OPTIMAL ORDER LOT SIZING AND PRICING
WITH CARBON TRADE
Guowei Hua
Department of Logistics Management, School of Economics and Management, Beijing Jiaotong University
100044, Beijing, P.R. China
Han Qiao
School of Economics, Qingdao University, 266071, Qingdao, P.R. China
Academy of Mathematics and Systems Science, Chinese Academy of Sciences, 100190, Beijing, P.R. China
Jian Li
School of Economics and Management, Beijing University of Chemical Technology
100029, Beijing, P.R. China
Keywords: Carbon trade, EOQ model, Pricing, Carbon footprints.
Abstract: Carbon emission trading is one of the broadly adopted methods to curb the amount of carbon emission. This
paper examines the optimal decisions of retailers under cap-and-trade. We derive the optimal order lot size
and retail price under cap-and-trade when the demand is an additive function or multiplicative function of
retail price, and analyze the impacts of carbon trade on the order decision, pricing decision, carbon emission
and profit.
1 INTRODUCTION
In order to alleviate global warming, many
measurements such as economics, legislation were
taken to curb the total amount of carbon emissions.
Carbon emission trading is generally accepted as one
of the most effective market-based mechanisms,
which has been broadly adopted by UN, EU, and
many governments. For example, the Kyoto
Protocol (UNFCCC, 1997) and the European Union
Emission Trading System (EU-ETS) implement a
mandatory “cap and trade” system in 183 countries
and the 27 EU member countries (EU, 2009),
respectively. More than 20 platforms for trading
carbon are running in the world.
Facing the cap-and-trade, firms can optimize
their strategic decisions such as supply chain design
or operations decisions in production, transportation,
and inventory to reduce carbon emissions. There are
few studies on the operations decisions under carbon
emission regulations. Cachon (2009) discusses how
the new objective of reducing carbon footprints is
likely to affect supply chain operations and
structures. Hua et al. (2010) examined the optimal
order quantity under carbon trade. Benjaafar et al.
(2010) introduce a series of simply 3models to
illustrate how carbon footprint considerations could
be incorporated into operations decisions. Bonney
and Jaber (2010) examined the importance of
inventory planning to the environment and the
possibility of using models to perform analyses.
However, all the researches mentioned-above are not
incorporated pricing into them.
Although there are plentiful studies of purchase
decisions incorporating pricing (Chen and Simchi-
Levi, 2010), they did not incorporate carbon
footprints into them. To fill the gap, in this paper, we
examine the optimal order lot sizing and pricing for
retailers under carbon trade.
The rest of this paper is organized as follows: In
Sections 2 we formulate EOQ model with pricing
under carbon trade, derive the optimal order quantity
and price. In Sections 3 and 4, we analytically and
533
Hua G., Qiao H. and Li J..
OPTIMAL ORDER LOT SIZING AND PRICING WITH CARBON TRADE.
DOI: 10.5220/0003597005330536
In Proceedings of the 13th International Conference on Enterprise Information Systems (DMLSC-2011), pages 533-536
ISBN: 978-989-8425-55-3
Copyright
c
2011 SCITEPRESS (Science and Technology Publications, Lda.)
numerically the impacts of carbon trading on order
decisions, pricing decision, carbon emissions, and
total cost. Finally we conclude the paper and suggest
topics for future research in Section 5.
2 THE MODEL
This section we will formulate the EOQ with pricing
under carbon trade, and derive the optimal order lot
sizing and pricing. Carbon trading is also known as
cap and trade. A firm is allocated a limit or cap on
carbon emissions. If its amount of carbon emissions
exceeds the carbon cap, it can buy the right to emit
extra carbon from the carbon trading market.
Otherwise, it can sell its surplus carbon credit. We
focus on the carbon emissions caused by logistics
and warehousing activities in this paper.
The notation used in the paper is as follows:
·
K= fixed ordering cost;
· T = the replenishment time interval;
· h= annual holding cost per unit, expressed as a
percentage of the average inventory value;
· p= the retail price (a decision variable);
· Q = order lot size in units (a decision variable);
· D(p) = annual demand or demand rate, which is
a function of the retail price p;
· w = wholesale price per unit;
· α = carbon emission quotas per unit time;
· C = carbon price per unit (ton);
· CE=the amount of carbon emission;
·e= the amount of carbon emissions in executing
an order;
·gQ = the amount of carbon emissions in holding
Q units product, where g is the variable
emission factor in warehouse;
· X = transfer quantity of carbon emissions (a
decision variable);
·
(,)Qp
π
= total profit per unit time;
Following Abad and Aggarwal (2005), we
suppose the demand function satisfies:
(i).
