inventory model (q, r) with period of grace, quadratic backorder cost and continuous lead time

American Journal of Engineering Research (AJER) 2015

American Journal of Engineering Research (AJER)

e-ISSN: 2320-0847 p-ISSN : 2320-0936

Volume-4, Issue-5, pp-81-93

www.ajer.org Research Paper Open Access

w w w . a j e r . o r g

Page 81

Inventory Model (Q, R) With Period of Grace, Quadratic

Backorder Cost and Continuous Lead Time

Dr. Martin Osawaru Omorodion Joseph Ayo Babalola University, Ikeji-Arakeji, Nigeria.

ABSTRACT: The paper considers the simple economic order model where the period of grace is operating, the

lead time is continuous and the backorder cost is quadratic. The lead time follows a gamma distribution. The

expected backorder cost per cycle is derived and averaged over all the states of the lead time L. Next we obtain

the expected on hand inventory. The Lead time is taken as a Normal variate. The expected backorder costs are,

derived after which the expected on hand inventory is derived. The cost inventory costs for constant lead times is

then averaged over the states of the lead times which is taken as a normal distribution.

KEY WORDS: Continuous Lead Times, Gamma Distribution, Normal Distribution, Period of Grace, Bessel

Functions, Inventory on hand, Expected Backorder Costs and Chi-Squared Distribution.

Demand

The cost of a backorder )(tC for backorder of length t = )( pzLC =

2

321 )()( pzLbpzLbb where p is the grace period, where the system is out of stock in the

time interval z to z tdz. After the re-order point is reached the R+Y was demanded in the time z and a demand

occurred in time dz. The longer the period of grace the greater the reduction in inventory costs.

SIMPLE INVENTORY MODEL WITH PERIOD OF GRACE, QUADRATIC BACKORDER COST

AND CONTINUOUS LEAD TIME

I. INTRODUCTION

In this inventory model there is a period of grace before backorder costs are incurred. In Hadley (1972),

the general model was stated. This paper derives the backorder costs when the backorder cost is a quadratic cost

depending upon the length of time of backorder after the grace period. The various costs such as expected

backorder costs and expected on hand inventory are derived, to arrive at the total costs of holding inventory.

Demand over the lead time is normally distributed and lead time is a gamma variate.

II. LITERATURE REVIEW Saidey (2001), in his paper Inventory Model with composed shortage considered grace period (perishable delay

in payment) before setting the account with the supplier or producer.

Schemes (2012) also considered credit terms which may include an interest free grace period as much as 30

days in his paper ‘Inventory models with shelf Age an Delay Dependent Inventory costs’.

Hadley and Whitin gave a simple general model for period of grace.

Zipkin (2006), treats both fixed and random lead times and examines both stationary and limiting distributions

under different assumptions.

III. DERIVATION Let the period of grace be p, where the period of grade is the period for which a backorder bears no cost. Let

H(L) be the probability density function of the lead time L.



Page 82

)(tC is the cost of a backorder of length t.

H(L) = )(

)(1

k

LespLkk

> 0…………….. (1)

In the analysis k would take on integer values only.

The p.d.f. of demand over the lead time L.

g

L

L

DLxesp

L

DLx

2

2

2

2

2

1

2

x ………………… (2)

Let R + Y, 0 <Y<Q be the inventory position at time O, then if the system is out of stock in the time internal z to

z + dz after the re-order point is reached then R +Y was demanded in the time Z and a demand occurred in time

dz.

Length of time of backorder = L-z length of time of backorder which bears a cost

= L – z – p.

Cost of a backorder = C (L – z – p)

Where the C (t) is the cost of a backorder = b1 + b2 (L – z – p) + b3 (L – z – p)2. (3)

Expected backorder cost per cycle G1 (Q, R).

= D dzdydLL

DzYRgLH

L

pzLCPLQ

).().(.)(

20 200

…………….. (4)

Let v = z + p

G1 (Q,R) = D dvdYdL

L

DvDpYRgLH

L

vLCLQ

)()()(

0 2200

……………...(5)

Making use of equation (2)

G1(Q,R) = D dvdYdLL

DvDpYRespLH

L

vLCLQ

)(2

1)(.

