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- Title
Symmetric Quantum Inequalities on Finite Rectangular Plane.
- Authors
Butt, Saad Ihsan; Aftab, Muhammad Nasim; Seol, Youngsoo
- Abstract
Finding the range of coordinated convex functions is yet another application for the symmetric Hermite–Hadamard inequality. For any two-dimensional interval [ a 0 , a 1 ] × [ c 0 , c 1 ] ⊆ ℜ 2 , we introduce the notion of partial q θ -, q ϕ -, and q θ q ϕ -symmetric derivatives and a q θ q ϕ -symmetric integral. Moreover, we will construct the q θ q ϕ -symmetric Hölder's inequality, the symmetric quantum Hermite–Hadamard inequality for the function of two variables in a rectangular plane, and address some of its related applications.
- Subjects
CONVEX functions
- Publication
Mathematics (2227-7390), 2024, Vol 12, Issue 10, p1517
- ISSN
2227-7390
- Publication type
Article
- DOI
10.3390/math12101517