Abstract
Abstract This article proposes a new approach based on quantum calculus framework employing novel classes of higher order strongly generalized Ψ \Psi -convex and quasi-convex functions. Certain pivotal inequalities of Simpson-type to estimate innovative variants under the q ˇ 1 , q ˇ 2 {\check{q}}_{1},{\check{q}}_{2} -integral and derivative scheme that provides a series of variants correlate with the special Raina’s functions. Meanwhile, a q ˇ 1 , q ˇ 2 {\check{q}}_{1},{\check{q}}_{2} -integral identity is presented, and new theorems with novel strategies are provided. As an application viewpoint, we tend to illustrate two-variable q ˇ 1 q ˇ 2 {\check{q}}_{1}{\check{q}}_{2} -integral identities and variants of Simpson-type in the sense of hypergeometric and Mittag–Leffler functions and prove the feasibility and relevance of the proposed approach. This approach is supposed to be reliable and versatile, opening up new avenues for the application of classical and quantum physics to real-world anomalies.
Highlights
This article proposes a new approach based on quantum calculus framework employing novel classes of higher order strongly generalized Ψ-convex and quasiconvex functions
Considering the novel auxiliary identity that correlates with the Raina function and the q-calculus theory, numerous new Simpson-type inequalities are apprehended via the aforesaid classes of functions derived in two variable forms. This suggested scheme in q-calculus theory connected with Definitions 2.5 and 2.7 introduced new results for Simpson-type inequalities in hypergeometric and Mittag–Leffler sense
0 dq1ζ1 0 dq2ζ2, and can obtain the integral expressions of Φq3ˇi, Φ6qi and Φq7ˇi, Φ8qi, which have the same formulae as those given in Theorems 4.1 and 4.2
Summary
Abstract: This article proposes a new approach based on quantum calculus framework employing novel classes of higher order strongly generalized Ψ-convex and quasiconvex functions. Our intention is to establish the novel q-integral identity of Simpson-type within a class of generalized Ψ-convex functions in two variable forms. Considering the novel auxiliary identity that correlates with the Raina function and the q-calculus theory, numerous new Simpson-type inequalities are apprehended via the aforesaid classes of functions derived in two variable forms. This suggested scheme in q-calculus theory connected with Definitions 2.5 and 2.7 introduced new results for Simpson-type inequalities in hypergeometric and Mittag–Leffler sense. We evoke a new class of set and a new class of functions, including Raina’s functions
Sign-in/Register to view highlights & summary Sign-in/Register to access full text options 
Free) 
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call
