Designing a sustainable-resilient humanitarian supply chain for post-disaster relief process, an earthquake case study in Haiti

Hossein Shakibaei (School of Industrial Engineering, College of Engineering, University of Tehran, Tehran, Iran)
Seyyed Amirmohammad Moosavi (School of Industrial Engineering, College of Engineering, University of Tehran, Tehran, Iran)
Amir Aghsami (Department of Industrial Engineering, KN Toosi University of Technology, Tehran, Iran and School of Industrial Engineering, College of Engineering, University of Tehran, Tehran, Iran)
Masoud Rabbani (School of Industrial Engineering, College of Engineering, University of Tehran, Tehran, Iran)

Journal of Humanitarian Logistics and Supply Chain Management

ISSN: 2042-6747

Article publication date: 25 March 2024

Issue publication date: 29 August 2024

2102

Abstract

Purpose

Throughout human history, the occurrence of disasters has been inevitable, leading to significant human, financial and emotional consequences. Therefore, it is crucial to establish a well-designed plan to efficiently manage such situations when disaster strikes. The purpose of this study is to develop a comprehensive program that encompasses multiple aspects of postdisaster relief.

Design/methodology/approach

A multiobjective model has been developed for postdisaster relief, with the aim of minimizing social dissatisfaction, economic costs and environmental damage. The model has been solved using exact methods for different scenarios. The objective is to achieve the most optimal outcomes in the context of postdisaster relief operations.

Findings

A real case study of an earthquake in Haiti has been conducted. The acquired results and subsequent management analysis have effectively assessed the logic of the model. As a result, the model’s performance has been validated and deemed reliable based on the findings and insights obtained.

Originality/value

Ultimately, the model provides the optimal quantities of each product to be shipped and determines the appropriate mode of transportation. Additionally, the application of the epsilon constraint method results in a set of Pareto optimal solutions. Through a comprehensive examination of the presented solutions, valuable insights and analyses can be obtained, contributing to a better understanding of the model’s effectiveness.

Keywords

Citation

Shakibaei, H., Moosavi, S.A., Aghsami, A. and Rabbani, M. (2024), "Designing a sustainable-resilient humanitarian supply chain for post-disaster relief process, an earthquake case study in Haiti", Journal of Humanitarian Logistics and Supply Chain Management, Vol. 14 No. 4, pp. 349-368. https://doi.org/10.1108/JHLSCM-08-2023-0071

Publisher

:

Emerald Publishing Limited

Copyright © 2024, Hossein Shakibaei, Seyyed Amirmohammad Moosavi, Amir Aghsami and Masoud Rabbani.

License

Published in Asia Pacific Journal of Innovation and Entrepreneurship. Published by Emerald Publishing Limited. This article is published under the Creative Commons Attribution (CC BY 4.0) licence. Anyone may reproduce, distribute, translate and create derivative works of this article (for both commercial and non-commercial purposes), subject to full attribution to the original publication and authors. The full terms of this licence may be seen at http://creativecommons.org/licences/by/4.0/legalcode


1. Introduction

The term “disaster” encompasses events that inflict harm, devastation, environmental disruption, human suffering or damage to health and medical services. Such events necessitate immediate and extraordinary planning to address the impacted community or area (Mahmoodi et al., 2022). Disasters are categorized into two main types: 1. Natural disasters, which include earthquakes, floods, volcanoes, droughts and more. 2. Human-made disasters, such as war, nuclear accidents, extreme poverty, disease outbreaks and others (Tofighi et al., 2016). Based on documented statistics, there has been a significant rise in the frequency of natural disasters since 1980, and they usually give rise to damage to human life and their property (Bakhshi et al., 2022). However, the impact of these disasters is not uniformly distributed across the globe, with underdeveloped nations experiencing the most severe devastation (Galanis et al., 2021). The primary factors contributing to the rise in casualties from natural disasters are environmental changes (Naderi et al., 2023a), the expansion of urban populations and the susceptibility of individuals residing in disaster-prone areas, making them more susceptible to events such as floods, typhoons and windstorms (Attia et al., 2020). The recognition of the significance of coordination and meticulous planning in delivering aid to disaster victims has led to a departure from traditional approaches, which relied on external individuals providing essential items and shelter. This realization has prompted increased attention toward the establishment of a humanitarian supply chain (HSC), aiming to ensure a more effective and efficient response to the needs of those affected (Agarwal et al., 2020). HSCs are consistently vulnerable to various risks, including facility damage, disruption of transportation routes, resource scarcity and political inefficiencies (Kovács and Spens, 2007). Flexibility in the components of the HSC has gained utmost importance, as it empowers supply chain managers to effectively respond to disruptions and unforeseen events (Das et al., 2021). This study focuses on modeling a resilient HSC with the objective of providing optimal relief to disaster victims while minimizing casualties, damages and environmental pollution.

According to studies in the International Journal of Disaster Risk Reduction, from 2010 to 2019, more than 7,300 disasters occurred worldwide, causing the death of more than 1.2 million people. Also, the number and deaths due to disasters in that decade increased by 30% and 66%, respectively, compared to the previous decade (Bonaretti and Fischer-Preßler, 2021). Also, the Emergency Events Database recorded 432 natural disasters worldwide just in 2021 (Naderi et al., 2023b). According to the statistics on deaths caused by earthquakes, there have been more casualties in recent years. According to the report, more than 2.5 million people have died as a result of earthquakes globally over the last century (Hayes et al., 2015). Up until now, the most devastating disaster of the 21st century has been the coronavirus pandemic, resulting in a minimum of seven million fatalities (Kanecki et al., 2021). Before 2017, more than 87% of disaster-related deaths in India were related to drought. Also, in this country, the most damage in disasters was related to floods, which caused more than 58bn dollars of damage to the country (Negi and Negi, 2021). During the span of 60 years, based on available statistics until 2019, Iran has experienced over 400 catastrophic events leading to considerable damage. Regrettably, these disasters have resulted in the loss of over 180,000 lives. Earthquakes contributed to more than 65% of these fatalities, while floods constituting approximately 10% of the overall casualties (Sharifian et al., 2017).

