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An Inventory Model with Quadratic Demand, Constant Deterioration and Salvage Value

Author Affiliations

  • 1GITAM School of International Business, GITAM University, Visakhapatnam, INDIA
  • 2Dept of Mathematics, College of Military Engineering, Pune, INDIA

Res. J. Mathematical & Statistical Sci., Volume 2, Issue (1), Pages 1-5, January,12 (2014)

Abstract

In this paper we have studied an inventory model for deteriorating products with demand rate is quadratic function of time .This model is developed to find the total cost of the inventory system. Here the deterioration is considered as constant. The salvage value is used for deteriorated items in the system. Suitable numerical example and sensitivity analysis is also discussed.

References

  1. Goyal S.K. and Giri. B.C., Recent trends in modeling of deteriorating inventory, E. J. of Op. res., 134, 1-16 (2001)
  2. Bhandari R.M. and Sharma S.K., A single period inventory problem with Quadratic demand distribution under the influence of market policies, Engg Sci., 12(2) 117-127 (2000)
  3. Kharna S. and Chaudhuri K.S., A note on order level inventory model for a deteriorating item with timedependent quadratic demand, Comp. and Ops Res., 30, 1901-1916 (2003)
  4. Sana S. and Chaudhary K.S, A Stock-Review EOQ Model with Stock-Dependent Demand, Quadratic Deterioration Rate, Adv Modeling and Optimization 6(2), 25-32 (2004)
  5. Ghosh S.K. and Chaudhuri K.S., An order- level inventory model for a deteriorating item with Weibull Deterioration, Time-quadratic demand and shortages, Advanced Modeling and Optimization, 6(1), 21-35 (2004)
  6. Kaley McMahon, Deteriorating Inventory Model for two Parameter Weibull Demand with Shortages, American Jourl of Math Modell, 1(3), (2011)
  7. Venkateswarlu R. and Mohan R., An Inventory Model with Weibull Deterioration, Time Dependent Quadratic Demand and Salvage Value, AIMS -10, Proceedings, Bangalore, (2013a)
  8. Venkateswarlu R. and Mohan R., An Inventory Model for Time Varying Deterioration and Price Dependent Quadratic Demand with salvage value, Ind. J. of Computational and App.d Math., 1(1), 21-27 (2013b)
  9. Mohan R. and Venkateswarlu R., Inventory Management Models with Variable Holding Cost and Salvage Value, IOSR J. of Busi. and Mgmt (IOSR-JBM), 12(3), 37-42 (2013a)
  10. Mohan R. and Venkateswarlu R., Inventory Models for Time Dependent Deterioration Time Dependent Quadratic Demand and Salvage Value, J of In. Math.Socy, (In press) (2013b)
  11. Mohan R. and Venkateswarlu R., Inventory Management Model with Quadratic Demand, Variable Holding Cost with Salvage value, Res J of Management Sci., 2(2), (2013)
  12. Uttam Kumar KHEDLEKAR et.al., Logarithmic Inventory Model with Shortage for Deteriorating Items, Yugoslav Jour of Ops Res, 23(1), (2013)
  13. Babu Krishnaraj R. and Ramasamy K., An Inventory Model with Stock Dependent Demand, Weibull Distribution Deterioration, Int Jor of Engg Res and Tech (IJERT), 2(4), (2013)
  14. Vinod kumar et.al., An Inventory model for deteriorating items with time-dependent demand and time –varying holding cost under partial backlogging, Jour of Indus Engg Int., 9(4), (2013)
  15. Vikas Sharma and Rekha Rani Chaudhary, An Inventory model for deteriorating items with Weibull Distribution Time Dependent Demand and Shssortages, Res Joul of Management Sci., 2(3), 28-30 (2013)