() 0Dp>
for
max
0 pp<≤
;
(ii).
()
D
p
decreases with increasing p,
i.e.,
'
() 0Dp<
;
(iii). the marginal revenue
'
(()) ()
() ()
dpDp Dp
p
dD p D p
=+
is a strictly increasing
function of p;
where
max
p
is a large number that the retail
price does not exceed.
Notice that
()
2
D
pQ
CE e g
Q
=+
, based on the
classical EOQ model, we can formulate our problem
as
()
max ( , ) ( ) ( )
2
()
.. .
2
Dp hQ
Qp p wDp K CX
Q
Dp Q
st e g X
Q
π
α
=− − − +
++=
Substituting
()
()
2
D
pQ
Xe g
Q
α
=− +
into the
objective function, we have
max ( , ) ( ) ( )
()()()
.
2
Qp p wDp
KCeDp hCgQ
C
Q
π
α
=
−
++
−−+
(1)
The first-order condition for maximization yields
the optimal retail price
*
()pQ
for a given Q. Let
'
(,)
() ( ) () 0
Qp K Ce
Dp p w D p
pQ
π
∂
+
=
+−− =
∂
.
Namely,
'
()
()
Dp K Ce
pw
Dp Q
+
+=+
(2)
Differentiating (2) with respect to Q, we have
*'2'
'2 2
()(2 )
.
dp Q D DD K Ce
dQ D Q
−+
=−
Based on the above analysis, we have the
following theorems.
Theorem 1. For any given Q, the first-order
condition (2) yields the unique maximum
*
()pQ
.
Proof. If
*
()ppQ>
, then
'
()
()
D
pKCe
pw
Dp Q
+
+>+
,
'
(,)
() ( ) () 0
Qp K Ce
Dp p w D p
pQ
π
∂
+
=
+−− >
∂
.
If
*
(),ppQ<
the
'
()
,
()
D
pKCe
pw
Dp Q
+
+<+
'
(,)
() ( ) () 0,
Qp K Ce
Dp p w D p
pQ
π
∂
+
=
+−− <
∂
which indicate that
*
()
p
pQ=
is the unique
maximum of
(,)Qp
π
for a given Q. □
Next, we will derive the optimal order lot size
and price.
ICEIS 2011 - 13th International Conference on Enterprise Information Systems
534
Substituting
*
()
p
pQ=
into
(,)Qp
π
, we have
2*
*
'*
(())( )
(, ())
(()) 2
DpQ hCgQ
Qp Q C
DpQ
π
α
+
=− − +
(3)
Since
*'2'
'2 2
()(2 )
,
dp Q D DD K Ce
dQ D Q
−+
=−
we have
*
*'2'
'2
*
2
(, ())
() (2 )
2
()
2
dQpQ
dQ
dp Q D D DD h Cg
dQ D
KCehCg
Dp
Q
π
−+
=− −
++
=−
(4)
Theorem 2.
(1) when
() ,(, 0)Dp a bp ab=− > , then
*
Q
satisfies
32
*
()()()()0,
()max(),
hCgQ abwKCeQbKCe
QQ
ππ
+−−+++=
=
and
*
*
222
awKCe
p
bQ
+
=++
.
(2) when
() ,( 0, 1)
b
Dp ap a b
−
=>>
, then
*
Q
satisfies
2
*
1
() ( ) 0,
2
()max(),
bb
b K Ce K Ce h Cg
aw
bQ Q
QQ
ππ
−
−+ + +
+−=
=
and
*
*
()
1
bKCe
pw
bQ
+
=+
−
.
From (2) and (4), we can derive Theorem 2 easily,
and we also can obtain
**
*
*
()
()
2
D
pQ
Xe g
Q
α
=− +
.
3 THE IMPACT OF CARBON
TRADE ON DECISIONS
Due to the difficulty of the problem, in this section
we will numerically examine the impact of carbon
trade on the order quantity and price. First, we
introduce the following theorem.
Notice that when C=0, our problem is the EOQ
with pricing. In this case, the optimal order lot size
and price can be found from the following formulas.