2

)(

20 200

…. (6)

Substituting for C (L-v) from 3

G1(Q,R) = LQ

D000

(b1+b2(L – v) + b3 (L – v)2 + H(L) ………………..(7)

esp -1/2

L

DVDPYR

2

)(

dvdYdL

Noting that

D dvL

DvDpYResp

L

vLbvLbb

s

L2

2

2

321

0)(2/1

)()((

……………. (8)



Page 83

=

L

DLDpYRF

L

DLDpYR

D

bL

L

DLDpYR

D

Lb

D

Lbb

22

2

2

2

22

2

3

2

2

31 )((

L

DLDpYRg

L

DLDpYR

D

Lb

D

Lb

222

2

32

2

………………... (9)

Substituting into G1(Q,R) of (7) and changing the range of Y

=

dxdLL

DLxF

L

DLx

D

Lb

L

DLx

D

Lb

D

LbbLH

DpQR

DpR 22

222

22

2

3

2

2

31

0)(

= dxdLL

DLxg

L

DLx

D

LbLbLH

DpQR

DpR

222

2

32

2

0)(

………. (10)

Let G1(Q,R) =

DpQR

DpRdxxG )(2 ……………………………………………… (11)

Hence from equation (10)

G2 (x) = dLL

DLxFDLx

D

b

L

DLx

D

Lb

D

LbbLH

2

2

22

2

32

2

31

0)(

- dLL

DLxFDLx

D

b

2

2

dLL

DLxg

L

DLx

D

Lb

D

LbLH

222

2

3

2/1

0

0)(

………………. (12)

Substituting for H (L) from 1 and simplifying

G2 (x) = 2

12

3

2

2

3

1

01(

)( D

Lxb

D

LbLb

K

kkK

k

)2 2

1

2

2

1

33 k

kkK

LbD

xLb

D

Lb

D

xLb

esp ( L ) F dLL

DLx

2

0

2/1

32

2/1

3

2

2/1

D

Lbx

D

Lb

D

bL

k

kkkk esp ( L)g dL

L

DLx

2……. (13)

Re-arranging terms



Page 84

G2 (x) =

D

xb

D

xbbL

k

kk

2

2

2

3

1

1

)(22

1

3

2

3

2

2

3 LespD

Lbb

D

xb

D

bL

kk

2

32

2/1

2 D

xb

D

bL

kdL

L

DLxF

kk

dLL

DLxgLesp

D

Lb k

2

2/1

3 )(

……………………………….……….. (14)

Integrating

dLL

DLxg

kL

LLespdL

L

DLxgLH

L

kk

20 2

1

20 2 .

)()(

1

=

2

22

2

2

20

2/3

2

2

22

DL

L

xesp

DxespL

k

kk

=

2/122

22/1

)2/1(2/1

22

22

22

22

Dx

KD

x

k

Dx

espk

Kk

If k is an integer then

jk

j

k zjkj

jkzkzK

)2(

)!1(!

1)()(

1

0

2/12/1

Where )()(2

)( 2/1

2/1 zespzzK

Hence )()2()!1(!

