TY - JOUR A2 - Araci, Serkan AU - Kalsoom, Humaira AU - Idrees, Muhammad AU - Baleanu, Dumitru AU - Chu, Yu-Ming PY - 2020 DA - 2020/07/24 TI - New Estimates of -Ostrowski-Type Inequalities within a Class of -Polynomial Prevexity of Functions SP - 3720798 VL - 2020 AB - In this article, we develop a novel framework to study for a new class of preinvex functions depending on arbitrary nonnegative function, which is called n-polynomial preinvex functions. We use the n-polynomial preinvex functions to develop q1q2-analogues of the Ostrowski-type integral inequalities on coordinates. Different features and properties of excitement for quantum calculus have been examined through a systematic way. We are discussing about the suggestions and different results of the quantum inequalities of the Ostrowski-type by inferring a new identity for q1q2-differentiable function. However, the problem has been proven to utilize the obtained identity, we give q1q2-analogues of the Ostrowski-type integrals inequalities which are connected with the n-polynomial preinvex functions on coordinates. Our results are the generalizations of the results in earlier papers. SN - 2314-8896 UR - https://doi.org/10.1155/2020/3720798 DO - 10.1155/2020/3720798 JF - Journal of Function Spaces PB - Hindawi KW - ER -