'
2*
*
'*
()
,
()
(())
(, ()) ,
(()) 2
Dp K
pw
Dp Q
D
pQ hQ
Qp Q
DpQ
π
+=+
=− −
**'2'
'2
*
2
(, ()) () (2 )
2
()
2
dQpQ dpQDD DD h
dQ dQ D
Kh
Dp
Q
π
−
=
−−
=−
From the above formulas and (2), we can derive the
following Theorem 3 easily.
Theorem 3. If the order quantity is the same as that
without carbon trade, then the retail price should
increase. And if the price is the same as that without
carbon trade, then the order quantity should increase.
Theorem 3 shows that carbon trade increases the
cost of retailer, if his order quantity keeps constant,
he will increase his retail price in order to offset the
increased carbon cost, in other words, the end-
customers will partially pay the cost of low-carbon.
From Theorem 2, we have the following
observations.
Theorem 4. The order quantity, retail price and the
amount of carbon emission are decided by carbon
price, and have nothing to do with carbon emission
quotas.
From the following examples, we can obtain
some new observations.
Example 1. Let D(p)=6000−30p, K=$200/order,
h=$0.4/$/year, w=50, e=500, g=2,
2000
α
=
, the
results was summarized in Table 1 and Table 2.
Table 1: The results of Example 1 with increasing C.
C
**
(,)Qp
CE
profit
0
0.2
0.4
0.6
0.8
(1500,125)
(1299,125.1)
(1224.7,125.2)
(1186,125.2)
(1162,125.3)
2249.3
2163.7
2141.3
2132
2127
168450
168630
168820
169000
169190
Table 2: The results of Example 1 with increasing
α
.
α
**
(,)Qp
CE profit
4000
3000
2500
2000
1500
(1299,125.1)
(1299, 125.1)
(1299, 125.1)
(1299, 125.1)
(1299, 125.1)
2143
2143
2143
2143
2143
169030
168830
168730
168630
168530
Example 2. Let
2
( ) 4000000 ,Dp p
−
=
K=$200/order, and h=$0.3/$/year,w=50, e=500,
OPTIMAL ORDER LOT SIZING AND PRICING WITH CARBON TRADE
535
g=2,
3000
α
=
, the results was summarized in
Table 3 and Table 4.
Table 3: The results of Example 2 with increasing C.
C
**
(,)Qp
CE profit
0
0.2
0.4
0.6
0.8
(99.5,104)
(84.2,107.1)
(78.2,110.2)
(74.6,113.4)
(71.8,116.7)
3764.3
4222.6
4286.4
4245.1
4159.4
38454
37940
37489
37069
36675
Table 4: The results of Example 2 with increasing
α
.
α
**
(,)Qp
CE profit
7000
6000
5000
4000
3000
(84.2,107.1)
(84.2,107.1)
(84.2,107.1)
(84.2,107.1)
(84.2,107.1)
4222.6
4222.6
4222.6
4222.6
4222.6
38740
38540
38340
38140
37940
Tables 1-4 show that the order quantity would
decrease but retail price would increase with
increasing the carbon price. The carbon emission
would decrease in an additive demand function but
increase in a multiplicative demand function with
increasing the carbon price. The profit would
decrease with increasing the carbon price, which is
straightforward.
Tables 1-4 also show that the order quantity,
retail price and the amount of carbon emission
would keep constant with decreasing carbon
emission quotas. However, the profit would decrease
with decreasing carbon emission quotas since the
carbon constraint is becoming strict.
4 CONCLUSIONS
To respond to the regulations on carbon emissions, a
firm can optimize their operations decisions in
production, transportation, and inventory to reduce
carbon emissions. This paper examines the jointly
inventory and price decisions with carbon trade, we
derive the optimal order lot size and price based on
the EOQ model. We theoretical analyze the impact
of the carbon price and carbon emission quotas on
the order and price decisions, the carbon emission
and profit. We also present some interesting
observations from numerical tests.
In this paper, we suppose that carbon price has
nothing to do with carbon emission quotas, in fact,
carbon price is effected by carbon emission quotas,
if carbon emission quotas is small, which means the
carbon policy is strict, generally speaking, the
carbon price would increase. So, to examine the
same question in this case is a good further research
direction.
ACKNOWLEDGEMENTS
This research was supported by the NSFC under
grant number 71071015, 71003057, and 70801003,
the Ph.D. Programs Foundation of the Ministry of
Education of China under grant number
20100009120009, and the Fundamental Research
Funds for the Central Universities under grant
number 2009JBZ010-3.
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