This volume contains selected chapters on topics presented at the International Conference on Modeling, Analysis and Simulations of Multiscale Transport Phenomena (ICMASMTP 2022), held at the Department of Mathematics, Indian Institute of Technology Kharagpur, West Bengal, India, from 22–25 August 2022. It contains chapters on applications of FLOW THROUGH POROUS MEDIA, diffusion–reaction equations, fluid dynamics, multi-scale analysis, electrokinetic transport processes, microfluidics modelling, numerical analysis, and related topics. Contributors are academicians, experts and researchers in various disciplines of applied mathematics, numerical analysis and scientific computation, having applications in physics, engineering, chemistry, biology and medical science.
A. Jüngel and M. Biswas, Global Martingale Solutions to a Segregation
Cross-diffusion System with Stochastic Forcing.- A. Sandhya, M. Siva Mala, R.
Sandhya and G.Venkata Ramana Reddy, MHD Casson Fluid Flow over a Vertical
Porous Surface with the Effects of Radiation and Chemical Reaction.- S.
Singh, B. Sagar and S. Saha Ray, PaulPainlevé Approach to Solve (3 +
1)-dimensional Extended Sakovich Equation Arising in Fluid Dynamics.- H.
Ohshima, Unsteady Electrophoresis of a Spherical Colloidal Particle:
Time-dependent Transient Henry Function.- H. Kumar Shaw, Mallika Aich and
Subhamoy Singha Roy, Reverse Transcription Polymerase Spin Chain Reaction.-
A. K. Nayak and M. Majhi, Numerical Study of Ion Transport and Convective Min
Micro Channel with Nozzle/Diffuser.- M. Chaudhary and H. Shankar Mahato,
Analytical Solution of Multi-species Pollutant Transport Problem Coupled with
Linear Reactions and Additional Source/Sink Term.- N. Kumar, S. Kumar, V.
Kumar, S. Datta and S. S. Roy, A Theoretical Model Slant to the Fermi Energy
for Low-dimensional Materials.- P. Mondal and D. K. Maiti, A Mixed Convection
Two-dimensional Flow and Heat Transfer of Power Law Fluid Past through Porous
Microchannel.- P. Koner and S. Bera, Electroosmotic Flow of Generalized
Maxwell Fluids in Polyelectrolyte Grafted Nanopore Modulated by Ion
Partitioning Effects under AC Electric Field.- R. Bhardwaj and Inderjeet,
Numerical Simulation of Parabolic Partial Differential Equation.- N. Chauhan,
FVM Simulation Study for Dispersion Pattern of Indoor Thoron Gas using
Computational Fluid Dynamics (CFD) Modeling: Effect of Room Configuration.-
S. Singh and S. Saha Ray, Propagation of Two-wave Solitons Depending on
Phase-velocity Parameters of Two Higher-dimensional Dual-mode Models in
Nonlinear Physics.- S. S. Banerjee, A. Bhattacharyya, S. K. Sharma and S. C.
Panja, Delay Modelling of Selected Trains in Indian Railways.- S. Behera,
Analytical Solutions of Fractional Order NewellWhiteheadSegel Equation.- S.
S. Barman and S. Bhattacharyya, Gel Electrophoresis of a Polarizable Charged
Colloid with Hydrophobic Surface.- S. Ghosh and S. S. Roy, Photon Echo on DNA
Molecules: A Theoretical Study.- S. Hossain, K. Ghoshal and A. Dhar,
Numerical Simulation of a Simplified Stratification Model of Suspended
Sediment Concentration in an Open-channel Turbulent Flow.- S. Sen, S. Hossain
and K. Ghoshal, Effects of Hydrodynamic Phenomena on Two-dimensional
Distribution of Suspended Sediment Concentration in an Open Channel Flow.- Y.
Nandkuliyar and S. S. Roy, Theoretical Models of DNA Elasticity.
Somnath Bhattacharyya is Institute Chair Professor in the Department of Mathematics at the Indian Institute of Technology Kharagpur. Prof. Bhattacharyya did his PhD from the Indian Institute of Science, Bangalore. His research interests are Computational Fluid Dynamics, microfluidics and microscale transport, Partial Differential Equations and Scientific Computing. Prof. Bhattacharyya has received several prestigious fellowships for research collaboration abroad and was elected FNASC. He has published more than 200 papers, completed several sponsored research projects and offered online NPTEL courses. Prof. Bhattacharyya is recognized for his work in Applied Mathematics particularly his contributions to devising numerical methods for solving electrokinetic transport in microscale. His research focuses on mathematical modelling and numerical analysis incorporating inherently non-linear effects to analyse underlying physical mechanisms of several complicated transport phenomena. These studies establish the bridge between the theoretical understanding and experimentally observed phenomena. A significant part of his work focuses on the development of advanced numerical algorithms to compute nonlinear PDEs.
Hari Shankar Mahato is an Assistant Professor in the Department of Mathematics at the Indian Institute of Technology Kharagpur. Dr. Mahato did his PhD from the University of Bremen in 2013 on the homogenisation of a system of nonlinear diffusion-reaction equations in a porous medium. His research interests are Partial Differential Equations, Applied Analysis and Homogenisation Theory. He was a postdoctoral researcher at the University of Erlangen-Nürnberg, TU Dortmund and at the University of Georgia. He has a decade-long experience in the fields of applied analysis and is an active researcher in this community.
