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Manimaran, S.
- A Study on Comparison between Fuzzy Assignment Problems Using Trapezoidal Fuzzy Numbers with Average Method
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PDF Views:123
Authors
Affiliations
1 Department of Mathematics, R.K.M. Vivekananda College, Chennai-600 005, IN
2 Department of Mathematics, A.M. Jain College, Chennai-600 114, IN
1 Department of Mathematics, R.K.M. Vivekananda College, Chennai-600 005, IN
2 Department of Mathematics, A.M. Jain College, Chennai-600 114, IN
Source
Indian Journal of Science and Technology, Vol 5, No 4 (2012), Pagination: 2610-2613Abstract
Assignment problem is very often used in solving problems of engineering and management science. In this paper, trapezoidal fuzzy numbers are considered which are more realistic and general in nature. The fuzzy assignment problem has been transformed into crisp assignment problem in the LPP form solved by using LINGO 9.0 and the results were compared with average method. Subject classification: Fuzzy Logic- 03B52Keywords
Fuzzy Sets, Fuzzy Numbers, Fuzzy Assignment Problem, Fuzzy Ranking, Hungerian MethodFull Text
References
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- Existence of Solutions for Neutral Functional Integrodifferential Evolution Equations with Non Local Conditions
Abstract Views :208 |
PDF Views:0
Authors
Affiliations
1 Ramakrishna Mission Vivekananda College, Chennai-600 004, Tamil Nadu, IN
2 School of Advanced Sciences, Fluid Dynamics Division, VIT University, Vellore-632 014, Tamil Nadu, IN
3 Department of Mathematics, Sudharshan College of Engineering, Sathiyamangalam, Pudukkottai-622 001, Tamil Nadu, IN
4 Department of Mathematics and Physics, University of Eastern Africa, Baraton, Eldoret 2500-30100, KE
1 Ramakrishna Mission Vivekananda College, Chennai-600 004, Tamil Nadu, IN
2 School of Advanced Sciences, Fluid Dynamics Division, VIT University, Vellore-632 014, Tamil Nadu, IN
3 Department of Mathematics, Sudharshan College of Engineering, Sathiyamangalam, Pudukkottai-622 001, Tamil Nadu, IN
4 Department of Mathematics and Physics, University of Eastern Africa, Baraton, Eldoret 2500-30100, KE
Source
Indian Journal of Science and Technology, Vol 8, No 4 (2015), Pagination: 358-363Abstract
We study the existence of mild and strong solutions for nonlinear neutral functional integrodifferential evolution equations with nonlocal conditions in Banach spaces. The results are obtained by using the fractional powers of operators and Sadovskii's fixed point theorem.Keywords
Mild and Strong Solution, Neutral Equations, Nonlocal Condition, Semigroup.Full Text
- On the Results of Impulsive Neutral Integrodifferential Control Systems with an Infinite Delay
Abstract Views :251 |
PDF Views:0
Authors
Affiliations
1 School of Science, Humanities and Education, Amet University, Chennai-603 112, Tamil Nadu, IN
2 Ramakrishna Mission Vivekananda College, Chennai-600 004, Tamil Nadu, IN
3 School of Advanced Sciences, Fluid Dynamics Division, VIT University, Vellore-632014, Tamil Nadu, IN
4 Department of Mathematics, KPR Institute of Engineering and Technology, Arasur, Coimbatore-641 407, Tamil Nadu, IN
5 Department of Mathematics, Arcot Sri Mahalakshmi Women's College, Arcot, Vellore-632 521, Tamil Nadu, IN
1 School of Science, Humanities and Education, Amet University, Chennai-603 112, Tamil Nadu, IN
2 Ramakrishna Mission Vivekananda College, Chennai-600 004, Tamil Nadu, IN
3 School of Advanced Sciences, Fluid Dynamics Division, VIT University, Vellore-632014, Tamil Nadu, IN
4 Department of Mathematics, KPR Institute of Engineering and Technology, Arasur, Coimbatore-641 407, Tamil Nadu, IN
5 Department of Mathematics, Arcot Sri Mahalakshmi Women's College, Arcot, Vellore-632 521, Tamil Nadu, IN
Source
Indian Journal of Science and Technology, Vol 8, No 6 (2015), Pagination: 581-587Abstract
This paper deals with the sufficient conditions for the controllability of impulsive neutral functional integrodifferential systems with infinite delay in Banach space are established by means of the nonlinear alternative of Leray-Schauder type.Keywords
Controllability, Evolution Equations, Impulsive Differential Equation, Neutral Equation 2010 Mathematics Subject Classification: 34A37, 93B05, 34K40, 37L05.Full Text