Dr. Rangan Kumar Guha
Basic Details
Name | Dr. Rangan Kumar Guha |
Designation | Professor |
Department | Mathematics |
Contact
Phone (O) | 01672-253262 |
Phone(R) | 01672-253263 |
Mobile | 9878908338, 8837716284 |
Educational Details
Educational Qualification | M.Sc in Applied Mathematics from Jadavpur University, Kolkata, in the year 1987. Ph.D from IIT, Kanpur, in the year 1995 |
Experience
Experience | 25 years |
Professional Memebership
Professional Membership | 1. Life member of Indian Society for Technical Education. |
Publications
Publications | Papers in refereed journals 1. Kaur, G., Dhar, J. and Guha, R. K. 2016. Minimal variability OWA operator combining ANFIS and Fuzzy c-means for forecasting BSE index, Mathematics and Computers in Simulation 122:69-80. (ISSN: 0378-4754) (I.F: 1.218). 2. Janak Raj Sharma & Rangan K. Guha, Simple yet efficient Newton-like method for systems of nonlinear equations, International Journal of Calcolo, 53(2016) pp-451-473, ISSN 0008-0624. (I.F: 1.407). 3. Kaur, G., Dhar, J. and Guha, R.K. ‘A hybrid approach to forecast stock market index’, Int. J. Artificial Intelligence and Soft Computing. Vol. 5, No. 2 (2015) pp. 165-176.(ISSN-1755-4969). 4. G. Kaur, J. Dhar, R. K. Guha, Stock market forecasting using ANFIS with OWA operators, International Journal of Artificial Intelligence, 12(2014), 102-114. ISSN 0974-0635. 5. G. Kaur, J. Dhar, R. K. Guha, ‘An adaptive network-based fuzzy inference system for the prediction of stock market: BSE30 and IBOVESPA’, Journal of Combinatorics, Information & System Sciences, 38(2013), 183-190.ISSN: 0250-9628 6. Janak Raj Sharma, Rangan K. Guha and Puneet Gupta, Improved King’s methods with optimal order of convergence based on rational approximations, Applied Mathematics Letters, Vol.26 (2013), pp 473-480. (I.F: 2.233). 7. Janak Raj Sharma, Rangan Kumar Guha, Rajni Sharma, An efficient fourth order weighted-Newton method for systems of nonlinear equations, Numerical Algorithms, Vol. 62 (2013), pp 307-323. (I.F: 1.241). 8. Janak Raj Sharma, Rangan K. Guha and Puneet Gupta, Some efficient derivative free methods with memory for solving nonlinear equations, Applied Mathematics and Computation, Vol. 219 (2012), pp 699 – 707. (I.F: 1.738). 9. J.R. Sharma, R.K. Guha and R. Sharma, A Unified approach to generate weighted Newton third order methods for solving nonlinear equations, Journal of Numerical Mathematics and Stochastics, Vol. 4 No. 1 (2012) pp 48 – 58. 10. Janak Raj Sharma, Rangan Kumar Guha, Rajni Sharma, Improved Ostrowski-Like Methods Based on Cubic Curve Interpolation, Applied Mathematics Vol. 2 (2011) pp 816 – 823. 11. J.R. Sharma, R.K. Guha and Rajni Sharma, Some modified Newton’s methods with fourth-order convergence, Advances in Applied Science Research, 2011, 2(1), pp 240 – 247. 12. J.R. Sharma & R.K. Guha, Second-derivative free methods of third and fourth order for solving nonlinear equations, International Journal of Computer Mathematics, Vol. 88, No. 1, (2011), pp 163 – 170. 13. J.R. Sharma, R.K. Guha & Rajni Sharma, Some variants of Hansen-Patrick method with third and fourth order convergence, Applied Mathematics and Computation, Vol. 214 (2009), pp 171 – 177. (I.F: 1.738). 14. J.R. Sharma and R.K. Guha, A family of modified Ostrowski methods with accelerated sixth order convergence., Applied Mathematics and Computation, Vol. 190 (2007), pp 111 – 115. (I.F: 1.738). 15. V. Kanwar, Sukhjit Singh, R. K. Guha and Mamta : On method of osculating circle for solving nonlinear equations, Applied Mathematics and Computation, Vol. 176 (2006), pp 379 – 382. (I.F: 1.738). 16. Sharma, AK, Sarkar, BC, Sharma, HK, and Guha, RK., Energy and Peak Force Requirement in Carrot Slicing, Journal Of Food Science & Technology, Vol. 42 (2005) pp 174 – 178. 17. Guha, R.K., Linear Programming Problem associated with a Bisubmodular Polyhedron. The Mathematics Education, Vol. 44 (3) Sept. (2010) pp 162-170. |