- Open Access
- Total Downloads : 435
- Authors : Anchal Agarwal, S. R. Singh
- Paper ID : IJERTV2IS70424
- Volume & Issue : Volume 02, Issue 07 (July 2013)
- Published (First Online): 18-07-2013
- ISSN (Online) : 2278-0181
- Publisher Name : IJERT
- License: This work is licensed under a Creative Commons Attribution 4.0 International License
An EOQ Inventory Model For Two Parameter Weibull Deterioration With Time Dependent Demand And Shortages
An EOQ Inventory Model For Two Parameter Weibull Deterioration With Time Dependent Demand And Shortages
Anchal Agarwal1 And S. R. Singp
1 Research Scholar, Banasthali Vidyapith Rajasthan India
2 Associate Professor,Department Of Mathematics, D.N. College Meerut
Abstract
In this paper, we developed an inventory model with time dependent demand rate and Weibull deterioration. The demand rate is a linear function of time. Deterioration rate is taken as two parameter Weibull distribution deterioration. In this study, shortage are allowed and completely backlogged. The objective of this model is to maximize the total profit. The numerical example of the model is provided to illustrate the problem.
Key Words: Inventory system, Deterioration, Weibull Distribution of two parameters, Time Dependent Demand, Shortages.
Introduction
Deterioration has a significant role in many inventory systems. Deterioration is defined as damage, declension, worsening, corrosion and loss of the utility of the product. However certain types of commodities either deteriorate or become obsolete in the course of time and hence are unstable. For example, the commonly used goods like fruits, vegetables, meat, foodstuffs, gasoline, radioactive substances, electronic components etc. where deterioration is usually observed during the normal storage period. The loss due to deterioration can not be ignored.
Covert and Phillip [1] developed an inventory model for items with Weibull distribution deterioration. An inventory model with inventory-level-dependent demand rate, shortages and decrease in demand was developed by Jain and Kumar [6]. RoyChaudhuri [8] proposes a production-inventory model under stock-dependent demand, Weibull distribution deterioration and shortage. Tripathy and Pradhan [4] developed an integrated Partial Backlogging Inventory Model having weibull Demand and Variable Deterioration rate with the effect of Trade credit. Chu and Chen
-
considered an inventory model for deteriorating items and time-varying demand. Wee [2] developed a deterministic inventory model for deteriorating with shortages and a declining market. Goyal and Giri [7] developed recent trends in modelling of deteriorating inventory. Hung [10] proposes an inventory model with generalized type demand deterioration and backorder rates.
In this model demand is taken as time dependent & deterioration is taken as weibull distribution with two parameter. Shortage are allowed & completely lost in this paper. A numerical example is also shown in this paper.
Assumptions and Notations
The proposed mathematical model of inventory replenishment policy is developed under the following notations and assumptions:
Assumptions:
-
Lead time is zero
-
The inventory system involves only one time.
-
The demand rate is time dependent.
-
Shortage are allowed & completely lost.
-
The length of the cycle is T.
(t) t( 1)
is the weibull two parameter deterioration rate, where
0 < <1 and >0 .are called scale and shape parameter respectively.
Notations:
-
A: Setup cost
-
C1 : Shortage cost / Unit/ Unit time
-
C2 : Deterioration cost / Unit/ Unit time
-
h : Holding cost/Unit/Unit time
-
T: Duration of a cycle
-
t1 : The time at which the inventory level becomes zero.
-
S: Selling Price
-
: Scale parameter
-
: Shape parameter
-
: Deterioration rate
-
D(t): a+bt, where a>b
-
Mathematical Formulation of the model:
The length of the cycle is T. At the time t1
the inventory level becomes zero and
shortages occurring in the period
(t1,T )
which is completely backlogged. Let I (t) be
the inventory level at time t ( 0 t t1 ). The differential equations for the instatantaneous state over (0, T) are given by
dI (t) t( 1) I (t) (a bt), 0 t t
… (1)
dt
dI (t) (a bt),t
1
t T . (2)
dt 1
With the boundary condition
I (t1 ) 0
at t t1 .
