Lecturer, at University of Balochistan, Pakistan.
Dawood Khan is a researcher and mathematician with expertise in integral inequalities and superquadratic functions. His work has applications in information theory and fractional calculus.
Professional Profile
orcid
π Education
– *PhD in Mathematics*, COMSATS University Islamabad, Lahore Campus, Pakistan (2022-2025) π – CGPA: 3.94/4.0 (90%) – Thesis Title: New Variants of Integral Inequalities via Superquadratic Functions- *MPhil in Mathematics*, University of Balochistan, Quetta, Pakistan (2018-2021) π – CGPA: 3.73/4.0 (83%) – Thesis Title: Discrete Dynamical System in BCK-Algebra- *MSc Mathematics*, University of Balochistan, Pakistan (2010-2012) π’ – Marks: 761/950 (80.10%)
πΌ Experience
– *Researcher*, COMSATS University Islamabad, Lahore Campus, Pakistan (2022-present) π¬– *Research Collaborator*, Various institutions (2018-present)
π¬ Research Interests
Dawood Khan’s research focuses on:- *Integral Inequalities*: new variants and applications π¬– *Superquadratic Functions*: properties and applications π– *Fractional Calculus*: applications in inequalities and information theory
π Awards
– PhD Scholarship, COMSATS University Islamabad, Lahore Campus, Pakistan π
πTop NotedΒ Publications
– Analysis of superquadratic fuzzy interval valued function and its integral inequalities π
– Fractal perspective of superquadratic functions via generalized probability estimations π
– HermiteβHadamard-Type Inequalities for Harmonically Convex Functions via Proportional Caputo-Hybrid Operators with Applications π
– Properties and integral inequalities of P-superquadratic functions via multiplicative calculus with applications π’
– Fractional integral inequalities for Superquadratic functions Via Atangana-Baleanu’s operator with applications π
– Superquadratic function and its applications in information theory via interval calculus π
– Analysis on Multiplicatively (P, m)-Superquadratic Functions and Related Fractional Inequalities with Applications π
– Properties of Discrete Dynamical System in BCI-Algebra π
– A New View of Homomorphic Properties of BCK-Algebra in Terms of Some Notions of Discrete Dynamical System π
– Some Results of Self-Maps in PU-Algebra π
Conclusion
The researcher has demonstrated academic excellence, research productivity, and a strong research focus, making her a strong candidate for the Women Researcher Award. By emphasizing interdisciplinary research, collaboration, and mentorship, she could further strengthen her application and demonstrate her potential for continued excellence in research.