Profile
Name: Dr. Nirmal Kumar Mandal
Designation : Associate Professor (Head)
Department name: Mathematics
Mobile No : 9434987339
E-mail ID :
Area of Specialization : Operations Research
Date of joining : 02.07.2004
Educational Qualification:
Sl No / Name of degree / Institution / Year of passing/awarded1 / PhD / Indian Institute of Engineering Science and Technology (IIEST), Shibpur, Howrah
(Previousy, BESU) / 2008
2 / MSc / Vidyasagar University / 1996
Teaching Experience :
Sl No / Designation / Institution / Length of service1 / Assistant Teacher / Haludbari High School (HS) / 3 years since 1999
2 / Lecturer / Subarnarekha Mahavidyalaya / 2 years since 2002
3 / Visiting faculty / Netaji Subhas Open University, MSc in Mathematics / 10 years
4 / Visiting faculty / Vidyasagar University, MCA Dept / 1 year
5 / Visiting faculty / Midnapore College (Autonomous), MSc in Mathematics / 4 years
6 / Visiting faculty / Mahishadal Raj College, MSc in Mathematics / 1 years
Subject taught:
1. Abstract Algebra
2. Linear Algebra
3.,Real Analysis
4. Dynamics of a particle
5. Computer Science
6. Numerical Analysis
7. Vector Analysis
8. Tensor Analysis
9. Discrete Mathematics
10. Mathematics Modelling
11. Continuum Mechanics
12. Integral Equation & Integral Transform
13. Fluid Mechanics
14. Linear & Non Linear Optimization
Research Project:
Type / Name of Project / Worked as / Funding Agency / AmountRs. / Duration / Period / Status
Minor / Geometric Programming Method and its Industrial Application in Crisp and Fuzzy Environment / Principal Investigator / UGC / 1,79,000/- / 2 years / 2011-13 / Completed
Association with Professional Bodies:
1. Head of the Department since 2004
2. Member of Governing Body since 2006
3. Member of Finance Committee since 2006
4. Programme Officer of NSS from 2005 to 2009
5. Convenor of Students’ Welfare Committee since 2006
Research Publications:
1. A multi-item displayed inventory model with fuzzy number, Proc. of “The National Symposium On Recent Advances of Mathematics and its Applications in Science and Society”, Kalyani University, 2002, 121-149.
2. A multi-item inventory model with demand-dependent unit cost: A geometric programming approach, National Seminar in “Advances in Mathematical, Statistical and Computational Methods in Science and Technology” Indian School of Mines, Dhanbad, 2003, pp. 259 – 274.
3. Geometric programming method for solving MC2 level inventory programming problem with fuzzy cost parameters, ‘Proceedings of National Seminar on ‘Recent Advances in Applied Mathematics’ Vidyasagar University, 18-19 March, 2004, 120-125.
4. Multi-objective fuzzy inventory model with three constraints: A geometric programming approach, International Journal of Fuzzy Sets and Systems, 150 (2005) 87-106.
5. A fuzzy inventory problem with stock dependent inventory costs via geometric programming approach, Tamsui Oxford Journal of Management Science, Vol. 21, No. 1, (2005) 89-98.
6. Interactive Fuzzy Geometric Programming Method for Multi-objective Inventory Model, ‘International Conference on Analysis and Discrete Structures’ Department of Mathematics, Indian Institute of Technology, Kharagpur; Fuzzy Logic and Optimization, Narosa Publishing House, New Delhi, India (2006) 15-29.
7. Multi-item deteriorated inventory model with a constraint: A geometric programming approach, European Journal of Operational Research, Vol. 173, No. 1 (2006), 199-210.
8. Multi-item fuzzy inventory problem with space constraint via geometric programming method, Yugoslav Journal of Operations Research, Vol. 16, No. 1, (2006) 55-66. ISSN: 0354-0243
9. A displayed Inventory model with L-R fuzzy number, Fuzzy Optimization and Decision Making, Vol. 5 (2006) 227-243.
10. Multi-item imperfect production lot size model with hybrid number cost parameters, Applied Mathematics and Computation, Vol 182 (2006) 1219-1230.
11. An MC2 level inventory problem: A Geometric Programming approach, Tamsui Oxford Journal of Management Science, Vol. 23, No. 4 (2007), 49-66.
12. A Multi-criteria Multi-constraint Level Economic Production and Marketing Planning Problem with Fuzzy Cost Parameters: A Geometric Programming Approach, The Journal of Fuzzy Mathematics, Vol. 16 (4), (2008). 835-852.
13. Geometric programming approach to an interactive fuzzy inventory problem, Advances in Operations Researech, Vol. 2011, (2011), 1-17.
14. Fuzzy Economic order quantity model with ranking fuzzy number costparameters, Yugoslav Journal of Operations Research, Vol 22, 2012, pp. 247-264. ISSN: 0354-0243
15. An Imperfect Quality Inventory Problem: A Geometric Programming Approach, International Journal of Mathematical Sciences and Engineering Applications, Vol 7, No 1, Jan 2013, pp-185-195, ISSN: 0973-9424
16.An Economic Production Inventory Problem with Reworking of Imperfect Items in Fuzzy Environment, MATEMATIKA (Malaysian Journal of Industrial and Applied Mathematics), Vol. 30, No. 1, 2014, pp. 17-35. ISSN: 0127-8274.
17. Imperfect Production Inventory Problem with Interval Valued Coefficients, International Journal of Mathematical Sciences and Engineering Applications, Vol 9, No 1, March 2015, pp-241-248, ISSN: 0973-9424
18. An Imperfect Production Inventory Problem with Inspection Errors, Journal of Mathematics and Informatics, Vol 5, 2016, 45 – 55, ISSN: 2349 – 0632.