HSCs play a crucial role in addressing the aftermath of disasters by providing vital resources and necessary equipment to victims. They should demonstrate swift and efficient action in the relief process to rescue and assist victims, ensuring the delivery of essential items and safely relocating them to secure locations (Bui et al., 2021). The primary challenges faced during relief efforts include the destruction of communication routes and infrastructure, as well as difficulties in identifying and assessing vital items at various centers. This underscores the importance of well-planned relief projects. Humanitarian organizations can enhance their preparedness and response to supply chain disruptions by using resilience models. These models help ensure the uninterrupted provision of essential commodities and services to those in need. A resilient supply chain represents a constructive and responsible system that can deliver improved services to individuals requiring assistance (Wu et al., 2019).

In the end, by reading this article, the following questions will be answered:

Q1.

What is the optimal place to establish or choose a facility?

Q2.

What effect can the uncertainty of the parameters have on our relief process?

Q3.

How can resilience in the supply chain deal with disruptions and possible disruptions in the supply chain?

Q4.

In addition to optimizing social satisfaction, how can an HSC effectively address multifaceted dimensions of sustainability, encompassing economic costs and environmental impacts, within the context of engineering solutions?

To address the aforementioned concerns, a model grounded in mixed-integer linear programing (MILP) has been proposed. This model seeks to determine the optimal locations of facilities, the most efficient transportation modes connecting these facilities and the appropriate quantity of relief item transfers between them.

The literature relevant to the subject matter is reviewed in Section 2. Section 3 provides an explanation of the problem and presents the proposed model. In Section 4, solution methods are introduced. Some numerical examples are presented in Section 5. Section 6 implements the proposed model on a case study, and derives the useful results. A comprehensive sensitivity analysis will be conducted in Section 7. Discussion and managerial insights are presented in Section 8. And in the last part, a conclusion of the article is presented.

2. Literature review

In recent years, numerous types of research have been presented on issues related to the HSC. The increase in disasters in recent decades has augmented attention to HSC. Therefore, in the following, the articles published in recent years addressing various aspects of sustainability, location problems, models with multiple objective functions and resilience in HSCs will be examined.

2.1 Sustainable humanitarian supply chain

In several papers, a mathematical model is used that considers all three aspects of sustainability. Haavisto and Kovács (2019) argued that other sustainability aspects such as pollution, sustainable development and social responsibility, have received less attention in HSCs. Oguntola and Ülkü (2023), conducted a study that examined the utilization of artificial intelligence (AI) in sustainable humanitarian logistics (SHL), taking into account the economic, environmental and social dimensions of sustainability. Their research concluded that the application of AI in SHL has the potential to significantly enhance life-saving efforts in humanitarian logistics. In a case study conducted in Mexico, Rodríguez-Espíndola et al. (2023) examined the simultaneous and effective consideration of both obtaining victims’ consent and reducing carbon emissions in SHL. Their findings indicated that incorporating a diverse range of transportation modes can effectively contribute to reducing carbon emissions and optimizing victims’ satisfaction during the relief process. Zarei et al. (2019) identified five key factors, namely, supply chain structure, transportation, suppliers, waste and the cultural aspects of people, as the primary components in the discourse on sustainability in the HSC. Praneetpholkrang and Kanjanawattana (2021) proposed a model that incorporates three objective functions for identifying the optimal locations of relief shelters in the aftermath of a disaster. Aghajani and Torabi (2020) developed a MILP model with dual objectives. The model aimed to minimize supply chain costs while also prioritizing relief time, taking into account the importance of various types of relief items. Their findings emphasized the crucial role of pre and postdisaster relief preparations in the overall disaster relief process. Jensen and Hertz (2016) conducted a comprehensive study on the sustainability of pharmaceutical waste in humanitarian aid across multiple regions in Africa. Their research revealed a significant lack of attention given to waste sustainability within the context of humanitarian aid, particularly in the medical sector. Additionally, their findings highlighted the increasing number of organizations involved in disaster relief and logistics. Cao et al. (2021) introduced a three-objective MILP model aimed at minimizing unmet demand, reducing biological damage during the relief process and minimizing supply chain costs. Their findings emphasized the importance of a central agency to oversee the supply chain components, ensuring comprehensive attention to sustainability throughout all activities:

This article explores the dimensions of sustainability in the HSC with the goal of achieving overall satisfaction among all stakeholders and participants involved in the relief process across multiple facets.

2.2 Optimal facility location in the humanitarian supply chain

Given the potential for disruption during disasters, it becomes evident that maintaining uninterrupted relief operations is challenging. Therefore, strategically locating facilities before or after such events becomes crucial in minimizing the impact on the relief process. Since the 1950s, the importance of facility location in the HSC has significantly increased due to the escalating frequency of both natural and human-made disasters (Boonmee et al., 2017). Erden et al. (2023), managed a study to determine the optimal location for building distribution centers in an HSC in the Saraka province of Turkey. They used criteria such as environmental factors, transportation infrastructure, proximity to airports and vulnerability to accidents. Using the best worst method, they evaluated and identified the most suitable location. Based on their findings, the Adaparazi region emerged as the optimal choice for establishing the distribution center in this area. Shavarani (2019) introduced a model with the objective of determining the optimal quantity and location of disaster relief centers and drone fueling centers. These centers play a crucial role in serving individuals involved in the HSC. Ak and Derya (2021) used multicriteria decision-making methods to prioritize criteria for identifying the optimal location for establishing a logistics warehouse within an HSC. Zhao and Liu (2018) developed a multiobjective model to enhance disaster response capabilities by determining the most suitable location for emergency rescue equipment on the ground. By presenting a range of Pareto solutions, they compared different approaches that took into account different facility locations. In their study, Loree and Aros-Vera (2018) introduced an innovative approach using a mixed-integer nonlinear programming model. The purpose of this model is to identify the most effective locations for distribution centers to provide humanitarian aid in postdisaster situations. The main goal of the model is to minimize human suffering and casualties. This approach demonstrates remarkable progress in terms of cost-effectiveness and overall satisfaction of the affected population, surpassing the capabilities of traditional disaster service models:

This article discusses a comprehensive approach for determining the optimal locations of aid stations and refugee camps. It also explores alternative locations for each facility in the event of destruction or unavailability.

