Green closed-loop supply chain network design considering cost control and CO₂ emission

2.1 Green supply chain management

Considerable attention is put on the development of green supply chain (GSC) due to the worse environment. Many scholars present the review studies of the GSC theory. Several scholars put the emphasis on the framework of GSC. Dubey et al. (2015) focused on the investigation of relationship among participants in the GSC, and a theoretical system considering total quality was developed. Hussain et al. (2016) provided a useful measure for supply chain managers to develop a green service supply chain. The evaluation method they proposed incorporated environmental factors, social factors, customer relationships, and risk evaluation.

Research in green activities is also an important issue in this field. Zhu and He (2017) put emphasis on evaluating the influence of product design and found that price competition has positive effect on the sustainable development. Matsumoto et al. (2018) analyzed the characteristic of auto parts remanufacturing market regarding carbon dioxide emissions and found that price strategy is a stimulus to the purchase intention. Liu et al. (2016) provided supply chain–oriented analyses to identify both the important emission drivers and sources in Chinese exports. Ji et al. (2017) analyzed the behavior of carbon dioxide emissions from various channel members by the Stackelberg game model. They found the importance of low carbon sensitivity in supply chain. Acquaye et al. (2018) proposed an environmental performance evaluation model based on the concept of life cycle.

Supply chain network design problems under uncertain demand have been received weighty concern in the last decade. Pasandideh et al. (2015) developed a multiperiod three-echelon supply chain problem under uncertain environments where the internal parameters such as production demands, production time, and setup and operation times are subject to a certain probability distribution. Chen et al. (2017) analyzed the pricing decisions of a supply chain with one pair of manufacturer and retailer, which considered the consumer demand, the manufacturing cost, and the sales effort cost as uncertain variables.

Numerous solution methods are developed in the research of GSC management. Govindan et al. (2015) proposed a multiobjective stochastic model for GSC. They applied a metaheuristic approach to solve this problem. When it comes to performance optimization, the MIP model is usually adopted in this field. Altmann (2015) associated the MIP model with a demand function regarding green factors. The improved model could do good to sustainable development of companies and actual interests. A fuzzy MIP model was developed by Jindal and Sangwan (2014) to optimize the profits in a reverse logistics supply chain. Rezaee et al. (2017) proposed a two-stage mathematical programming model to establish a GSC in a carbon-trading environment.

2.2 Closed-loop supply chain network design problem

CLSC network problems are the hinge in the field of GSC network. A systemic literature review of CLSC network design problems is presented by Govindan et al. (2017).

The facility allocation problem is generally involved in the CLSC network design problem, and there is also much discussion in the structure design of a CLSC network. Pishvaee and Torabi (2010) presented a biobjective possibilistic MIP model to handle the uncertain and imprecise parameters in the CLSC network problem. Özkır and Başlıgil (2013) considered three factors — trade satisfaction, customer satisfaction, and total interests — in a CLSC network model under uncertain demand. Soleimani et al. (2017) proposed a multihierarchy CLSC network model and put emphasis on the return options. Zeballos et al. (2018) developed an MIP model combining the conditional value at risk (CVaR) with the construct of a CLSC network. The proposed method could improve the economic performance by controlling the returned products. Taleizadeh et al. (2018) investigated the influence of marketing performance on decision-making process of stakeholders. They conducted the research for the dual-channel CLSC network by the application of the Stackelberg game theory.

Various solution methods are developed for the numerous studies in the CLSC network area.

As the vital environmental factor in the CLSC network, the impact of CO₂ emissions has been widely discussed. Tosarkani and Amin (2018) developed a fully fuzzy programming method to determine the possible upper, middle, and lower ranges of profit for a multiechelon battery CLSC with multicomponents and multiproducts in multiperiod under imprecise information. Guo et al. (2019) developed a multiperiod CLSC model with the consideration of supply disruption and government subsidy.

