SCI/SCOPUS Indexed

[1] T. Gudi, G. Mallik and T. Pramanick, A Hybrid-high order method for quasi-linear elliptic problems of nonmonotone type, SIAM J. Numer. Anal. (SINUM), 60:4 (2022), pp. 2318–2344.

[2] T. Pramanick and R. K. Sinha, Two-scale composite finite element method for parabolic problems with smooth and nonsmooth initial data, J. Appl. Math. Comp., Elsevier, Springer, 58:1-2 (2018), pp. 469–501.

[3] T. Pramanick and R. K. Sinha, Composite finite element approximation for nonlinear parabolic problems in nonconvex polygonal domains, Numer. Methods for Partial Differential Eq., Willey, 34:6 (2018), pp. 2316–2335.

[4] T. Pramanick, Error Estimates for a Semidiscrete Finite Element Method for Nonlinear Parabolic Equations in Nonconvex Polygonal Domains, Int. J. Adv. Research Sci. Engg., 7 (2018), no. 2, pp. 695–705.

[5] T. Pramanick, Fully discrete Finite Element Approximations of Semilinear Parabolic Equations in a Nonconvex Polygon, Int. J. Adv. Research Sci. Engg., 7 (2018), no. 4, pp. 338–344.

[6] T. Pramanick, Managing Error Estimates for Semidiscrete Finite Element Approximations of Semilinear Parabolic Equations in a Nonconvex Polygon, Kaav Int. J. Sci., 5 (2018), no. 2, pp. 50-56.

[7] T. Pramanick and R. K. Sinha, Error estimates for two-scale composite finite element approximations of parabolic equations with measure data in time for convex and nonconvex polygonal domains, Appl. Numer. Math., Elsevier, 143 (2019), pp. 112–132.

[8] T. Pramanick and R. K. Sinha, Composite finite element approximation for parabolic problems in nonconvex polygonal domains, Comp. Methods Appl. Math., De Gruyter, 20:2 (2020), pp. 361–378.

[9] T. Pramanick and S. Mahata, Error estimates for finite element approximations of nonlinear parabolic problems in nonconvex polygonal domains, Adv. Math. Sci. J., 9:9 (2020), pp. 6513–6524.

[10] T. Pramanick, Error estimates for two-scale composite finite element approximations of nonlinear parabolic equations, J. Comp. Math., 39:4 (2021), pp. 511–535.

[11] A. Anand and T. Pramanick, Adaptation of the composite finite element framework for semilinear parabolic problems, J. Numer. Anal. Approx. Theory, 53:1 (2024), pp. 130-157.

[12] A. Anand, T. Pramanick and A. Das, Application of a finite element method variant in nonconvex domains to parabolic problems, Finite Elem. Anal. Des., 242 (2024), pp. 104265.

[13] A. Anand and T. Pramanick, Application of the Composite Finite Element Framework for Evolution Equation, Springer Proceedings in Mathematics & Statistics, vol 517, 2025, Springer, Singapore.

[14] A. Anand and T. Pramanick, Application of the Composite finite element framework for Evolution equation with nonsmooth kernel in smooth domain, Int. J. Comput. Methods., 23:03 (2025), 2550061.

[15] S. Gupta, P. Sharma, T. Pramanick, Efficient Numerical Evaluation of Triple Integral Using the Euler's Method and Richardson's Extrapolation, Internat. J. Numer. Methods Engrg., 127:4 (2026).

1. Life Member of the Indian Mathematical Society (IMS).

2. Life Member of the Indian Society of Industrial and Applied Mathematics (ISIAM).

3. Life Member of the Indian Science Congress Association (ISCA).

4. Life Member of the Ramanujan Mathematical Society (RMS).

5. Life Member of the AI-ML Innovative Entrepreneurs and Engineers Association (AMIEE).

[1] Faculty Research Seed Grant (FRG) 2022. Duration- May 2022 to May 2024. Topic: Two-Scale Composite Finite Element Method for Fractional Order Diffusion Equations in Convex and Nonconvex Polygonal Domains.

[2] VRITIKA Research Internship on ``Finite Element Method and Industrial Applications''. Sponsored by SERB. Duration: June 1, 2022 - July 15, 2022.

[3] NBHM project on "Error Estimates for Two-Scale Composite Finite Element Approximations of Nonlinear Thermistor Equations in Nonconvex Polygonal Domains". Duration: June 2023 - June 2026.

1. Coordinator for Faculty Development Programme (FDP) on “Physical Systems and Mathematical Modelling (PSMM-2022)” on 24.01.2022 - 29.01.2022, Department of Mathematics and Physics, NIT Calicut.

2. Three intern students completed summer internship under the scheme VRITIKA Research Internship on ``Finite Element Method and Industrial Applications''. Sponsored by SERB. Duration: June 1, 2022 - July 15, 2022.

3. Coordinator for ANRF SERB Sponsored FDP on “Recent Trends in Differential Equations and Numerical Computing (RTDENC-2025)”, 20-24 June 2025, Department of Mathematics, NIT Calicut.

