Symmetric Quantum Inequalities on Finite Rectangular Plane
Finding the range of coordinated convex functions is yet another application for the symmetric Hermite–Hadamard inequality. For any two-dimensional interval <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow>...
| 發表在: | Mathematics |
|---|---|
| Main Authors: | , , |
| 格式: | Article |
| 語言: | 英语 |
| 出版: |
MDPI AG
2024-05-01
|
| 主題: | |
| 在線閱讀: | https://www.mdpi.com/2227-7390/12/10/1517 |
| _version_ | 1850386844831711232 |
|---|---|
| author | Saad Ihsan Butt Muhammad Nasim Aftab Youngsoo Seol |
| author_facet | Saad Ihsan Butt Muhammad Nasim Aftab Youngsoo Seol |
| author_sort | Saad Ihsan Butt |
| collection | DOAJ |
| container_title | Mathematics |
| description | Finding the range of coordinated convex functions is yet another application for the symmetric Hermite–Hadamard inequality. For any two-dimensional interval <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow><mrow><mo>[</mo><msub><mi mathvariant="normal">a</mi><mn>0</mn></msub><mo>,</mo><mspace width="0.166667em"></mspace><msub><mi mathvariant="normal">a</mi><mn>1</mn></msub><mo>]</mo></mrow><mo>×</mo><mrow><mo>[</mo><msub><mi mathvariant="normal">c</mi><mn>0</mn></msub><mo>,</mo><mspace width="0.166667em"></mspace><msub><mi mathvariant="normal">c</mi><mn>1</mn></msub><mo>]</mo></mrow><mo>⊆</mo><msup><mo>ℜ</mo><mn>2</mn></msup></mrow></semantics></math></inline-formula>, we introduce the notion of partial <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><msub><mi mathvariant="normal">q</mi><mi>θ</mi></msub></semantics></math></inline-formula>-, <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><msub><mi mathvariant="normal">q</mi><mi>ϕ</mi></msub></semantics></math></inline-formula>-, and <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow><msub><mi mathvariant="normal">q</mi><mi>θ</mi></msub><msub><mi mathvariant="normal">q</mi><mi>ϕ</mi></msub></mrow></semantics></math></inline-formula>-symmetric derivatives and a <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow><msub><mi mathvariant="normal">q</mi><mi>θ</mi></msub><msub><mi mathvariant="normal">q</mi><mi>ϕ</mi></msub></mrow></semantics></math></inline-formula>-symmetric integral. Moreover, we will construct the <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow><msub><mi mathvariant="normal">q</mi><mi>θ</mi></msub><msub><mi mathvariant="normal">q</mi><mi>ϕ</mi></msub></mrow></semantics></math></inline-formula>-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. |
| format | Article |
| id | doaj-art-88511aaa67fa41ca8ca74bfb9992cd9a |
| institution | Directory of Open Access Journals |
| issn | 2227-7390 |
| language | English |
| publishDate | 2024-05-01 |
| publisher | MDPI AG |
| record_format | Article |
| spelling | doaj-art-88511aaa67fa41ca8ca74bfb9992cd9a2025-08-19T22:55:19ZengMDPI AGMathematics2227-73902024-05-011210151710.3390/math12101517Symmetric Quantum Inequalities on Finite Rectangular PlaneSaad Ihsan Butt0Muhammad Nasim Aftab1Youngsoo Seol2Department of Mathematics, COMSATS University Islamabad, Lahore Campus, Lahore 54000, PakistanDepartment of Mathematics, Punjab Group of Colleges, Okara Campus, Okara 56101, PakistanDepartment of Mathematics, Dong-A University, Busan 49315, Republic of KoreaFinding the range of coordinated convex functions is yet another application for the symmetric Hermite–Hadamard inequality. For any two-dimensional interval <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow><mrow><mo>[</mo><msub><mi mathvariant="normal">a</mi><mn>0</mn></msub><mo>,</mo><mspace width="0.166667em"></mspace><msub><mi mathvariant="normal">a</mi><mn>1</mn></msub><mo>]</mo></mrow><mo>×</mo><mrow><mo>[</mo><msub><mi mathvariant="normal">c</mi><mn>0</mn></msub><mo>,</mo><mspace width="0.166667em"></mspace><msub><mi mathvariant="normal">c</mi><mn>1</mn></msub><mo>]</mo></mrow><mo>⊆</mo><msup><mo>ℜ</mo><mn>2</mn></msup></mrow></semantics></math></inline-formula>, we introduce the notion of partial <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><msub><mi mathvariant="normal">q</mi><mi>θ</mi></msub></semantics></math></inline-formula>-, <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><msub><mi mathvariant="normal">q</mi><mi>ϕ</mi></msub></semantics></math></inline-formula>-, and <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow><msub><mi mathvariant="normal">q</mi><mi>θ</mi></msub><msub><mi mathvariant="normal">q</mi><mi>ϕ</mi></msub></mrow></semantics></math></inline-formula>-symmetric derivatives and a <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow><msub><mi mathvariant="normal">q</mi><mi>θ</mi></msub><msub><mi mathvariant="normal">q</mi><mi>ϕ</mi></msub></mrow></semantics></math></inline-formula>-symmetric integral. Moreover, we will construct the <inline-formula><math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"><semantics><mrow><msub><mi mathvariant="normal">q</mi><mi>θ</mi></msub><msub><mi mathvariant="normal">q</mi><mi>ϕ</mi></msub></mrow></semantics></math></inline-formula>-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.https://www.mdpi.com/2227-7390/12/10/1517coordinate convex functionssymmetric quantum calculussymmetric quantum Hölder’s inequalitysymmetric quantum Hermite–Hadamard inequality |
| spellingShingle | Saad Ihsan Butt Muhammad Nasim Aftab Youngsoo Seol Symmetric Quantum Inequalities on Finite Rectangular Plane coordinate convex functions symmetric quantum calculus symmetric quantum Hölder’s inequality symmetric quantum Hermite–Hadamard inequality |
| title | Symmetric Quantum Inequalities on Finite Rectangular Plane |
| title_full | Symmetric Quantum Inequalities on Finite Rectangular Plane |
| title_fullStr | Symmetric Quantum Inequalities on Finite Rectangular Plane |
| title_full_unstemmed | Symmetric Quantum Inequalities on Finite Rectangular Plane |
| title_short | Symmetric Quantum Inequalities on Finite Rectangular Plane |
| title_sort | symmetric quantum inequalities on finite rectangular plane |
| topic | coordinate convex functions symmetric quantum calculus symmetric quantum Hölder’s inequality symmetric quantum Hermite–Hadamard inequality |
| url | https://www.mdpi.com/2227-7390/12/10/1517 |
| work_keys_str_mv | AT saadihsanbutt symmetricquantuminequalitiesonfiniterectangularplane AT muhammadnasimaftab symmetricquantuminequalitiesonfiniterectangularplane AT youngsooseol symmetricquantuminequalitiesonfiniterectangularplane |