| Clustering method for reducing order of linear system using Pade approximation CB Vishwakarma, R Prasad IETE journal of research 54 (5), 326-330, 2008 | 137 | 2008 |
| MIMO system reduction using modified pole clustering and genetic algorithm CB Vishwakarma, R Prasad Modelling and Simulation in Engineering 2009 (1), 540895, 2009 | 108 | 2009 |
| Biased reduction method by combining improved modified pole clustering and improved Pade approximations J Singh, CB Vishwakarma, K Chattterjee Applied Mathematical Modelling 40 (2), 1418-1426, 2016 | 96 | 2016 |
| Two degree of freedom internal model control-PID design for LFC of power systems via logarithmic approximations J Singh, K Chattterjee, CB Vishwakarma ISA transactions 72, 185-196, 2018 | 91 | 2018 |
| Order reduction using modified pole clustering and Pade approximations CB Vishwakarma International Journal of Electrical and Computer Engineering 5 (8), 1003-1007, 2011 | 78 | 2011 |
| Time domain model order reduction using Hankel matrix approach CB Vishwakarma, R Prasad Journal of the Franklin Institute 351 (6), 3445-3456, 2014 | 53 | 2014 |
| System reduction by eigen permutation algorithm and improved Pade approximations J Singh, K Chatterjee, CB Vishwakarma International Journal of Mathematical and Computational Sciences 8 (1), 180-184, 2014 | 29 | 2014 |
| Order reduction using the advantages of differentiation method and factor division algorithm CB Vishwakarma, R Prasad CSIR, 2008 | 29 | 2008 |
| Modified Hankel matrix approach for model order reduction in time domain CB Vishwakarma International Journal of Physical and Mathematical Sciences 8 (2), 404-410, 2014 | 18 | 2014 |
| System Reduction Using Modified Pole Clustering and Pade Approximation. CB Vishwakarma, R Prasad | 18 | 2008 |
| Model order reduction of linear dynamic systems for control system design CB Vishwakarma Indian Institute of Technology Roorkee, 2009 | 17 | 2009 |
| Reduced order modelling for linear dynamic systems J Singh, K Chatterjee, CB Vishwakarma AMSE Advancements of modeling and simulation techniques 1 (70), 71-85, 2015 | 16 | 2015 |
| Order abatement of linear dynamic systems using renovated pole clustering and Cauer second form techniques A Kumari, CB Vishwakarma Circuits, Systems, and Signal Processing 40, 4212-4229, 2021 | 14 | 2021 |
| MIMO system using eigen algorithm and improved Pade approximations J Singh, K Chattterjee, CB Vishwakarma SOP Trans. Appl. Math 1 (1), 60-70, 2014 | 13 | 2014 |
| System reduction using modified pole clustering and modified Cauer continued fraction J Singh, CB Vishwakarma, K Chatterjee International Journal of Electrical and Computer Engineering 8 (9), 1526-1530, 2015 | 8 | 2015 |
| Model order reduction using eigen algorithm J Singh, K Chatterjee, CB Vishwakarma International Journal of Engineering, Science and Technology 7 (3), 17-23, 2015 | 6 | 2015 |
| State of charge estimation techniques of Li-ion battery of electric vehicles A Singh, K Pal, CB Vishwakarma e-Prime-Advances in Electrical Engineering, Electronics and Energy 6, 100328, 2023 | 4 | 2023 |
| A renovated pole clustering technique for model order reduction A Kumari, CB Vishwakarma 2019 International Conference on Power Electronics, Control and Automation …, 2019 | 4 | 2019 |
| Order reduction of dynamic systems by using renovated pole clustering technique A Kumari, CB Vishwakarma 2019 2nd International Conference on Power Energy, Environment and …, 2019 | 4 | 2019 |
| Linear model order reduction using Mihailov criterion and Cauer second form R Prasad, CB Vishwakarma Journal of Institution of Engineers (India)–Electronic Letters 90, 18-21, 2009 | 3 | 2009 |