4. Coordinator for SPIC Macay event and Prof. Kiran Seth Visit NIT Calicut under Centre for Cultural and Art Relations (CCAR), 30-31 Oct 2025, Department of Mathematics, NIT Calicut.

1. Sachin, “System of Partial Differential Equations”, May 2021.

2. Subham Yadav, “Alternating Direction Implicit (ADI) Method and Solving Poisson Boltzman Equation”, May 2022.

3. Sain S K, “Finite Element Analysis for Heat Equations”, May 2023.

4. Abhijeet Kumar Rajbhar, “Numerical Approach of Delay Differential Equations by Runge-Kutta Method”, May 2023.

5. Prashant Sharma, "Numerical solutions of nanobeam structures", May 2024.

6. Rahul Verma, “Thermal Vibration Analysis of Euler Nanobeam Using ADM and HPM”, April 2025.

Finite Element Method, Numerical Analysis, Scientific Computing

[1] Invited speaker for the workshop “Vortex Dynamics: The Crossroads of Mathematics, Physics and Applications” at the Institute for Advance Study in Mathematics (IASM) Hangzhou, China during 3-8 Dec 2023. Title: Finite Element Method and Applications.

[1A] Invited talk for the conference “Numerical Solution of Differential and Differential Algebraic Equations (NUMDIFF-17)” at Martin Luther University, Institute of Mathematics, Halle (Saale), Germany during 09-13 Sep 2024.

[2] Invited speaker for the workshop DST-STUTI on “Computational Studies of Differential Equations: Modelling, Theory and Simulation (CSDE-MTS)”, ICT Mumbai-NIT Calicut, 24-30 Jul 2023.

[3] Keynote speaker for the Karyashala workshop on “Data Analytics in Electrical Energy System (DAES-2023)”, NIT Calicut, 22-28 Mar 2023.

[4] Keynote speaker for the FDP “PSMM-2022”, NIT Calicut, 24-29 Jan 2022.

[5] Invited speaker for the conference “CSMCS-2020”, NIT Calicut, 10-12 Sep 2020.

[6] Invited speaker for the workshop "Recent development of mathematical sciences on biological and dynamical systems with fuzzy and fractional environments" Mahadevananda Mahavidyalaya, Kolkata, 19-29 Jun 2024.

[7] Invited talk for the international conference on “Mathematical Methods and Numerical Computation for Nonlinear Dynamics in Biological and Physical Sciences” at Mahadevananda Mahavidyalaya, Kolkata, 5-7 May 2025.

[8] Invited speaker for the workshop on “Scientific Computing & Documentation with MATLAB and LaTeX”, ICFAI University Tripura, 2-4 Sep 2025.

[9] Keynote Speaker “Use of MATLAB in Mathematics”, NIT Uttarakhand, 20-21st Sept 2025.

[10] Invited Speaker and Session Chair for the ‘International Conference on Recent Advance- ments in Physical Sciences (ICRAPS)’, NIT Uttarakhand, 6-8 Feb 2026.

[11] Invited Speaker SPARC sponsored short term course and workshop `NAMO-PI4' at NIT Calicut, 16-20 Feb 2026.

[1] JAM 2011 qualified.

[2] Merit cum Means (MCM) Scholarship from IIT Guwahati 2011-13 received.

[3] GATE 2013 qualified.

[4] NET 2019 qualified.

[5] NBHM 2019 postdoctorate fellowship qualified.

[6] SERB International Travel Support (ITS-2024) Scheme for conference at Halle (Saale), Germany qualified.

[7] ANRF SERB Seminar/Symposia (SSY) grant scheme for organizing FDP “RTDENC-2025” as a coordinator at NIT Calicut.

[8] Received Best Young Researcher Award at 65th Foundation Day at NIT Calicut. Sep 1, 2025.

[9] Received Dr. Sarvepalli Radhakrishnan Memorial National Award-2025 (Outstanding Mathematics Teacher) by International Association of Research and Developed Organiza- tion (IARDO) at New Delhi, Sep 5, 2025.

1. “Finite Element Method and Industrial Applications: Hyperbolic Problems”, S. Baskaran, July 2022.
2. “Finite Element Method and Industrial Applications: Elliptic Problems”, Manoj P, July 2022.
3. “Finite Element Method and Industrial Applications: Parabolic Problems”, T. Mummoorthy, July 2022.

4. "Finite difference solution for two-dimensional steady-state convection-diffusion equation for both linear and quasi-linear models", Eldho Saji, July 2025.
5. “Finite difference method for a model of fluid flow in a porous media by using Darcy’s law”, Alex Tom, July 2025.

1. “Laplace Transform and its Application”, Vasuda TV, December 2025.

1. "Error Estimation and Analysis of Finite Element Method variant on Parabolic Problems", Anjaly Anand, 9th March 2026.

2. Shubhangini Gupta, ongoing.