)1()( 2/1

1

0

2/1 Zespzjkj

jkzK j

k

j

k

And Letting

2 = 2 2

+D2

G2 (x) = esp

D

xb

D

xbb

k

Dx k2

2

2

3

122)(

2

2/12/1

12

2)!(

)1(

x

zkZk

k

z

Kx

Dzk

k

2

2

2/1

2/12

xK

xx

zk

zk



Page 85

1

1

2/3

2

3

2

2

3 2)!1(

!2 k

z

zk

z

xD

zk

kb

D

xb

D

b

2

2/1

2/1

2/3

2

xK

xx

xK

Zk

zk

Zk

22/11

2/11

22/21

2/212

12

3 22)!2(

)!1(

xK

xx

xK

xD

zk

k

D

b

zk

zk

zk

zkk

zz

22/11

2/113

22/1

2/1

2

322 2

22)(

xK

x

D

bxK

x

D

xb

D

b

k

Dxesp

k

k

k

k

k

Re-arranging terms

k

z

zk

k

xD

zk

k

k

b

Dxesp

xG1

2/1

2

12

2 2)!(

)!1(

)(2)(

2

2/1

2/1

22/1

2

xK

xx

xK

zk

zk

zk

xK

xD

zk

k

D

b

k

Dxesp

zk

zkk

zz

k

2/1

2/11

1

22

.2)!(

)!1(

)(22

22/1

2/112

xK

x

zk

zk

22/1

2/1121

1

2()!1(

!

xK

xD

zk

k

zk

zk

z

k

z

22/1

2/112

xK

xD

zk

zk

22/11

2/11222

xK

x

k

k

22/1

2/21

222/120

2/21232 22

)!(

)!1(

)(22

xK

x

D

xK

x

Dzk

k

k

bDx

esp

zk

zk

k

k

z

zk

z

k



Page 86

22/112

2/11211

1

2

)!1(

!

xK

x

Dzk

kk

zkk

zz

22/1

2/11

2

22

xK

x

D Zk

zk

1

12

2/1

2/21

2

4

)!1(

!k

z zk

zk

z

xK

x

Dzk

k

22/1

2/2124

xK

x

D zk

zk

22/11

2/21

222/21

2/212

1

22

)!2(

)!1(

xK

x

D

xK

x

Dzk

k

zk

zk

zk

zkk

zz

22/11

2/11

222/1

2/11

2

2

22)(

2

xK

x

D

xK

x

Dk

Dxesp

k

k

k

k

k

(16)

From equation 11

DpQR

DpRdxxGRQG )()( 211

Where G1(Q,R) is the expected backorder cost per cycle

Expanding

DpQR

DpQR

DpRdxxGdxxGRQG )()(),( 221 …………………..…….……….(17)

Integrating G2(x) with respect to x from z to and applying

dL

L

DLxgLH

2)(

= dLk

LespL

L

DLxesp

L

kk

)(

)(2/1

2

112

20 2

………………… (18)

dxxGQ

)(2

and letting

2

D

=

zk

j

k

zz

k

jzkj

jzkD

zk

k

k

b

01

1

)!(

)!(2

)!(

)1(

)(4

2



Page 87

)!()(

1

)1(2

2.

21

2

2jzk

jzk

Qzk

j

1(2

22

)(

1

)!1(

)!1( 2

21

1

0 jzk

Q

jzkj

jzk j

zk

zk

j

zk

jz

k

z

k

jzkj

jzkD

zk

k

kD

b

01

2

)!(

)!(

)!(

)!1(

)(4

2

)1(2

221 2

22 jzk

Qj

zk

)1(2

22

)(

)!(

)!1(!

)!1( 2

22

1

0 jzk

Qjzk

jzkj

jzk j

zk

zk

j

jzk

jzk

k

zz

jzk

jzkj

jzkD

zk

k2

1

02

21

1

2

)(

)!1(

)!1(!

)!1(

)!1(

!

20

2

)(

)!1(

)!(!

)!(2

2(2

2

zk

zk

j

jzk

jzkj

jzkD

jzk

Q

)2(2

22 2

2 jzk

Qj

)1(2

22

)(

)!(

)!(!

)!(2

2

210

2

jk

Qjk

jkj

jk j

k

k

j

k

z

zk

jz

k

jzkj

jzk

Dzk

k

k

b

0 0

23

)!(!

)!(2

)!(

)!1(

)(2

)3(2

22

)(

)!2( 2

23 jzk

Qjzk j

zk

)3(2

22

)(

)!2(

)!1(!

)1(2 2

23

1

02

3

jzk

Qjzk

jzkj

jzk

D

j

zk

zk

j

1

1

1

02

22

2

21)!1(

)!1(!

)!1(2

)!1(

!k

z

jzk

j

zk

jzkjzkj

jzk

Dzk

k

)2(2

22

jzk

Q



8

20

2

2

)(

1)!1(

)!(!