2.3 Enhancing resilience in humanitarian supply chain

Without a doubt, postdisaster scenarios often entail additional challenges that can further impact the relief supply chain. If the supply chain lacks the flexibility and resilience to cope with unforeseen disruptions, the relief efforts can suffer from significant delays, resulting in high costs and substantial losses. In their pioneering work, Modarresi and Maleki (2023) successfully integrated decision-making processes in an HSC both pre and postdisaster scenarios. Their study concluded that implementing strategies such as flexible long-term contracts and allocating dedicated budgets for unforeseen events and public assistance can significantly enhance the resilience of the HSC. These findings emphasize the importance of proactive measures and effective resource management in ensuring the preparedness and response capabilities of humanitarian operations. Kaur and Singh (2022) proposed a robust three-stage resilience framework combined with a mathematical model incorporating two objective functions aimed at mitigating disruptions in a global HSC. The framework consists of supplier selection as the initial step, followed by the application of a MILP model to minimize costs and reduce reliance on nonflexible suppliers. Finally, the focus shifts toward minimizing disruptions within the HSC. Xu et al. (2021) investigated key indicators for assessing the adaptability of the HSC during a 2020 flood in a specific region of China. Their findings emphasize the importance of establishing effective communication channels and information transfer mechanisms within the supply chain departments. This enables the formation of a flexible supply chain that can respond efficiently during flood-related disasters to ensure proper service delivery. In their research, Medel et al. (2020) explored the connection between collaboration in the private sector and public sector, and its influence on the resilience of HSCs. Their study demonstrated that when these two sectors collaborate by engaging in activities such as establishing reserves, enhancing capacities and sharing resources, it greatly improves the overall resilience of the aid supply chain. In their study, Foroughi et al. (2022) analyzed the potential risks of service delivery disruptions following natural disasters with the aim of identifying flexible parameters within the HSC. The parameters under investigation included the demand quantity, the probability of disruptions in different scenarios and the manufacturing cost for each product. The research findings revealed that incorporating flexible parameters into relief models brings them closer to real-world conditions, enhancing their practical applicability. Singh et al. (2018) examined the factors that impact the resilience of an HSC. Their research findings underscore the significance of several essential elements in bolstering supply chain resilience during disaster situations. These factors include the active support of government agencies, consistent monitoring of relief processes and strategic planning to align demand with the capacity of relief centers. The study emphasizes the critical role played by these factors in fostering resilience within the HSC. Reddy et al. (2016) conducted a comprehensive study to explore factors vital in strengthening the resilience of the food supply chain and agricultural industry during periods of disasters. Their research highlighted the importance of several key factors, such as establishing a parallel backup supply chain in conjunction with the primary supply chain, providing training sessions for supply chain agents prior to disasters and conducting disaster simulations. The study strongly indicated that proactive adoption of these measures before a disaster can significantly enhance the overall resilience of the supply chain, enabling more effective recovery in the aftermath of such events.

2.4 Multiobjective approach in humanitarian supply chain

Given the complexity of modeling HSCs, it is crucial to address multiple aspects simultaneously, including social satisfaction, economic costs, environmental concerns and more. In most cases, these models operate by optimizing multiple objective functions in parallel, understanding the interconnected nature of these factors and their collective impact on humanitarian operations. Ehsani et al. (2023) developed a scenario-based, multiobjective, multiperiod, internet of things-based, location-allocation-inventory model to respond phase of disasters in the epidemic outbreak. In their study, Akbari et al. (2023) proposed a three-objective function model for designing an HSC. The first objective function aimed to minimize the ratio of untreated wounded individuals to the total number of injured. The second objective function focused on minimizing the shortage of relief items, while the third objective function aimed at minimizing economic costs. Their research findings demonstrated that the sensitivity of the first objective function to cost-related parameters, such as transportation and facility construction costs, was greater compared to the second objective function. Bhuiyan et al. (2024) directed a study where they introduced a three-objective function model with the goal of reducing economic costs, relief time and the involvement of vehicles in humanitarian relief operations. The model was tested through a case study carried out in the Philippines. The research yielded compelling findings, indicating that this model significantly enhances the efficiency of HSCs, particularly in situations involving secondary accidents. Masoumi et al. (2022) discussed a multiobjective and multiperiod queueing-inventory-routing problem in which a queueing model has been considered to reduce the congestion in the borders of the affected areas (AA). In a study conducted by Jamali et al. (2021), the 2016 Kermanshah earthquake was examined using a multiobjective mixed-integer programming model. The objective was to assess and compare various aspects of the HSC, including social, economic and environmental factors. The results of the comparison highlighted that prioritizing and improving environmental aspects within the HSC does not always result in higher relief costs. However, it was noted that enhancing the environmental objective function could potentially hinder the improvement of the objective function tied to maximizing social satisfaction. This indicates the need for careful consideration and balance across the different objectives when optimizing the HSC in the context of its social, economic and environmental dimensions. In their study, Praneetpholkrang and Kanjanawattana (2021) proposed a comprehensive three-objective model to determine suitable housing locations for earthquake victims. The model aimed to minimize economic costs, decrease evacuation time for victims from AA and minimize the number of required shelters while ensuring accommodation for all victims. The results showcased the effectiveness of the model in reducing overall supply chain costs by optimizing the number of shelters needed, all while successfully providing housing for 100% of the victims. Mohammadi et al. (2021) proposed a three-objective model to address various factors involved in HSC design. These factors included determining the locations of relief centers, establishing evacuation routes for accident victims and optimizing truck routing. The primary objective of the model was to reduce economic costs across the supply chain, followed by the secondary objective of minimizing maximum truck overload. Additionally, the third objective function aimed to minimize human casualties during the relief process. The results demonstrated the model’s effectiveness in designing a robust HSC under nondeterministic parameters, highlighting its practicality and usefulness in real-world applications. Jha et al. (2017) conducted a study where they introduced a multiobjective model specifically tailored for earthquake scenarios in service supply chains. The main goals of the model were to determine optimal locations for relief camps, optimize delivery routes from suppliers to relief centers and streamline transportation of victims from AA to shelters. The primary objective function focused on minimizing supply chain costs, while the secondary and tertiary objective functions aimed to reduce the gap between supply and demand, ensuring continuous service provision within the relief chain, and enabling efficient evacuation of victims. This multiobjective model encompasses various facets of the supply chain in emergency situations, facilitating effective coordination and resource allocation.

