1 |
Long-Time Dynamics and Optimal Control of a Diffuse Interface Model for Tumor Growth Cavaterra C, Rocca E, Wu H Applied Mathematics and Optimization, 83(2), 739, 2021 |
2 |
Modeling of autocatalytic degradation of polymer microparticles with various morphologies based on analytical solutions of reaction-diffusion equations Cho YS Korean Journal of Chemical Engineering, 38(2), 422, 2021 |
3 |
Effect of Biot number on unsteady reaction-diffusion phenomena and analytical solutions of coupled governing equations in porous particles with various shapes Cho YS, Sung SY Korean Journal of Chemical Engineering, 37(11), 1836, 2020 |
4 |
Sliding Mode Control for a Phase Field System Related to Tumor Growth Colli P, Gilardi G, Marinoschi G, Rocca E Applied Mathematics and Optimization, 79(3), 647, 2019 |
5 |
Modelling of reaction-diffusion process at carbon nanotube - Redox enzyme composite modified electrode biosensor Murali K, Sonaiyappan B, Lakshmanan R Chemical Physics Letters, 715, 20, 2019 |
6 |
Feedback Stabilization of a 1-D Linear Reaction -Diffusion Equation With Delay Boundary Control Prieur C, Trelat E IEEE Transactions on Automatic Control, 64(4), 1415, 2019 |
7 |
A De Giorgi Iteration-Based Approach for the Establishment of ISS Properties for Burgers' Equation With Boundary and In-domain Disturbances Zheng J, Zhu GC IEEE Transactions on Automatic Control, 64(8), 3476, 2019 |
8 |
Akbari-Ganji's Method (AGM) for solving non-linear reaction - Diffusion equation in the electroactive polymer film Dharmalingam KM, Veeramuni M Journal of Electroanalytical Chemistry, 844, 1, 2019 |
9 |
Analytical Solutions of Unsteady Reaction-Diffusion Equation with Time-Dependent Boundary Conditions for Porous Particles Cho YS Korean Chemical Engineering Research, 57(5), 652, 2019 |
10 |
Wavelet based spectral approach for solving surface coverage model in an electrochemical arsenic sensor - An operational matrix approach Sathiyaseelan D, Gumpu MB, Nesakumar N, Rayappan JBB, Hariharan G Electrochimica Acta, 266, 27, 2018 |