This manuscript deals in developing an EOQ model for time deteriorating items and allowing shortages in
the inventory. These shortages are considered to be completely backlogged. We have held that the
production rate is finite and infinite. In this manuscript, we developed EOQ models for perishable products
which consider continuous deterioration of a utility product and introduce an exponential penalty cost and
linear penalty cost function. The theoretical expressions are obtained for optimum cycle time and optimum
order quantity. The significant centre of our paper is to build up the EOQ model for time-deteriorating
items utilizing penalty cost with finite and infinite production rate. The mathematical solution of the model
has been done to obtain the optimal solution of the problem. The result is demonstrated with the help of
mathematical example. To conclude, sensitivity study is carried out with respect to the key parameters and
some managerial implications are also included. All the theoretical developments are numerically
justified.
%0 Journal Article
%1 noauthororeditor
%A Vijayashree, M.
%D 2015
%J Operations Research and Applications : An International Journal (ORAJ)
%K Inventory
%N 4
%P 20
%R 10.5121/oraj.2015.2403
%T AN EOQ MODEL FOR TIME DETERIORATING ITEMS WITH INFINITE & FINITE PRODUCTION RATE WITH SHORTAGE AND COMPLETE BACKLOGGING
%U http://airccse.com/oraj/papers/2415oraj03.pdf
%V 2
%X This manuscript deals in developing an EOQ model for time deteriorating items and allowing shortages in
the inventory. These shortages are considered to be completely backlogged. We have held that the
production rate is finite and infinite. In this manuscript, we developed EOQ models for perishable products
which consider continuous deterioration of a utility product and introduce an exponential penalty cost and
linear penalty cost function. The theoretical expressions are obtained for optimum cycle time and optimum
order quantity. The significant centre of our paper is to build up the EOQ model for time-deteriorating
items utilizing penalty cost with finite and infinite production rate. The mathematical solution of the model
has been done to obtain the optimal solution of the problem. The result is demonstrated with the help of
mathematical example. To conclude, sensitivity study is carried out with respect to the key parameters and
some managerial implications are also included. All the theoretical developments are numerically
justified.
@article{noauthororeditor,
abstract = {This manuscript deals in developing an EOQ model for time deteriorating items and allowing shortages in
the inventory. These shortages are considered to be completely backlogged. We have held that the
production rate is finite and infinite. In this manuscript, we developed EOQ models for perishable products
which consider continuous deterioration of a utility product and introduce an exponential penalty cost and
linear penalty cost function. The theoretical expressions are obtained for optimum cycle time and optimum
order quantity. The significant centre of our paper is to build up the EOQ model for time-deteriorating
items utilizing penalty cost with finite and infinite production rate. The mathematical solution of the model
has been done to obtain the optimal solution of the problem. The result is demonstrated with the help of
mathematical example. To conclude, sensitivity study is carried out with respect to the key parameters and
some managerial implications are also included. All the theoretical developments are numerically
justified.
},
added-at = {2017-12-06T10:22:44.000+0100},
author = {Vijayashree, M.},
biburl = {https://www.bibsonomy.org/bibtex/287a3282737f5dccb47d27f8b47bbe31e/oraj},
doi = {10.5121/oraj.2015.2403},
interhash = {7f40838a8699f097af0bf09d1d99d78f},
intrahash = {87a3282737f5dccb47d27f8b47bbe31e},
journal = {Operations Research and Applications : An International Journal (ORAJ)},
keywords = {Inventory},
month = {November},
number = 4,
pages = 20,
timestamp = {2017-12-06T10:22:44.000+0100},
title = {AN EOQ MODEL FOR TIME DETERIORATING ITEMS WITH INFINITE & FINITE PRODUCTION RATE WITH SHORTAGE AND COMPLETE BACKLOGGING},
url = {http://airccse.com/oraj/papers/2415oraj03.pdf},
volume = 2,
year = 2015
}