2.5 Gap analysis and research contribution

This article aims to address the gaps identified in previous articles within the field. These gaps can be summarized as follows:

  • Limited consideration of sustainability dimensions: previous studies in philanthropic contexts have incorporated sustainability aspects into their quantitative supply chain models. However, the focus has primarily been on one or two dimensions of sustainability. This article seeks to broaden the scope by encompassing multiple sustainability dimensions in the model, providing a more comprehensive analysis.

  • Single criterion approach: many articles in the field have focused on addressing only one criterion within each dimension of sustainability. For instance, when examining social satisfaction, they primarily consider factors such as the extent of demand coverage or the time taken for relief efforts. In contrast, this article acknowledges the need to assess multiple criteria within each dimension, allowing for a more nuanced evaluation of social satisfaction and other sustainability aspects.

  • Lack of consideration for resilience in supply chain disruptions: most existing articles in the HSC domain overlook the importance of resilience against future disruptions that may arise in various relief aspects. This article aims to address this gap by examining the impact of potential future disturbances on crucial criteria, such as relief time and victim demands. By incorporating resilience into the model, a more robust approach to HSC management can be achieved.

In this paper, a multiobjective HSC model is developed using a case study of the 2021 earthquake in Haiti. Through a review of existing literature, it has been observed that there is a lack of comprehensive models in the field of HSCs that consider all aspects of sustainability concurrently. This study comprehensively examines various factors, such as the emission of greenhouse gases resulting from the production and transportation of relief items, as well as the management and relocation of damaged goods during relief operations. Moreover, it encompasses economic costs, environmental considerations and social satisfaction, while also focusing on meeting demand requirements and ensuring timely delivery of relief aid. The proposed model is designed to incorporate resilience measures to effectively address potential disruptions caused by aftershocks. Additionally, the model’s outcomes will generate a set of Pareto solutions, thereby equipping managers with invaluable insights for decision-making and control in the aftermath of a disaster.

This article offers several advantages over previous studies, including the following:

  • In comparison to Boostani et al. (2021) article, this study includes an evaluation of victim satisfaction by considering the time it takes for relief processes. This additional aspect provides a superior approach to assessing the effectiveness of the relief efforts.

  • In addition to addressing the sustainability aspect of the supply chain, this research specifically emphasizes the reduction of greenhouse gas emissions associated with the production and transportation of relief items, along with the effective management and relocation of damaged goods during relief operations. It is noteworthy that Shakibaei et al. (2023) study failed to consider these crucial factors, underscoring the valuable contribution of this article in integrating environmentally friendly practices within the humanitarian framework.

  • The model presented in the article by Cao et al. (2021) was developed without considering secondary disasters and incorrectly assumed that survivors would need only one type of item, aid kits, without accounting for different quantities. Furthermore, the model did not consider capacity limits across various transportation modes. In contrast, our model takes into account different types of relief items with varying levels of importance and demand from the victims, as well as transportation capacity constraints.

3. Problem descriptions

This article introduces a comprehensive framework for disaster relief operations, focusing on the structure and methods used in providing aid to AA. A well-designed supply chain consisting of various facilities is proposed to facilitate the delivery of relief goods to distribution centers located in the affected regions. Consideration is given to the varying levels of importance assigned to different relief goods, and multiple transportation modes are used to ensure efficient movement between facilities. The primary objective of this study is to ensure timely and effective relief efforts while maximizing satisfaction in meeting the demands of disaster victims. Simultaneously, the article emphasizes the importance of minimizing environmental damage caused during the relief process and reducing overall economic costs. By integrating these three key objectives, the proposed framework aims to achieve a balanced and sustainable approach to disaster relief operations. By adopting this comprehensive approach, the article intends to contribute to the field of disaster management by providing a robust framework that optimizes resource allocation, enhances logistics efficiency and prioritizes the needs of affected communities. The holistic nature of the proposed model ensures that relief efforts are not only effective and efficient but also sensitive to environmental concerns and economically viable.

This study presents a three-objective mathematical model using MILP to address key considerations in a disaster relief supply chain. The supply chain comprises four levels of facilities, each serving a unique role. The first level involves established suppliers responsible for providing relief items. The second level consists of distributor reference warehouses (DRW) tasked with receiving large quantities of relief items from suppliers and distributing them to the third level: local distributors. Finally, the relief items are sent from the local distributors to the AA for distribution among the victims. The proposed model seeks to determine several factors, including the quantity of products transported between facilities, the selection of facilities to receive services, the choice of location for establishing these facilities, the type of transportation chosen for delivering goods, the inventory levels in each facility and the number of unused products based on transportation capacity limitations. Each facility and transportation mode has its own capacity limitations, leading to variable delivery times based on the type of vehicle used. Additionally, in the establishment of facilities, product manufacturing and transportation processes, various types of environmental damage are inevitably incurred. With this mathematical model, the article aims to optimize resource allocation, minimize transportation costs and enhance efficiency in the disaster relief supply chain while addressing environmental concerns. By considering these multiobjective factors, decision-makers can make informed choices to achieve an effective and sustainable relief operation (Figure 1).

