Komal Bansal | Mathematical Modeling | Women Researcher Award

Published on by Popular Scientist

Dr. Komal Bansal | Mathematical Modeling | Women Researcher Award

Assistant professor at Chandigarh University, India

Dr. Komal Bansal is currently serving as an Assistant Professor of Mathematics at the Centre for Distance and Online Learning, Chandigarh University, Mohali. She earned her Ph.D. in Mathematics from BITS Pilani (2019–2024), with a thesis titled “Socioeconomic and Epidemiologic Modeling: A Fractional Differintegral Approach.” She holds an M.Sc. in Mathematics from Guru Jambheshwar University of Science & Technology (2018) and a B.Sc. from Maharshi Dayanand University (2016).

Profile:

🎓 Academic Journey:

  • Ph.D. in Mathematics (2019–2024)
    BITS Pilani, Rajasthan
    Thesis: Socioeconomic and Epidemiologic Modeling: A Fractional Differintegral Approach

  • M.Sc. Mathematics (2016–2018)
    Guru Jambheshwar University of Science & Technology, Hisar
    📈 Marks: 85.07%

  • B.Sc. (2013–2016)
    Government College Birohar, MDU Rohtak
    📊 Marks: 74.6%

🔬 Research Interests:

  • Fractional Calculus & Differential Equations

  • Delay Differential Equations

  • Mathematical Modeling in epidemiology, crime, social media, economics

  • Stability & Bifurcation Analysis

🏅 Achievements:

  • CSIR-UGC JRF/NET Qualified in Mathematical Sciences

  • 🏆 Best Paper Presentation – AMSE 2022

💻 Skills & Tools:

  • MATLAB | LaTeX

  • Expertise in Linear Algebra, Differential Equations, and Fractional Models

🌍 Conference & Workshop Participation:

  • Speaker/Presenter at top conferences: ICFC, ADENA, FPAS, AMSE

  • Attended numerous FDPs and workshops on fractional calculus, AI, optimization, and pedagogies

📊 Citation Metrics: 

  • Citations: 89

  • h-index: 6

  • i10-index: 3

Publication Top Notes:

  • Dynamics of crime transmission using fractional-order differential equations
    K. Bansal, S. Arora, K.S. Pritam, T. Mathur, S. Agarwal
    Fractals, 30(1), 2250012(1–16), 2022.

  • Analysis of illegal drug transmission model using fractional delay differential equations
    K. Bansal, T. Mathur, N.S.S. Singh, S. Agarwal
    AIMS Mathematics, 7(10), 18173–18193, 2022.

  • Fractional-order crime propagation model with non-linear transmission rate
    K. Bansal, T. Mathur, S. Agarwal
    Chaos, Solitons & Fractals, 169, 113321, 2023.

  • Impact of social media on academics: A fractional-order mathematical model
    K. Bansal, T. Mathur, T. Mathur, S. Agarwal, R.D. Sharma
    International Journal of Modelling and Simulation, 1–15, 2023.

  • The LADM approach to analyze the fractional-order model for smoking habits including memory
    K. Bansal, T. Mathur, S. Agarwal
    AIP Conference Proceedings, 2819(1), 040007, 2023.

  • Modeling crime transmission with fear effect: A fractional-order approach for effective crime control strategies
    K. Bansal, T. Mathur, S. Agarwal
    The Journal of Analysis, 1–21, 2024.

  • Impact of skills development on youth unemployment: A fractional-order mathematical model
    K. Bansal, T. Mathur
    Mathematical Methods in the Applied Sciences, 14286–14303, 2024.

  • LVIM approach to analyse the fractional-order model for childhood diseases
    N. Pareek, K. Bansal, A. Gupta, R. Mathur, T. Mathur, S. Agarwal
    Journal of Health Management, 26(4), 624–631, 2024.

  • Sensitivity analysis of fractional-order SVEIR lumpy skin disease model
    S. Rathee, Y. Narwal, K. Bansal, H. Emadifar
    Alexandria Engineering Journal, 119, 609–622, 2025.

  • Ordinary differential equations: Principles, techniques, and contemporary perspectives
    K. Bansal
    Notion Press. ISBN: 979-8896997016, 2025.

  • Analyzing unemployment dynamics: A fractional-order mathematical model
    S. Rathee, Y. Narwal, K. Bansal, T. Mathur, H. Emadifar
    Mathematical Methods in the Applied Sciences, 2025.

  • Fractional-order crime propagation model: A comparison between logistic and exponential growth
    K. Bansal, T. Mathur
    Ricerche di Matematica, 1–19, 2024.