Dr. Shabnam Malik
Professor
Department of Mathematics
Extension Number: 560
Office Number: S-351
Brief Profile
Chairperson of Department of Mathematics since July 2017. Member of Mathematics faculty at FCCU since August 2009; Assistant Professor at FCCU from July 2009 to June 2020, Associate Professor at FCCU from July 2020 to June 2023, Professor at FCCU from July 2023 till date. Awarded The International Research Support Initiative Program Scholarship HEC Pakistan for Germany; Awarded HEC Indigenous fellowship program batch III.
Area of Research: Graph theory.
Education
⦁ Ph.D. in Mathematics (Abdus Salam School of Mathematical Sciences, GCU, Lahore)
⦁ MSc in Mathematics (PU – University of the Punjab, Lahore)
⦁ PGD Computer Science (Queen Mary College, Lahore)
Publications
1. S. Malik, “Hamiltonicity in Directed Toeplitz Graphs with s1 = 1 and s3 =4”, Hindawi, Computational and Mathematical Methods Volume 2023, article ID 3676487, 11 pages.
2. S. Malik, “Hamiltonicity in Directed Toeplitz Graphs Tn<1,3; 1,t>”, Bull. Math. Soc. Sci. Math. Roumanie, Tome 66 (114), No. 3 (2023), 307-318.
3. S. Malik, “Corrigendum and extension to ‘Hamiltonicity in Directed Toeplitz Graphs Tn<1,2; t1,t2>”, Australas. J. Combin. 83(1), 173-175 (2022).
4. S. Malik, “Hamiltonicity in Directed Toeplitz Graphs “T t n 1, 3, 4; ”, Bull. Math. Soc. Sci. Math. Roumanie, Tome 64 (112), No. 4 (2021), 317-327.
5. S. Kanwal, A. Riasat, M. K. Siddiqui, S. Malik, K. Sarwar, A. Ammara, A. Anton “On Topological Indices of Total Graph and Its Line Graph for Kragujevac Tree Networks”, November 2021, Complexity 2021(3), 1-32.
6. S. Kanwal, A. Manzoor, R. Ashraf, A. Rauf, S. Malik, T. Sumbal, “Bounds of Redefined Zagreb indices for F-Sum of Graphs, F = Q or T”, Ars Combinatoria Volume 155, 107-133 (2021
7. S. Malik, “Hamiltonicity in Directed Toeplitz Graphs 1 2 T 1, 2; t , t n ”, Australas. J. Combin. 78(3), 434-449 (2020).
8. S. Kanwal, A. Rauf, S. Malik, T. Sumbal, M. Arshad, R. Irfan, A. Manzoor, “Certain topological indices and polynomials for semitotal line graph and its line graph for dutch windmill graph”, Utilitas Mathematica 117, 3-32 (2020).
9. S. Akbari , S. Hossein Ghorban, S. Malik, S. Qajara, ” Conditions for regularity and for 2- connectivity of Toeplitz graphs”, Utilitas Mathematica, Vol 110, 305-314 (2019).
10. N. Noreen, F. Riaz, S. Malik, S. Zaheer,“Ion Bernstein Mode Instability with Ring Velocity Distribution Function”, Progress of Theoretical and Experimental Physics, Volume 2019, Issue 5, 053E01, (2019).
11. S. Malik, “Hamiltonian Cycles in Directed Toeplitz Graphs 1 2 T 1, 2; t 5, t n ”, Utilitas Mathematica. Vol 99, 3-17 (2016).
12. S. Malik, “Hamiltonian Cycles in Directed Toeplitz Graphs-Part 2”, Ars Combinatoria, 116, 303-319 (2014).
13. S. Malik and A. M. Qureshi, “Hamiltonian Cycles in Directed Toeplitz Graphs”, Ars Combinatoria. 109, 511-526 (2013).
14. S. Malik, A.M. Qureshi and T. Zamfirescu, “Hamiltoncity of Cubic 3-Connected KHalin Graphs”, The Electronic Journal of Combinatorics, Volume 20 (1), 66 (2013).
15. S. Malik, “Hamiltonicity in Directed Toeplitz Graphs of Maximum (out or in) Degree 4”, Utilitas Mathematica. Vol 89, 33-68 (2012).
16. S. Malik, T. Zamfirescu, “Hamiltonian Connectedness in Directed Toeplitz Graph”, Bull. Math. Soc. Sci. Math. Roumanie Vol. 53 (101), No. 2, 145-156 (2010).
17. S. Malik, A. M. Qureshi and T.Zamfirescu, “Hamiltonian Properties of generalized Halin Graphs”, Canadian Mathematical Bulletin, Vol. 52 (3), 416 – 423 (2009).