学习经历:
2016.09–2020.06 浙江师范大学 基础数学专业 理学博士学位
2013.09–2015.06 巴基斯坦 Islamia College Peshawar 数学专业 数学硕士学位
2008.09–2012.06 巴基斯坦 Islamia College Peshawar 数学专业 理学学士学位
工作经历:
2014.10–2016.08 巴基斯坦 CECOS University of IT and Emerging Sciences 基础科学系 讲师
2020.08–2022.07 浙江师范大学 数学与计算机科学学院 博士后
2022.08–2024.06 南京航空航天大学数学学院 博士后
2024.07–至今 台州学院 人工智能学院 讲师
主要研究领域:调和分析、偏微分方程
主要讲授课程:高等数学,线性代数,概率论与数理统计,
微分方程,数值分析
科研项目:
教学业绩:
代表性论文:
1. Abidin, M. Z. Energy-dissipative adaptive-step L1 discretisation for the Caputo time-fractional incompressible magnetohydrodynamic system. Scientific Reports, 16, Article No. 13093, 2026.
2. Abidin, M. Z.; Khan, A. Stability and Well-Posedness of Fractional Navier–Stokes with Directional Fractional Diffusion. Fractal and Fractional, 9(11), Article No. 708, 2025.
3. Abidin, M. Z.; Khan, A. Uniform Analyticity and Time Decay of Solutions to the 3D Fractional Rotating Magnetohydrodynamics System in Critical Sobolev Spaces. Fractal and Fractional, 9(6), Article No. 360, 2025.
4. Abidin, M. Z.; Ullah, N.; Hussain, A.; Saadaoui, S.; Mohamed, M. M. I.; Deifalla, A. Case study of entropy optimization with the flow of Non-Newtonian nanofluid past converging conduit with slip mechanism: An application of geothermal engineering. Case Studies in Thermal Engineering, 52, Article No. 103764, 2023.
5. Abidin, M. Z.; Chen, J. C. Global Well-posedness of Generalized Magnetohydrodynamics Equations in Variable Exponent Fourier-Besov-Morrey Spaces. Acta Mathematica Sinica, English Series, 38(12), 2187–2198, 2022.
6. Abidin, M. Z.; Marwan, M.; Kalsoom, H.; Omer, O. A. On the Global Well-Posedness of Rotating Magnetohydrodynamics Equations with Fractional Dissipation. Fractal and Fractional, 6(6), Article No. 340, 2022.
7. Abidin, M. Z.; Chen, J. Global Well-posedness of the Generalized Rotating Magnetohydrodynamics Equations in Variable Exponent Fourier-Besov Spaces. Journal of Applied Analysis and Computation, 11(3), 1177–1190, 2021.
8. Abidin, M. Z.; Chen, J. Global Well-posedness for Fractional Navier-Stokes Equations in Variable Exponent Fourier-Besov-Morrey Spaces. Acta Mathematica Scientia, 41(1), 164–176, 2021.