们寻求q微分转换器来概括微分方程物种Briot-Bouquet的名称,并使用从属思想来制定其上层解析解。此应用程序可用于信息论和热力学系统。

更新日期:2020-07-24
down
wechat
bug