)!(2

zk

zk

j

jzkjzkj

jzk

D

1

1

2

02

2 4

)!1(

!

)2(2

2 k

z

zk

jz Dzk

k

jzk

Q

j

zk

jzk

jzkj

jzk

23

2

)(

1)!2(

)!2(!

)!2(

1

0

22

)!1(!

)!1(4

)3(2

2 zk

j jzkj

jzk

Djzk

Q

)3(2

221)!2(

2

2

3

jzk

Qjzk

jzk

)!2()!2(!

)!2(2

)!2(

)!1( 2

0

2

1

jzkjzkj

jzk

Dzk

k zk

j

k

zz

)3(2

221 2

2

3

jzk

Qj

zk

j

zkzk

j jzkj

jzk

D

2

31

02

21

)!1(!

)!2(2

)3(2

22

jzk

Q

)2(2

22

)(

)!1(

)!1(!

)!1(2 2

22

1

0

2

jk

Qjk

jkj

jk

D

j

k

k

j

)2(2

22

)(

)!1(

)!(!

)!(2 2

220

2

jk

Qjk

jkj

jk

D

j

k

k

j

……………………(19)

Let G3 (z) equal the b1 factor of (19) ………………………………………….(20)

Let G4 (z) equal the b2 factor of (19) …………………………………………..(21)

Let G5 (z) equal the b3 factor of (19) …………………………………………..(22)

Hence from (17)

The expected backorder cost per cycle

= b1 (G3(R + Dp) – G3 (R + Q+ Dp) + b2 (G4 (R + Dp)

- G4 (R +Q +Dp) + b3 (G5 (R + Dp) – G5 (R + Q +Dp)) ………………..…(23)

Hence the expected cost per year

=

)(())(

)(()()(

55

3

4

4

2

33

1

DpQRGDpRGQ

bDpQRG

DpRGQ

bDpQRGDpRG

Q

b

………………… (24)

Next we obtain the expected on hand inventory at any time.



Page 89

Let (D, R) be the expected on hand inventory at any time

Let G6 (x) be the probability density function of the quantity on hand x at anytime t. x control be less or above

the re-order level R. 0<x<R

R QR

RdxxxGdxxxGRQD

066 )()(),(

If x lies above R

Where dxL

DLxvesp

QxG

QR

R

2

26 2/1

1)(

If x lies above R

dvt

DLxvesp

QxG

RR

206

2

11)(

Given that the system was in state v and v-x was demanded.

Which gives, expressing in k standard deviations of stock

RxL

xQkF

L

xkF

QxG

0

)((

1)(

221

QRxRL

xQkF

QxG

21

)(1

1)(

Hence D(Q, R)=

R

dxL

DLxQRxF

L

DLxRxF

Q 0 22

1

dxL

DLxQRxFx

Q

QR

R

2

1

Simplifying

dxL

DLxQRxF

Qdx

L

DLxRxF

QRQD

QRR

0 20 2

11),(

QR

Rxdx

Q

1

Let V=

L

DLxR

2

and

L

DLxQR

2

In each integral

Then dVVFDLRVLQ

LRQD L

DL

L

DLRR

)())( 2

2

22

1

L

DL

L

DLQRQ

RQRdVDLQRLV

Q

L2

22

)()(

222

2



Page 90

Remembering that

L

DLRk

2

Then expressing R in terms of standard deviations of stock

L

DL

L

QkL

DL

k Q

LdVVFkV

Q

LKQD 2

2

2)(

)()(),(22

LKQ

dVVFL

QkV 2

2 2)()((

Simplifying

L

DL

kL

DL

kdVVkF

Q

LdVVVF

Q

LKQD 22 )(

)()(),(

22

L

DL

L

QkL

DL

L

QkdVVF

L

Qk

Q

LdvVvF

Q

L2

2

2

2

)()()(

)(2

22

LkQ 2

2

Hence D(Q, k), noting that F 12

L

DL

and

k

kgkkFdvvF )()()(

and

kkkgkFkdvvvF )()()1(2/1)( 2

Hence D(Q, k)

