Assoc. Prof. Dr. Naeem Saleem | Nonlinear Analysis | Best Researcher Award
Associate Professor, Department of Mathematics, University of Management and Technology, Lahore, Pakistan
🌍 Dr. Naeem Saleem is a dedicated mathematician from Pakistan, currently serving as an Associate Professor in Mathematics at the University of Management and Technology in Lahore. With over a decade of academic experience, Dr. Saleem has made notable contributions to fixed-point theory, approximation theory, and mathematical analysis, focusing on advanced iterative methods and contraction mappings. His work has been published in esteemed international journals, reflecting his commitment to the advancement of mathematical knowledge.
Publication Profile
Education
🎓 Dr. Saleem completed his Ph.D. in Mathematics from the University of Management and Technology, Lahore, in 2017. Prior to that, he earned his MS/M.Phil in Mathematics from the National University of Computer and Emerging Sciences in 2011, following an M.Sc. in Mathematics from the University of Punjab, Lahore, in 2007.
Experience
📘 Dr. Saleem has held academic positions at the University of Management and Technology, serving as an Assistant Professor from 2012 to 2020 and, since 2020, as an Associate Professor. He continues to mentor students in advanced mathematics and contributes to the university’s research initiatives in mathematical sciences.
Research Interests
🔬 Dr. Saleem’s research centers on fixed-point theory, non-linear functional analysis, fractal theory, and applications of contractive mappings in metric spaces. His recent publications include work on generalized contractions, split feasibility problems, and approximation theories in convex metric spaces.
Publications
“Common Attractors of Generalized Hutchinson–Wardowski Contractive Operators”
📅 Fractal and Fractional (2024-11-09)
DOI: 10.3390/fractalfract8110651
“Intuitionistic Fuzzy Z-Contractions and Common Fixed Points with Applications”
📅 European Journal of Pure and Applied Mathematics (2024-10-31)
DOI: 10.29020/nybg.ejpam.v17i4.5431
“Approximation Theorems for G-Nonexpansive Mappings in Convex Metric Spaces by Three-Step Iterations”
📅 Alexandria Engineering Journal (2024-09)
DOI: 10.1016/j.aej.2024.05.067
“Strong and Weak Convergence Theorems for the Split Feasibility Problem of (β,k)-Enriched Strict Pseudocontractive Mappings with an Application in Hilbert Spaces”
📅 Symmetry (2024-05-02)
DOI: 10.3390/sym16050546
“Approximating Fixed Points of Weak Enriched Contractions Using Kirk’s Iteration Scheme of Higher Order”
📅 OpenAlex (2024-02-14)
DOI: 10.60692/hhz1x-y7n62