In this model, each product’s importance level corresponds to the specific needs of the disaster victims, making its production crucial for ensuring their satisfaction. After a disaster, the importance of relief items needed by the victims varies significantly. Blood packs, therapeutic serums and play equipment for children in relief shelters each hold a different degree of importance in the relief model. The model incorporates different scenarios with varying aftershocks, resulting in disruptions across facilities, leading to the destruction of relief items and prolonging the relief timeline. Figure 2 provides an overview of the supply chain, with arrows indicating different modes of transportation between facilities. Each scenario considers rates for both time and disruption extent, illustrating the impact of each aftershock on relief time and disruptions. This article tackles the model by initially solving it precisely using general algebraic modeling system (GAMS) software. Some assumptions have been made to formulate this supply chain model accurately. By considering these various factors and using efficient algorithms, the aim is to optimize the relief process, minimize disruptions and achieve timely and effective aid delivery in disaster scenarios.

Figure 1 shows a simple summary of the article structure.

The model is developed under the following assumptions:

  • Relief items are considered to be susceptible to damage only during the transit between facilities.

  • Any relief items that sustain damage during transportation are discarded upon arrival at the destination facility.

  • The capacity of each facility and transportation mode is defined in a general manner, without specifying individual capacities for each type of relief item within each facility or vehicle.

  • The inventory level within each facility is determined by the sum of items sent from that facility to other facilities, along with any remaining unused items within the facility due to capacity limitations in transportation and other facilities.

  • There are predetermined options available for establishing facilities, and the selection is based on optimizing the overall performance of the supply chain.

  • The transportation modes between facilities are predefined, and the choice of transportation is influenced by factors such as capacity and delivery time.

  • The model considers different levels of importance for each product based on the needs and satisfaction of the disaster victims.

  • The incorporation of different scenarios with varying aftershocks assumes that these scenarios can impact the facilities in the supply chain, resulting in disruptions and potentially damaging or destroying relief items.

  • The environmental damage caused during the establishment of facilities, production of items and transportation processes is acknowledged as a significant factor.

Figure 2 shows an overview of the supply chain presented in this article.

3.1 Three-objective linear integer mathematical programming model

The article presents a formulated three-objective linear integer mathematical programming model to tackle the problem at hand. The epsilon constraint method has been used to generate a set of Pareto-optimal solutions for this multiobjective model. The primary goal of the model is to improve satisfaction levels among disaster victims through the minimization of relief time, unfulfilled demand, environmental damage and economic costs. The solution methodology section provides comprehensive details regarding the methodology and solution approach used in the study.

3.2 Mathematical modeling

This subsection focuses on presenting the mathematical modeling.

Table 1 has listed the used notations of the proposed mathematical model.

The first objective function [equation (1)] aims to maximize social satisfaction in relief efforts. This objective function consists of two key components: the first component focuses on maximizing the fulfillment of victims’ demands, while the second component focuses on minimizing the maximum relief time.

The second objective function [equation (2)] is centered on minimizing the economic costs associated with the HSC. These costs encompass various factors such as the establishment and utilization costs of supply chain facilities, production costs of relief items, transportation costs during the relief process, costs incurred due to unmet demands and costs attributed to unused items within the facilities. The objective is to optimize these economic factors and reduce overall expenses within the HSC.

The third objective function [equation (3)] focuses on minimizing the detrimental environmental impacts within the supply chain during the relief process. These impacts include factors such as the emission of greenhouse gases resulting from the production and transportation of relief items, as well as the disposal or evacuation of disrupted items during relief operations. The objective is to reduce the environmental footprint and promote sustainable practices throughout the supply chain, considering the ecological consequences of relief efforts.

(1) MaxZ1=(lakms(δk*Ps*xlamks*чaks))л*Tmax
(2) MinZ2=jEDj*jjj+lELl*BLl+aERa*BAa+ijmksTSDijmk*Qijmks+jlmksTDLjlmk*Wjlmks+lamksTLAlamk*Xlamks+k(CSDk*UUkas)+iksUISik+ULSikS*PS+jksUIDjk*ULDjks*PS+lksUILlk*ULLlks*PS
(3) MinZ3=iksILIiks*GPik+ijkmsGSijkm*Qijkms+jlkmsGSjlkm*Wjlkms+lakmsGSlakm*Xlakms+sPs(jk(1δjks)*pcjk*ILDjks+ lk(1llks)*pclk*ILLlks+aks(1чaks)*pcak*ILAaks) 
Equations 4 to 21 represent the constraints within the model. These constraints play a crucial role in ensuring the accuracy and validity of the model’s formulation.

Constraints 4 and 5 show the capacity limits for each local distribution center (LDC) and each DRW.

Constraint 6 states that the sum of unused items within each supplier and the items sent to DRWs must not exceed the supplier’s capacity. This constraint ensures that the total inventory within a supplier remains within its specified limits, accounting for both unused items and those allocated to DRWs.

Constraint 7 shows that in each DRW, the sum of output items and unused items should not exceed the capacity of that DRW.

Constraint 8 shows that in each LDC, the sum of output items and unused items should not exceed the capacity of that LDC.

Constraint 9 shows the amount of unfulfilled demand for each relief item k in each AA.

Constraints 10 to 12 specify the transportation constraints for each relief item (k) across different modes of transport (m).

Constraints 13 to 15 indicate the level of inventory in each facility of the supply chain.

Constraints 16 to 18 ensure transportation time between facilities in each mode remains below the maximum relief time.