Similar to traditional supply chain network research, uncertainty is also an important factor that concerns the CLSC network. Pishvaee et al. (2011) presented a robust mathematical model to deal with the uncertainty for a CLSC design problem. Bai and Sarkis (2013) proposed the term of reverse logistics flexibility into the CLSC research. A third-party reverse logistics provider performance assessment application of the reverse logistics framework was illustrated. A multiobjective mathematical model was presented for a CLSC network under uncertainty demand by Zhen et al. (2019). A Lagrangian relaxation method was developed to solve the model. Prakash et al. (2018) developed a generic CLSC network based on MIP formulation with direct shipping to the customer from manufacturing plants as well as shipping through distribution centers under supply risks, transportation risk, and uncertain demand using a robust optimization (RO) approach.

Several viewpoints about the related research can be derived from above review of references. (1) Multiobjective optimization and MIP method are widely employed for both GSC and closed-loop supply network design. (2) Carbon emission factors are the focus of research in GSCs and CLSCs. (3) As far as we know, there has been little in-depth research for the optimization problem in the CLSC network considering integrated uncertain demand CO₂ emission control on facilities and transportations. The proposed optimization model in this study integrates environmental factors and factors of CLSC design issues, including facility allocation, facility capacity, and environment-level, uncertain demand and channel flow decision, which is rather useful for decision-makers. Thus, differences between this study and other studies in the literature are revealed. The proposed stochastic MIP model regarding CO₂ emissions incorporates the uncertainty of product demand, forward/reverse logistics, and different types of facilities and products. Insightful opinions and research findings are of great significance to the improvement of a green CLSC network.

4.1 Notations

4.2 Objective functions

Formulation process of the proposed MIP model is described in this subsection. In order to develop a green CLSC network, the objective of this model is to estimate the CO₂ emissions and operation cost. The detailed process of formulating the green forward–backward CLSC network model is shown as follows:

Objective 1: Minimizing the total cost of the entire network is the first objective function, including the shipping cost for delivering products, the fixed operating costs of the opening facility, the variable cost of products processing, and the inventory cost of temporarily holding products. The equations of the four subitems involved in objective 1 are shown as follows.

1. The function of the transporting cost for delivering products via forward and reverse channels is formulated as

   TC=∑s∈Sws{∑j∈J,p∈Pd˙jt˙(αpjs+βpjs)xp+∑j∈J,i∈I,p∈Pd¨jit˙(ηpjis+μpijs)xp}

2. The fixed cost of facilities is formulated by

   FC=∑g∈G,c∈C,j∈Jψcgjfcg

3. The variable cost of manufacturing, recovery, distribution, collection, and disassembling is calculated by

   VC=∑s∈S,i∈I,j∈J,p∈Pwsap(αpjs+βpjs+ηpjis+μpijs)

Objective 2: Measuring the impact of emission control factors on the frequent transit network (FTN) is the second objective of this model. This expression aims to minimize the total amount of CO₂ emissions due to transport flow and facility operations.

The formulations of the two subparts involved in objective 2 are shown as follows. The following expression is proposed to minimize the CO₂ emissions during transportation and operation activities.

The formulations involving three subparts are shown as follows.

1. CO₂ emissions during transportation are calculated by

   TE=∑s∈Sws{∑p∈P,j∈Jd˙jt¨(αpjs+βpjs)xp+∑j∈J,p∈P,i∈Id¨jit¨(ηpjis+μpijs)xp}

2. The fixed CO₂ emissions of facilities are calculated by

   FE=∑g∈G,c∈C,j∈Jψcgjecg

The objective function of the presented model is described as follows:

Objective 1: Min F1=TC+FC+VC

Objective 2: Min F2=TE+FE

4.3 Mathematical model

The mathematical optimization model is constructed as follows:

Eqs. (1–2) represent the overall CO₂ emissions. Constraints (3–4) ensure that demands from customer segments are met and all return products are collected. Constraints (5–8) ensure that product flows at facilities are uniform during transportation. Constraint (9) describes the capacity constraints of facilities. Constraint (10) ensures that one and only capacity level and environmental levels are set to each facility. Constraint (11) ensures that each point has one and only set of environmental levels and capacity levels. Constraints (12–13) ensure that non-negativity variables and binary variables meet the requirements of proposed model.

A facility location problem with certain demand is an NP-hard problem (Boland et al., 2017; Min et al., 2006). The model this study investigates is under the condition of uncertain demand, and it is also an NP-hard problem, but under more complex condition.

