Dr. Antony Edward Samuel
Assistant ProfessorRamanujan Research Centre, India
Highest Degree
Ph.D. in Mathematics from Bharathidasan University, India
Share this Profile
Area of Interest:
Selected Publications
- Samuel, E.A. and S. Kalaivani, 2017. Square sum labeling for some lilly related graphs. Int. J. Adv. Technol. Eng. Exp., 4: 68-72.
Direct Link | - Samuel, E.A. and S. Kalaivani, 2017. Prime labeling for some planter related graphs. (IJAR)-Indian J. Applied Res., 7: 136-145.
- Samuel, E.A. and P. Raja, 2017. A simple heuristic for obtaining an optimal solution for generalized fuzzy transportation problems. Int. J. Em. Trends Technol. Comput. Sci., 6: 390-394.
Direct Link | - Samuel, E.A. and P. Raja, 2017. Advanced approximation method for finding an optimal solution of unbalanced fuzzy transportation problems. Global J. of Pure Appl. Math., 13: 5307-5315.
Direct Link | - Samuel, A. and P. Raja, 2017. Algorithmic approach to unbalancedfuzzy transportation problem. Int. J. Pure Appl. Math., 5: 553-561.
Direct Link | - Samuel, E.A. and S. Kalaivani, 2016. Prime labeling for some planter related graphs. Int. J. Math. Res., 8: 221-232.
Direct Link | - Samuel, E.A. and S. Kalaivani, 2016. Prime Labeling For Some Octopus Related Graphs. (IOSR-JM)-Int. Org. Sci. Res. J. Math., 12: 57-64.
- Samuel, E.A. and P. Raja, 2016. Optimization of unbalanced fuzzy transportation problem. Int. J. Contemp. Math. Sci., 11: 533-540.
Direct Link | - Samuel, E.A. and C. Kayalvizhi, 2016. Hamiltonian fuzzy partition coloring, far east. J. Math. Sci., 99: 1061-1079.
- Samuel, E.A. and P. Raja, 2016. A new approach for solving unbalanced fuzzy transportation problems. Int. J. Comput. Optim., 3: 131-140.
- Samuel, E. and C. Kayalvizhi, 2016. On totally regular fuzzy graph. Int. J. Pure Appl. Math., 106: 115-125.
Direct Link | - Samuel, E.A. and D. Balan, 2015. Some aspects of a kind of pairwise semi generalized closed sets. Int. J. Pure Engg. Math., 3: 57-72.
- Samuel, E.A. and C. Kayalvizhi, 2015. On k-regular chromatic fuzzy graph. Adv. Fuzzy Sets Sys., 19: 155-169.
- Samuel, E.A. and C. Kayalvizhi, 2015. On hamiltonian colorings of fuzzy graphs. East J. Math. Sci., 98: 397-425.
- Samuel, E.A. and M. Venkatachalapathy, 2014. Improving izpm forunbalanced fuzzy transportation problems. Int. J. Pure Appl. Math., 94: 419-424.
Direct Link | - Samuel, E.A. and M. Venkatachalapathy, 2013. Improved zero point method for solving fuzzy transportation problem using ranking function. East J. Math. Sci., 75: 85-100.
- Samuel, E.A. and M. Venkatachalapathy, 2013. IZPM for unbalanced fuzzytransportation problems. Int. J. Pure Appl. Math., 86: 689-700.
Direct Link | - Samuel, E.A. and M. Venkatachalapathy, 2013. A simple heuristic for solvinggeneralized fuzzy transportation problems. Int. J. Pure Appl. Math., 83: 91-100.
CrossRef | Direct Link | - Samuel, E.A. and M. Venkatachalapathy, 2013. A new procedure for solving generalized trapezoidal fuzzy transportation problem. Adv. Fuzzy Sets Sys., 12: 111-125.
- Samuel, E.A. and M. Balamurugan, 2013. Intuitionistic fuzzy set with ordering technique in medical diagnosis. Aust. J. Basic Appl. Sci., 7: 753-753.
- Samuel, E.A. and M. Balamurugan, 2013. Interval valued fuzzy matrix and generalized fuzzy sets in medical diagnosis. Univ. J. Math. Sci., 3: 23-41.
- Samuel, E.A. and M. Balamurugan, 2013. Ifs withn-parameters in medical diagnosis. Int. J. Pure Appl. Math., 84: 185-192.
Direct Link | - Samuel, E.A. and M. Balamurugan, 2013. An application of fuzzy sets in identifying the blood groups. East J. Math. Sci., 82: 133-145.
- Samuel, E.A. and M. Balamurugan, 2013. An application of fuzzy set in medico-legal aspects. East J. Math. Sci., 77: 105-113.
- Samuel, E.A., 2012. Improved Zero Point Method (IZPM)for the Transportation Problems. Appl. Math. Sci., 6: 5421-5426.
Direct Link | - Samuel, E.A. and M. Venkatachalapathy, 2012. A new dual based approach for the unbalancedfuzzy transportation problem. Appl. Math. Sci., 6: 4443-4455.
Direct Link | - Samuel, E.A. and M. Balamurugan, 2012. Intuitionistic fuzzy set in medical diagnosis using ranking function. Surv. Math. Math. Sci., 2: 23-34.
- Samuel, E.A. and M. Balamurugan, 2012. Intuitionistic Fuzzy Sets with logical operators and its applications in Medical Diagnosis. Aus. J. Basic Appl. Sci., 6: 243-245.
- Samuel, E.A. and M. Balamurugan, 2012. Fuzzy max-min composition techniquein medical diagnosis. Appl. Math. Sci., 6: 1741-1746.
Direct Link | - Samuel, E.A. and M. Balamurugan, 2012. An application of fuzzy logic in medical diagnosis. Adv., Fuzzy Sets Sys., 12: 59-67.
- Samuel, E.A. and M. Venkatachalapathy, 2011. Modified vogels approximation method for fuzzy transportation problems. Appl. Math. Sci., 5: 1367-1372.
Direct Link | - Samuel, A.E., A.N. Gani and D. Anuradha, 2011. Simplex type algorithm for solving fuzzytransportation problem. Tamsui Oxford J. Inf. Math. Sci., 27: 89-98.
Direct Link | - Samuel, A.E., A.N. Gani and D. Anuradha, 2010. Optimization of air lift operationunder fuzzy environment. Appl. Math. Sci., 4: 2723-2732.
Direct Link | - Gani, N.A. and A.E. Samuel, 2007. A new algorithm for solving a fuzzy transportation problem. Adv. Fuzzy Sets Sys., 2: 310-314.
- Gani, A.N. and A.E. Samuel, 2006. Transportation problem in fuzzy Environment. Bull. pure appl. Sci., 25: 415-420.