Constraints 20 and 21 specify the loss percentage of goods during transportation between facilities:

(4) kILLlks*ukCLl*BLl   l,s
(5) kILDjks*ukCDj*JJj    j,s
(6) kjmQijkms*uk+kULSiks*ukCSi*Ei   s,i
(7) klmWjlkms*uk+kULDjks*ukCDj*JJj s,j
(8) kamXlakms*uk+kULLlks*ukCLl*BLls,l
(9) lm(Xlakms*чaks)+UUkas=Dka(1+f(θfs)) k,a,s
(10) kQijkms*ukCTSijm*BIijm  i,j,m,s
(11) kWjklms*ukCDLjlm*Yjlm j, l,m,s
(12) kXlakms*ukCLAlam*ηlam   l,a,m,s
(13) jmQijkms+ULSiks=ILIiks*Ei    i,k,s
(14) lmWjlkms+ULDjks=ILDjks*JJj*δjks  j,k,s
(15) amXlakms+ULLjks=ILLlks*BLl*lls l,k,s
(16) SSDijm*BIijm*f(1+Rfs)Tmax i,j,m,s
(17) SDLjlm*Yjlm*f(1+Rfs)Tmax j,l,m,s
(18) SLAlam*ηlam*f(1+Rfs)Tmax  l,a,m,s
(19) UFFk=a(DakslmXlakms*PS)  k
(20) lWjlkms iQijkms*δjks   j,k,m,s
(21) aXlakmsjWjlkms*llks   l,k,m,s
Ei, JJj, BLl, BAa, BAa, BIijm, Yjlm,ηjlm {0,1} 
Nonlinear constraints 13, 14 and 15 can be readily transformed into a set of linear constraints. To illustrate, constraint 13 can be expanded into four distinct linear constraints as illustrated below:
(22) jmQijkms+ULSiks=EILIiks  i ,k,s
(23) EILIiksILIiks   i,k,s
(24) EILIiksE(i)*BigM     i,k,s
(25) EILIiksILIiks+(E(i)1)*BigM     i,k,s

4. Solution methodology

This article demonstrates the validation of the proposed model through the presentation and solution of a small example. The results of this validation process are depicted in Figure 3 and Table 5. Following the successful validation, the implementation of the model in a case study concerning the 2021 earthquake in Haiti is discussed and the obtained results are comprehensively analyzed.

4.1 Multiobjective approach

In multiobjective mathematical programming models, multiple objectives with conflicting optimization goals exist. Achieving an optimal solution requires striking a balance between these objectives, which is facilitated by the set of Pareto solutions generated through multiobjective solving methods. In this article, the presented multiobjective model is solved using the epsilon constraint method to address this need for balancing the objectives and obtaining optimal solutions.

4.1.1 Epsilon – Constraint method

Different approaches to dealing with multiobjective mathematical models were considered in the pertinent literature (Lotfi et al., 2023). One of this approach is epsilon-constraint method that is regarded as a conventional and extensively used technique for addressing multiobjective modeling issues. This approach is used in situations which is challenging to obtain a single optimal solution that be able to satisfy all objectives simultaneously (Eslamipirharati et al., 2023). In this method, basic information about the decision-maker’s preferences is needed. In this process, the decision-maker’s priorities are conveyed to the analyzer, who then uses the epsilon-constraint method for solving. The key principle of this method is to optimize the objective function that holds the highest priority for the decision-maker, while treating the remaining objective functions as constraints within their respective limits (Mavrotas, 2009):

(26) {Max Z(x)= [z1(x),z2(x),, zk(x)]s.tgi(x)0,i=1,2,,m
After using the epsilon-constraint method, it becomes:
(27) {Max Zh(x)s.tgi0 i=1,2,,mZj(x)ej , j=1,2,,h1,h+1,,k
The objective functions should be formulated as maximization type, and subsequently transformed into constraints with lower limits (ej). By solving this transformed model iteratively, an efficient solution is obtained. After exploring different lower bounds for these objective functions, a set of Pareto solutions is generated. The epsilon-constraint method follows the solution algorithm outlined below:

Step 1: Obtaining optimal solutions of all the objective functions individually.

Step 2: The optimal point of each objective function, denoted as zi(xk), is substituted into the other objective functions. This process results in the creation of a payoff table (Table 2). Table 2 displays the values of each objective function when the model is optimized based on a single objective function. For instance, Z2(x1) represents the value of the second objective function when the optimal solution of the model is determined by the first objective function:

Also:njZjmj

Step 3: In the range of the objective function, we consider different values for ej and solve the objective function according to them. These values for ej are calculated by the following equation:

(28) ej=nj+[tr1](mjnj)t=0,1,, r1
r = The selection of points within the range of njZjmj.

Some of the advantages of the epsilon-constraint method include:

  • The method is computationally efficient and does not introduce additional variables to the problem.

  • It generates a set of nondominant solutions, enhancing the understanding of the problem.

  • Scaling the different objective functions is not required.

  • The method allows for the control of the number of generated solutions based on the decision-maker’s preferences (Teymoori et al., 2022).

5. Numerical example

In this section, the model is validated through a small-scale numerical example solved using GAMS software. The computations were executed on a computer with a 2.3 GHz central processor and 8 GB of RAM, using the Baron solver for exact solutions. The results of solving this example are presented in Figure 3 as a graphical diagram.

5.1 Small size problem

In this subsection, an example on a small scale is presented to verify the logic of the model. The example involves one supplier, two DRWs, two LDCs and four AAs in the supply chain. Additionally, only transportation Modes 1 and 2 are taken into account for sending relief items between facilities.

Allocated capacities for each facility and costs of unused relief items are presented in Tables 3 and 4, respectively. Moreover, the values of other parameters remain consistent with those outlined in Section 6, ensuring accuracy and reliability across the analysis.

Based on the solutions obtained, Figure 3 illustrates the graphical representation of the total inflow and outflow of relief items for each facility. Also, in Table 5, the amount of unfulfilled demand in each AA (UUkas) is shown.

