Symmetric Quantum Calculus

TL;DR

This paper extends quantum calculus by developing symmetric versions and higher-order variational calculus, introducing new derivatives and integrals, and deriving Euler-Lagrange equations within this framework.

Contribution

It introduces the symmetric quantum variational calculus, defines a symmetric derivative on time scales, and establishes Euler-Lagrange equations for these new calculus frameworks.

Findings

Derived Euler-Lagrange equations for symmetric quantum calculus.

Introduced a symmetric derivative on time scales with key properties.

Defined and analyzed the diamond integral as a refinement of existing integrals.

Abstract

We generalize the Hahn variational calculus by studying problems of the calculus of variations with higher-order derivatives. The symmetric quantum calculus is studied, namely the $\alpha,\beta$-symmetric, the $q$-symmetric, and the Hahn symmetric quantum calculus. We introduce the symmetric quantum variational calculus and an Euler-Lagrange type equation for the $q$-symmetric and Hahn's symmetric quantum calculus is proved. We define a symmetric derivative on time scales and derive some of its properties. Finally, we introduce and study the diamond integral, which is a refined version of the diamond-$\alpha$ integral on time scales.