6.1 Case description and experiment setting

We assume the following problem scale in the proposed CLSC network, that there are a firm, six potential distribution nodes and ten customer points, as illustrated in Figure 2.

The main parameters mentioned in the model are presented in Tables I–IV.

6.2 Numerical experiment result

Numerical experiments are conducted in this section, based on the case study, aiming to compare the proposed Epsilon method with CPLEX, to confirm the reliability of the introduced stochastic MIP model and support-related practitioners in the process of decision-making.

The proposed model is solved by the solver, CPLEX 12.9. The C# programming language is applied for coding. The solving process is conducted by Visual Studio 2015 IDE, on a Lenovo laptop (4 Intel(R) Core (TM) i7-6500U processors, @ 2.5 GHz and 8 GB memory), under the Windows 10 operation system.

The proposed Epsilon-constraint model of this paper is represented as follows:

The presented model in Eqn (15) is solved for the following situation: With F2 as the objective function and eliminating F1 to find the optimum value of F2 which is termed as ω here. To find the Pareto optimal solutions, the epsilons associated with F2 are assigned based on the values of ω, which is 1539154.40 g of CO₂ emissions. The values related to the epsilons are illustrated in Table V.

From Table V, clearly, ε2∈(1616112.12,2462647.04). In each instance of Table V, the two objective functions can lead to a Pareto solution and the final computations can present a schematic of the Pareto frontier and likewise for the nondominated solutions, as Figure 3 shown. The details of the numerical validation of the model and the solution methodology are discussed next.

For the Epsilon-constraint method, the change in ε means the acceptability of the entire CLSC network to environmental objective. In terms of cost objectives, cost from distribution and cost from transportation are barely influenced by different values of ε. With the increase in the value of ε, cost from facility operation grows inversely. The sudden shift of the smallest share from cost from distribution activities to cost from facilities operation is rather remarkable when the value of ε is over 1.25. The results of the analysis are shown in Figure 4. Consequently, the control of cost from facilities operation is an important concern for the practical operation of the CLSC network.

In terms of environmental impact, CO₂ emissions from transportation activities are quite stable regardless of the value of ε. With the growth of the value of ε, CO₂ emissions from facility operation increase. When the value of ε is over 1.1, the share of CO₂ emissions from facility operation occupies the major part of the total emissions. The results of the analysis are shown in Figure 5. Consequently, it is necessary to pay more attention to the set of environmental levels in the CLSC network design.

The emphasis of the CLSC network design is on the control of costs from facilities operation and the set of environmental levels. When the value of ε ranges from 1.05 to 4.45, costs and CO₂ emissions are varied regularly with the change of it. However, the regular change shifts into a stable status, when the value of ε is over 1.45. This finding suggests that managers should decide the extent of toleration for emissions from a scientific perspective. Otherwise, higher level of toleration will not make a difference and will be a waste on costs and time.

The idea of “Efficiency of CO₂ Emissions Control Reduction” is employed to present the effectiveness of CO₂ emissions change, which is calculated by the ratio of the “declining volume of CO₂ emissions between two adjacent cases” to the “increment of cost between the two adjacent cases,” as Eqn (16) stated. Base on the formulation of efficiency (Δ) in controlling CO₂ emissions, the specific value of ε for the biobjective optimization problem can be decided. Apparently, the optimal value of ε for the proposed model is 1.35, according to Figure 6.

6.3 Sensitivity analysis result

Return rate is the major index in the CLSC network design. In order to explore the changes in the values of the objective functions based on the return ratio, a set of sensitivity analysis based on three kinds of return rate is applied on the presented model.

As illustrated in Figure 7, the Pareto frontier curve is moved to the right with the increase in return rate. It implies that CO₂ emissions are influenced adversely by return rate, so are costs.

The changes in the economic and environmental subobjective under different values have been compared, as shown in Figure 8.

With the reduction in requirement on environmental levels, costs are declining, while CO₂ emissions are increased, as presented in Figure 8. Meanwhile, the influence on costs is greater than that on emissions. Under different requirement on environmental levels, costs will increase uniformly as the return rate increases. However, there is no consistent change in CO₂ emissions.