Solving equation (1) & (2) we get
I (t) (1t )[a(t t) b (t 2 t2 )
a (t ( 1) t( 1) )
b (t ( 2) t( 2) )], 0 t t
1 2 1
1 1
2 1 1
I (t) [a(t t) b (t 2 t 2 )],t
. (3)
t T .. (4)
1 2 1 1
The total holding cost during the time period 0 to t1
1
1
t
HC= h I (t)dt
0
HC= h
t1 (1t )[a(t
t) b (t 2 t2 )
a (t ( 1) t( 1) )
b (t ( 2) t( 2) )]dt
0
at 2
bt 3
1 2 1
a
( 2)
1
1
b
( 3)
2 1
a
(2 2)
HC= h[ 1 1 t1 t1 t1
2 3 ( 1)( 2) ( 1)( 3) 2( 1)2
b t (2 3) ] (5)
( 1)(2 3) 1
The total Shortage cost during the time period t1 to T is given by
T
1
1
SC= c1 t I (t)dt
SC= c
T
[a(tt) b (t 2 t2 )]dt
1 t 1 2 1
1
1
SC= [c1a t T 2 c1b (2t3 T 3 3Tt2 )] . (6)
2 1 6 1 1
The total Deterioration cost during the time period 0 to t1 is given by
t
DC= c 1 (t).I (t)dt
2 0
DC=
c t1 t( 1) (1t )[a(t
t) b (t 2 t2 )
a (t ( 1) t( 1) )
b (t ( 2) t( 2) )]dt
2 0
at
1
1
3a
2 1
2 1
1 1
b 2 b
2
2 2
1
a 2 3 1
DC= 1 t1
t1
t1
t1
t1
1 2 (2
b 2 3 2
1) (
2) (2
2)
2 (3
1)
-
t
2 (3 2) 1
(7)
T
Sales Revenue = s(a+bt)dt s(aT b
0
T 2
) . (8)
2
From equation (5), (6), (7) & (8) the total profit per unit time is
1 T 2 1
P(T ,t1 ) T [s.(aT b
)] [ A HC SC DC]
1
1
1
1
t
t
2 T
P(T ,t1 ) s(a b
T )
1 [ A h{
at 2
-
bt 3
a
( 2)
t
t
1
b
( 3) 1
2 T 2 3 ( 1)( 2) ( 1)( 3)
a t (2 2) b t (2 3)}{c1a t
T 2 c1b (2t3 T 3 3Tt2 )}
2( 1)2 1
( 1)(2 3) 1
2 1 6 1 1
-
at1
-
1 3a
2 1 b
2 b
2 2
a 2
3 1
{ 1t1
2 (2 1) t1
( 2) t1
(2 2) t1
2 (3 1) t1
3 2
3 2
b 2
2 (3 2) t1 }]… (9)
Our objective is to maximize the total profit. The necessary condition for maximize the profit are
p(T ,t1 ) 0 And
T
p(T , t1 ) 0 then
t1
ac (T t ) 1 bc (3T 2 3t2)
at2
bt2 3at1 2 bt2 2
bs
1 1 6 1 1
1 ( A 1
1 1 1
2 T T 2
1 (2 ) 2 (1 2 )
(2 2 )
a 2t1 3 b 2t2 3 1 1
at2 bt3 at2
1 1
ac (T t )2
bc (T 3 3Tt2 2t3) h( 1 1 1
2 (1 3 ) 2 (2 3 ) 2 1 1
6 1 1 1
2 3 (1 )(2 )
bt3
at2 2
bt3 2
1 1 1 )) 0
(1 )(3 ) 2(1 )2 (1 )(3 2 )
And
(10)
1 3 at2
2at3
bt1
a(2 )t1
bt1 2
b 2t1 3 1
( 1 1 1 1 1 1 ac (T t ) bc
T 2
2
(1 )
2 1 1 6 1
at1
a (2 2 )t1 2
bt2 2
(6Tt 6t2 ) h(at bt2 1 1 1 )) 0
1 1 1 1
Provided
1
2(1 )2
1
. (11)
2 P
2 P
2 P
2 P
2 P
( ) 0,( ) 0 And ( ).( ) ( ) 0
T 2
t2
T 2
t2
T t
1 1 1
1
1
1
1
Using the software mathematica-5.2, we can find the optimal values of T and t by equation no. (10) & (11) simultaneously and also find the optimal value of P(T , t ) by equation no. (9).
Numerical Example & Sensitivity Analysis
We consider
[A, a,b, s, c1, c2 , h,, ] = [200, 100, 76, 2, 1.3, 1.1, 1.0, 0.1, 0.3] inproper units, where
respectively.
h, c1 & c2
are holding cost, shortage cost and deterioration cost
1
1
1
1
The optimal value of T = 2.21261, t = 0.550549 & P(T ,t ) = 93.3771
1
1
This is the concavity of the total cost w.r. to T and t . The variation in the parameter is as follows
Table- (1) Variation in parameter a
a |
t 1 |
T |
P(T ,t1 ) |
100 |
0.550549 |
2.21 |
93.3771 |
120 |
0.526357 |
2.08115 |
113.514 |
140 |
0.503424 |
1.96326 |
134.837 |
160 |
0.482039 |
1.85775 |
157.217 |
Table- (2) Variation in parameter b
b |
t 1 |
T |
P(T ,t1 ) |
76 |
0.550549 |
2.21261 |
93.3771 |
78 |
0.549563 |
2.21476 |
95.6483 |
80 |
0.548588 |
2.21685 |
97.9206 |
82 |
0.547624 |
2.2189 |
100.194 |
Table- (3) Variation in scale parameter
t 1 |
T |
P(T ,t1 ) |
|
0.1 |
0.550549 |
2.21261 |
93.3771 |
0.2 |
0.504696 |
2.19272 |
88.9163 |
0.3 |
0.462959 |
2.17396 |
85.1296 |
0.4 |
0.425271 |
2.15656 |
81.916 |
Table- (4) Variation in shape parameter
t 1 |
T |
P(T ,t1 ) |
|
0.3 |
0.550549 |
2.21261 |
93.3771 |
0.4 |
0.639018 |
2.25639 |
101.374 |
0.5 |
0.701465 |
2.28739 |
107.353 |
0.6 |
0.747829 |
2.3102 |
112.02 |
Table- (5) Variation in selling price s
s |
t 1 |
T |
P(T ,t1 ) |
2 |
0.550549 |
2.21261 |
93.3771 |
2.5 |
0.634548 |
2.52823 |
188.313 |
3.0 |
0.738288 |
2.90943 |
289.867 |
3.5 |
0.862504 |
3.35414 |
399.276 |
Observations:
-
From the table (1), we observed that total profit increases if we increase the parameter a.
-
From the table (2), we observed that total profit increases if we increase the parameter b.
-
From the table (3), we observed that total profit decrease if we increase the scale parameter .
-
From the table (4), we observed that total profit increases if we increase the shape parameter .
-
From the table (5), we observed that total profit increases if we increase the selling price s.
Concluding Remarks
In this paper, we developed an inventory model for deteriorating items with time dependent demand and shortages. The rate of deterioration follows the Weibull distribution with two parameters. The demand rate is assumed of time dependent. The shortages are allowed and shortages are completely backlogged. The shortage cost, holding cost and, deterioration cost are considered in this model. A numerical example and sensitivity analysis are presented to illustrate the proposed model.
-
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-
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