5.2 Model validation

In this section, the validity of the model is evaluated from the results obtained by solving the model on a small scale. Figure 4 shows the changes of the first objective function due to the increase in transportation time between facilities in the relief process. As anticipated, increasing transportation times during the relief process led to a decrease in the satisfaction level of disaster victims. In another study, Figure 5 illustrates the variations in the second objective function, which encompasses the total economic costs, including establishment costs of aid centers and marginal costs of unused items across each facility. The graph indicates that as costs increase, the second objective function also rises, as expected. Finally, in Figure 6 the impact on the third objective function, representing environmental damage, was examined concerning the escalation of greenhouse gas emissions during the transportation of goods between facilities. As predicted, an increase in pollutant emissions results in an increase in the third objective function.

6. Model implemented: a case study

In the aftermath of a disaster, numerous individuals are directly or indirectly affected, often experiencing severe disruptions to their lives. Given the critical importance of swift action in relief planning, implementing the model in a case study and analyzing the results can significantly contribute to future disaster response planning efforts, mitigating potential damages. In this context, data has been collected from the 2021 earthquake in Haiti to inform the study and draw valuable lessons for more effective relief operations in the future. It should be noted that due to the fact that there is very little and contradictory information about the Haiti earthquake in 2021, there is very little data about this disaster and their values are often different from each other. For this reason, the values of some parameters are considered as an interval with a uniform distribution. Also, since this model was developed based on the implementation of possible future disasters, the only demand parameter is dependent on the data related to that earthquake and the values of other parameters such as parameters related to capacity, establishment costs and the parameters related to pollution have been determined according to field observations, environmental assessments and also past articles such as Nezhadroshan et al. (2021).

6.1 Case study description

The model incorporates data from the 2021 earthquake in the Tibourn Peninsula of Haiti. This earthquake, registering a magnitude of 7.2 on the Richter scale, endured for over 30 s, tragically claiming the lives of at least 1,290 individuals and displacing more than 50,000 people (Sriram et al., 2023). After the earthquake, the region experienced four significant aftershocks. The subsequent section presents the parameters derived from the data collected during the case study.

In the following, the values assigned to the parameters based on the data obtained from the case study are presented. In Table 6, the capacity of each facility that may be used in the supply chain is presented.

Table 7 provides a breakdown of the setup costs associated with each facility. These costs encompass the initial expenses for suppliers and DRWs, as well as the construction costs for LDCs and AAs.

Moving on to Table 8, it displays the quantity of demand for each AA categorized by different types of relief items. It is important to note that due to the inherent uncertainty in the demand quantities, this factor can contribute to generating varying outcomes within the model.

As a result of capacity limitations in transportation modes and facilities at subsequent stages, certain items become unusable and are left in each facility. The disposal of these items incurs costs for the companies involved, which are detailed in Table 9.

Next, the values of other important parameters are shown in Table 10. These parameters encompass the expense associated with transferring each product between different types of facilities, the duration of transportation between said facilities, the capacity of each transportation mode, as well as variables related to the generation of environmental pollution.

6.2 Case study result

In this section, the optimal outcomes of the implemented model on a case study are showcased.

Table 11 presents a comprehensive overview of the quantity of each type of relief items received and dispatched to individual facilities. The transportation of these items is facilitated through various modes of transportation.

Furthermore, the entire process of providing relief and delivering relief items to the AA within this supply chain was successfully accomplished in a total timeframe of 292 h. Additionally, Table 12 provides the objective function values pertaining to each epsilon for all three objectives.

In Figures 7 and 8, a comparative analysis of the objective functions is presented, showcasing their behavior toward each other based on the set of Pareto solutions.

Figures 7 and 8 indicate that the third objective function exhibits an opposite relationship concerning desirability when compared to the two aforementioned objective functions. Improvements in this third objective function correspond to a decline in the objective function associated with social satisfaction and economic costs.

Figure 9 provides a concluding visual representation in the form of a scatter diagram, which effectively demonstrates the intricate interplay between the objective functions. It uses the set of Pareto solutions as a reference point, offering valuable insights into the relationships between these functions and fostering a deeper understanding of their dynamics.

7. Sensitivity analysis

The key parameters of the presented model are primarily the facility capacity-related parameters (CLl, CDj, CSi), the transportation mode capacities (CTSijm, CDLjlm, CLAlam) and the AA demand (Dak). Also, the importance rate of total time (Л) can play an important role. In this section, the impact of the variation of the key parameters within the model on the resulting values of the decision variables and objective functions is examined.

The sensitivity of the ratio of total shortages to the ratio of total demands UUkaDak as influenced by the Л rate is illustrated in Figure 10. It is widely recognized that an increase in the coverage rate of demands occurs when less significance is placed on time.

Figures 11 to 18 illustrate the behavior of the objective functions in response to changes in variables. Figure 11 demonstrates that there is no distinct relationship between increasing or decreasing demand and the first objective function. However, Figure 12 reveals a notable impact of increased demand on the rise of economic costs in the second objective function.

Figures 13 to 15 illustrate how the objective functions are affected by the capacities of various transportation modes. It is evident that a decrease in transportation capacity has a significant and adverse impact on the objective function related to social satisfaction and economic costs. Conversely, once the desired capacity level of a transportation mode is attained, further increases in capacity do not significantly affect the objective functions.

In Figures 16, 17 and 18, the impact of increasing or decreasing facility capacities on the objective functions is demonstrated. It is widely recognized that reducing facility capacity from an optimal level can significantly detriment the satisfaction of disaster victims during the relief process while increasing supply chain costs due to inadequate support. Conversely, enhancing facility capacities improves the performance of the first and second objectives, as depicted in Figure 16. However, as shown, increasing facility capacities ultimately results in greater environmental damage.

Based on the aforementioned sensitivity analysis of the parameters, it can be deduced that the most crucial factors affecting the satisfaction of disaster victims and the costs of the entire supply chain are the parameters associated with facility capacity and transportation capacity. Hence, during the initial setup and equipment allocation stages, it is advisable for managers to prioritize the establishment of facilities with high capacities. This approach will contribute to achieving satisfactory outcomes in the relief process.

