Loading

Inventory Control Model with Time-Linked Holding Cost, Salvage Value and Probabilistic Deterioration following Various Distributions
Pavan Kumar1, P.S.Keerthika2

1Pavan Kumar*, Assistant Professor, Mathematics Department, Koneru Lakshmaiah Education Foundation, Vijayawada (Andhra Pradesh), India.
2P. S. Keerthika, Research Scholar, Mathematics Department, Koneru Lakshmaiah Education Foundation, Vijayawada (Andhra Pradesh) India.

Manuscript received on November 16, 2019. | Revised Manuscript received on 27 November, 2019. | Manuscript published on December 10, 2019. | PP: 4399-4404 | Volume-9 Issue-2, December 2019. | Retrieval Number: B6441129219/2019©BEIESP | DOI: 10.35940/ijitee.B6441.129219
Open Access | Ethics and Policies | Cite | Mendeley | Indexing and Abstracting
© The Authors. Blue Eyes Intelligence Engineering and Sciences Publication (BEIESP). This is an open access article under the CC-BY-NC-ND license (http://creativecommons.org/licenses/by-nc-nd/4.0/)

Abstract: This paper proposes a study on inventory model for time linked holding cost and salvage value with probabilistic deterioration following various distributions. Shortage is assumed to be partially backlogged. Demand rate is time linked. Deterioration is a continuous random variable following some probabilistic distributions. We consider the uniform and triangular distributions. An expression for average total cost is derived as an Economic Order Quantity problem. Using the probabilistic distribution, the average total cost function is divided into two models – Model−I, and Model−II. To explain the solution procedure, two numerical examples are provided for both models. The convex property for the concerned average total cost functions is justified with the help of graphs in three dimensions. The optimal results are compared graphically for both the models. 
Keywords: Inventory Model, Partial Backlogging, Probabilistic Deterioration, salvage value.
Scope of the Article: Probabilistic Models and Methods