Gr\"uss inequalities for the $\beta-$integral associated with the general quantum operator

TL;DR

This paper establishes Grüss inequalities for a generalized quantum operator and its inverse, the beta-integral, extending classical inequalities to a broader quantum calculus context.

Contribution

It introduces Grüss inequalities for the inverse of a general quantum operator and the associated beta-Riemann-Stieltjes integral, generalizing existing quantum calculus results.

Findings

Derived Grüss inequalities for the inverse quantum operator.

Established Grüss inequalities for the beta-Riemann-Stieltjes integral.

Extended classical inequalities to quantum calculus framework.

Abstract

Assume that $\,I\subseteq\mathbb{R}\,$ is an interval and $\,\beta:\,I\rightarrow\,I\,$ a strictly increasing and continuous function with a single fixed point $\,s_0\in I\,$, satisfying $\,(s_0-t)(\beta(t)-t)\leq 0\,$ for all $\,t\in I$, where the equality occurs only when $\,t=s_0$. Hamza et al. considered the general quantum operator, $\,D_{\beta}[f](t):=\displaystyle\frac{f\big(\beta(t)\big)-f(t)}{\beta(t)-t}\,$ when $\,t\neq s_0\,$ and $\,D_{\beta}[f](s_0):=f^{\prime}(s_0)\,$ when $\,t=s_0\,$. It generalizes the Jackson $\,q$-derivative operator $\,D_{q}\,$ as well as the Hahn (quantum derivative) operator, $\,D_{q,\omega}$. We obtained Gr\"uss type inequalities for its inverse operator, the $\beta$-integral. Furthermore, we introduced the concept of $\,\beta$-Riemann-Stieltjes integral and obtained Gr\"uss type inequalities associated with it.