)()()1(

2)()(( 2

2

222

2

kkgkFkQ

L

L

DLg

L

DLF

L

DLkgkFk

Q

L

L

QKF

L

Qk

Q

L

L

DLg

L

DLF

L

DL

22

2

22

2

21

LkQ

L

DLg

L

DLF

L

DL

L

Qkg

L

Qk 2

22

2

222 21

2

Which gives

)()()1(22

),( 22

2 kkgkkLQ

LkkQD

L

QkF

L

QkL

22

22 )(1

2



Page 91

L

Qkg

L

Qk

22 …………………………………………………….(25)

Remembering that k =

L

DLR

2then

Substituting for k then

2

2

2

122

),,(L

DLRLDLR

QLRQD

2

2

2

2221

2

L

DLQRL

L

DLRg

L

DLR

L

DLRF

L

DLQRg

L

DLQR

L

DLQRF

222

But

L

DLRg

L

DLR

L

DLRF

L

DLRL

222

2

2

2

12

………………..…(26)

dVL

DLVFDLV

L

DLVgL

R

22

2 )(

…………………………….…(27)

Hence

L

DLVgLDLR

QLRQD

QR

R 2

2

2),,(

dVL

DLVFDLV

2)(

Where D(Q,R,L) is the inventory on hand for a given lead time L.

Hence expected on hand inventory

=

0),,()( DLLRQDLH ……………………………………………………..….(28)

0 0

2

0)(

1)()(

2

QR

RLLH

QdLLHLDDLLHR

Q

dVdL

L

DLVFDLV

L

DLVg

22)(

……………………………………(29)

Noting that



Page 92

0 22

2 )()( dVdLL

DLVFDLV

L

DLVgLLH

QR

Ris the coefficient of b2 in (iv)

Then integrating (29)

We have

)()(1

2),( 44 QRGRG

Q

DkR

QRQD

Cost of ordering =

Q

DS

Inventory costs for mode (Q1R)

)()((

1)( 44

4

1

1 QRGRGQ

DpRGQ

bRQhcD

Q

DSC

Cost of ordering = Q

DS……………………………………………………………(30)

Inventory costs for mode (Q1R)

DpQRGDpRGQ

bRQhcD

Q

DSC ())( 33

1

1

DpQRGDpRGQ

b()( 44

2 )()((553 DpQRGDpRGb …….(31)

Substituting for D(Q1R) from (30)

DpQRGDpRGbDk

RhcQhc

Q

DSC ())(

2331

))()(()()( 55344

2 DpQRGDpRGbDpQRGDpRGQ

b

)()(( 44 QRGRGQ

hc ……………………………………….…….(34)

The corresponding cost when no period of grace p is operating is

QRGRGbDk

RhcQhc

Q

DSC ())(

2331

)()(()()( 55

3

44

2 QRGRGQ

bQRGRG

Q

bhc

IV. IMPACT OF THE STUDY The study will enable industries or organizations having thousands of items in their warehouses located

in various locations of the world and items supplied by different manufacturers with accurately use realistic lead

times in arriving at their inventory cost.

In many of such cases lead times are not constant.

Expressing lead time as continuous gives a more realistic estimate of inventory costs.



Page 93

REFERENCES [1]. Hadley and Whitin, (1972), Analysis of Inventory System, John Wiley and Sms, Inc.

[2]. Saidey Hesam, (2011), “Inventory model with composed shortage and permissible delay in payments linked to order quantity, Journal of Industrial Engineering International, (15), Ed 1 – 7 Fall 2011.

[3]. Schemes. F., (2012), ‘Inventory model with Shelf Age and Delay Dependent Inventory Costs, Academic Commons. Columbia. Edu.

[4]. Zipkin P., (2006), ‘Stochastic lead times in continuous – time inventory models’ Naval Research Logistics, 21 Nov. 2006.

inventory model (q, r) with period of grace, quadratic backorder cost and continuous lead time

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