Fuzzy Arbitrary Order System: Fuzzy Fractional Differential Equations and Applications S Chakraverty, S Tapaswini, D Behera John Wiley & Sons, 2016 | 94 | 2016 |
Fuzzy Differential Equations and Applications for Engineers and Scientists S Chakraverty, S Tapaswini, D Behera CRC Press, 2016 | 89 | 2016 |
A new method for solving real and complex fuzzy systems of linear equations D Behera, S Chakraverty Computational Mathematics and Modeling 23 (4), 507-518, 2012 | 63 | 2012 |
Erratum to “Solving fuzzy complex system of linear equations”[Information sciences 277 (2014) 154–162] D Behera, S Chakraverty Information Sciences 369, 788-790, 2016 | 49* | 2016 |
Solving fuzzy complex system of linear equations D Behera, S Chakraverty Information Sciences 277, 154-162, 2014 | 49 | 2014 |
New approach to solve fully fuzzy system of linear equations using single and double parametric form of fuzzy numbers D Behera, S Chakraverty Sadhana 40 (1), 35-49, 2015 | 42 | 2015 |
Fuzzy system of linear equations with crisp coefficients S Chakraverty, D Behera Journal of Intelligent and Fuzzy Systems 25 (1), 201-207, 2013 | 41 | 2013 |
Dynamic responses of fractionally damped mechanical system using homotopy perturbation method S Chakraverty, D Behera Alexandria Engineering Journal 52 (3), 557-562, 2013 | 37 | 2013 |
Fuzzy finite element analysis of imprecisely defined structures with fuzzy nodal force D Behera, S Chakraverty Engineering Applications of Artificial Intelligence 26 (10), 2458–2466, 2013 | 32 | 2013 |
New methods for solving imprecisely defined linear programming problem under trapezoidal fuzzy uncertainty D Behera, K Peters, SA Edalatpanah, D Qiu Journal of Information and Optimization Sciences 42 (3), 603-629, 2021 | 26 | 2021 |
Formal solution of an interval system of linear equations with an application in static responses of structures with interval forces S Chakraverty, M Hladík, D Behera Applied Mathematical Modelling 50, 105-117, 2017 | 25 | 2017 |
Numerical solution of fractionally damped beam by homotopy perturbation method D Behera, S Chakraverty Central European Journal of Physics 11 (6), 792-798, 2013 | 25 | 2013 |
Solution to fuzzy system of linear equations with crisp coefficients D Behera, S Chakraverty Fuzzy Information and Engineering 5 (2), 205-219, 2013 | 22 | 2013 |
A new approach for solving fully fuzzy linear programming problem SK Das, T Mandal, D Behera International Journal of Mathematics in Operational Research 15 (3), 296-309, 2019 | 21 | 2019 |
Solution of fuzzy system of linear equations with polynomial parametric form D Behera, S Chakraverty Applications and Applied Mathematics 7 (2), 648-657, 2012 | 21 | 2012 |
Fuzzy finite element based solution of uncertain static problems of structural mechanics D Behera, S Chakraverty International Journal of Computer Applications 69 (15), 6-11, 2013 | 17 | 2013 |
Solving the nondeterministic static governing equations of structures subjected to various forces under fuzzy and interval uncertainty D Behera, S Chakraverty International Journal of Approximate Reasoning 116, 43-61, 2020 | 14 | 2020 |
Parameter identification of multistorey frame structure from uncertain dynamic data S Chakraverty, D Behera Strojniški vestnik-Journal of Mechanical Engineering 60 (5), 331-338, 2014 | 14 | 2014 |
Uncertain impulse response of imprecisely defined half order mechanical system D Behera, S Chakraverty Annals of Fuzzy Mathematics and Informatics 7 (3), 401-419, 2014 | 13 | 2014 |
Fuzzy centre based solution of fuzzy complex linear system of equations D Behera, S Chakraverty Int J of Uncertainty,Fuzziness and Knowledge-Based Systems 21 (4), 629-642, 2013 | 13 | 2013 |