DEPARTMENT.FACULTY

photo
Dr. Faeem Ali
  • DEPARTMENT_STAFF.QUALIFICATION

    Ph.D., CSIR-JRF (NET), GATE

  • DEPARTMENT_STAFF.DESIGNATION

    Assistant Professor

  • DEPARTMENT_STAFF.THRUST_AREA

    Fixed Point Theory, Approximation of Fixed Points

  • DEPARTMENT_STAFF.ADDRESS

    Shibli Bagh, Hamdad Nagar-A, Aligarh-202002

  • DEPARTMENT_STAFF.MOBILE

    8006455317

  • DEPARTMENT_STAFF.EMAIL

    faeemrazaamu@gmail.com

DEPARTMENT_STAFF.COMPLETE_CV

Dr. Faeem Ali is an Assistant Professor in the Department of Applied Mathematics at Aligarh Muslim University, India. Before joining AMU, he worked at the Central University of Karnataka, Gulbarga, and Maulana Azad National Institute of Technology (MANIT), Bhopal.  

He was awarded his Ph.D. (July-2020) in Mathematics in the area of Fixed Point Theory on the topic ''On Some Iterative Processes to Approximate Fixed Points" under the supervision of Dr. Javid Ali at the Department of Mathematics, AMU, Aligarh. He completed his Master's degree (M.Sc. in Mathematics) from Aligarh Muslim University in 2014. His research Interest is in Fixed Point Theory, Approximation of Fixed Points, Approximation of the Solution of Nonlinear Differential Equations, Proximal Point Algorithms, etc.

He has more than 02 years of teaching experience. He taught several graduate and post-graduate courses, including Engineering Mathematics-1, 2&3, Computational Techniques, Abstract Algebra, Measures & Integrations, etc.

He has published more than 14 research papers (11 SCI-Expanded and others Scopus Listed) in international refereed journals of repute, prominent among them are the Results in Mathematics (Springer), Computational and Applied Mathematics (Springer), Engineering with Computers (Springer), Journal of Applied Mathematics and Computation (Springer), Journal of Inequalities and Applications (Springer), Journal of Nonlinear Convex Analysis (Yokohama Pub.)  Mathematics (MDPI), Journal of Function Spaces, Azerbaijan Journal of Mathematics, etc.

Apart from this, he has qualified for national-level tests like CSIR-JRF (AIR: 126), CSIR-UGC-NET (AIR: 61), and two times GATE (in 2015 & 2016) in Mathematical Sciences.


  1. Research Paper Publications in 2020
    1. J. Ali and F. Ali, A new iterative scheme to approximating fixed points and the solution of a delay differential equation, J. Nonlinear Convex Anal. 21 (9) (2020), 2151-2163, (IF: 1.016) (SCI-Expanded).

    2. F. Ali, J. Ali and J.J. Nieto, Some observations on generalized non-expansive mappings with an application, Comput. Appl. Math. 39 (2) (2020), 74, (IF: 2.6) (SCI-Expanded).

    3. J. Ali, M. Jubair and F. Ali, Stability and convergence of F iterative scheme with an application to the fractional differential equation, Engineering with Computers, (2020), 1-10(IF: 8.7) (SCI-Expanded).

    4. F. Ali and J. Ali, Convergence, stability, and data dependence of a new iterative algorithm with an application, Comput. Appl. Math. 39 (4) (2020), 267, (IF: 2.6) (SCI-Expanded).

  2. Research Paper Publications in 2021

      1. S.E. Fadugba, F. Ali and A.B. Abubakar, Caputo fractional reduced differential transform method for SEIR epidemic model with fractional order, Math. Model. Anal. 8 (3), 537-548, (SCOPUS).
      2. F. Ali, J. Ali and I. Uddin, A novel approach for the solution of BVPs via Green’s function and fixed point iterative method, J. Appl. Math. Comput. 66 (2021), 167-181, (IF: 2.2) (SCI-Expanded).
      3. M. Jubair, F. Ali and J. Ali, Convergence and stability of an iteration process and solution of a fractional differential equation, J. Inequalities Appl. 2021 (1) (2021), 144, (IF: 1.6) (SCI-Expanded).
      4. J. Ahmad, H. Isik, F. Ali, K. Ullah, E. Ameer and M. Arshad, On the JK iterative process in Banach spaces, J. Funct. Spaces, 2021 (2021), 1-8, (IF: 1.9) (SCI-Expanded).
      5. J. Ali, F. Ali and F.A. Khan, Estimation of Fixed Points of Hardy and Rogers Generalized Non-Expansive Mapping, Azerbaijan J. Math. si21-4 (2021), 49-63, (SCOPUS).

  3. Research Paper Publications in 2022

    1. A.E. Ofem, H. Isik, F. Ali and J. Ahmad, A new iterative approximation scheme for Reich–Suzuki-type nonexpansive operators, J. Inequalities Appl. 2022 (1) (2022), 1-26, (IF: 1.6) (SCI-Expanded).
    2. M.G. Alshehri, F.A. Khan, and F. Ali, An Iterative Algorithm to Approximate Fixed Points of Non-Linear Operators with an Application, Mathematics 10 (7) (2022), 1132, (IF: 2.4) (SCI-Expanded).

    3. F. Ali, J. Ali and R. Rodríguez-López, Approximation of fixed points and the solution of a nonlinear integral equation, Nonlinear Funct. Anal. Appl. 26 (5), 869-885, (SCOPUS).

  4. Research Paper Publications in 2019
    1. J. Ali and F. Ali, Approximation of common fixed points and the solution of image recovery problem, Results Math., 74 (2019), 1-22 (IF: 2.2) (SCI-Expanded).

    2. J. Ali, F. Ali and P. Kumar, Approximation of fixed points for Suzuki’s generalized non-expansive mappings, Mathematics, 7(6) (2019), 522 (IF: 2.4) (SCI-Expanded).