8. Discussion and managerial insights

Shakibaei et al. (2023) neglected to address the environmental aspects in their research. Considering the imperative of combating global warming and escalating environmental pollution, it is essential to prioritize environmental considerations in real-life scenarios to proactively prevent man-made disasters. Moreover, Boostani et al. (2021) focused solely on fulfilled demand when evaluating the objective function pertaining to social satisfaction in their study. In contrast, this article acknowledges the pivotal role of relief time as a crucial criterion, among other factors.

From the results of the sensitivity analysis of different parameters of the model, various managerial insights are obtained, which will be expressed in two sections: theoretical managerial insights and practical managerial insights:

8.1 Theoretical managerial insights

  • Based on the results obtained from Figures 13 to 18, it is recommended that the HSC management prioritize the construction of facilities with high capacities because it greatly improves the first and second objective function.

  • Based on the results obtained from Figure 10 and considering the high importance of both unfulfilled demand and relief time factors, the management is expected to be able to achieve a balance between the two. Because neglecting each one to pay attention to the other can have irreparable consequences.

  • According to Figures 13 and 14, the shortage of capacity in different modes of transportation has a very unfavorable effect on the economic and social objective functions. On the other hand, excessive increase in their capacity leads to deterioration of economic and environmental objective functions.

8.2 Practical managerial insights

  • Figures 13 and 14 show the key impact of the capacity of different modes of transportation. In reality, the capacity of a mode of transportation can be increased to a certain extent. So, the management should increase the number of means of transportation in any mode.

  • To guarantee relative success in the relief process, it is recommended that government and management officials build prefabricated facilities and warehouses in the vicinity of disaster-prone areas. This action will put the speed of relief in the event of a disaster at a much higher level.

  • Based on their expertise and experience and according to Figures 17 and 18, managers may pay less attention to environmental consequences in times of crisis. This approach happens due to speeding up the relief process and paying attention to the needs of the victims. Addressing the environmental aspect of sustainability needs to be planned proactively to prepare for potential natural incidents, as attempting to plan and implement environmental measures at the time of an incident is impractical. This article explained how to approach this issue.

  • Managers have the opportunity to seek financial assistance from the public, government or private sector to protect against financial constraints that could disrupt the critical aid process. This proactive approach ensures that relief efforts can proceed unhindered. These aids can be in the form of creating a public aid fund, government aid or requesting a loan from international organizations or other governments.

  • Using nonfossil fuels like electricity for emergency vehicles, establishing recycling facilities in safe zones and consciously choosing the most efficient transportation routes are some of the measures that can help reduce environmental pollution in areas affected by disasters.

9. Conclusion and future study

In conclusion, this article addresses the critical need for an efficient HSC to effectively provide postdisaster relief. By developing an MILP model with three interconnected objectives, the study optimizes the supply chain’s performance across social satisfaction, economic costs and environmental impact. The research combines both available data from the 2021 earthquake in Haiti’s Hispaniola Island and newly generated data to enhance the model’s accuracy. To begin the solution process, the model is first implemented and solved using a small-scale example. Following validation, it is then implemented on a master case. Through a sensitivity analysis on key parameters, valuable management decisions are presented to support supply chain supervisors in making informed decisions. The model’s strength lies in its comprehensive consideration of all dimensions of sustainability, with linear constraints and objective functions facilitating efficient problem-solving time.

Ultimately, the model provides comprehensive insights into the optimal allocation of relief items, determining the necessary transfers between facilities, appropriate vehicles for transportation, timing of relief provision, remaining unused items in each facility and identification of item shortages across AA. By integrating these findings, the HSC can better serve disaster victims in every impacted region.

In future studies, there is an opportunity to expand the scope of the model proposed in this article to incorporate risk management strategies. This would involve considering potential risks within the facilities and fluctuations in key parameters such as demand. Additionally, protocols can be developed to monitor the implementation of social justice principles in the fair distribution of relief services. This can be achieved by incorporating indicators such as the criticality of the victim’s condition, age group, gender and other relevant factors. Including these aspects in the model would further enhance the effectiveness and equity of HSC operations.

Several suggestions for future studies can be made, including:

  • Developing protocols to monitor the implementation of social justice principles in the fair distribution of relief services.

  • Integration of real-time data and advanced technologies.

  • Evaluation of risk in HSCs.

  • Investigating the impact of social and cultural factors on HSC operations.

  • Exploring effective collaboration models and coordination mechanisms among various stakeholders, including government agencies, non governmental organizations, private entities and local communities.

  • Designing training programs and capacity-building initiatives for humanitarian logisticians and supply chain managers.

Figures

Summary of the article structure

Figure 1

Summary of the article structure

Summary of the proposed methodology

Figure 2

Summary of the proposed methodology

Graphic representation of the solved model in the small scale of the supply chain

Figure 3

Graphic representation of the solved model in the small scale of the supply chain

First objective function based on transit time

Figure 4

First objective function based on transit time

Sensitivity analysis of the second objective function based on some costs

Figure 5

Sensitivity analysis of the second objective function based on some costs

Sensitivity analysis of the third objective based on the produced pollutants

Figure 6

Sensitivity analysis of the third objective based on the produced pollutants

Comparative analysis of the first and third objective functions based on the set of Pareto solutions

Figure 7

Comparative analysis of the first and third objective functions based on the set of Pareto solutions

Comparison of the behavior between the 1st and 3rd objective function based on the set of Pareto solutions

Figure 8

Comparison of the behavior between the 1st and 3rd objective function based on the set of Pareto solutions

Scatter diagram based on pareto model solutions

Figure 9

Scatter diagram based on pareto model solutions

Sensitivity analysis of demand rate based on the importance of time

Figure 10

Sensitivity analysis of demand rate based on the importance of time

Sensitivity of the first objective function to the multiplication of demand in AAs

Figure 11

Sensitivity of the first objective function to the multiplication of demand in AAs

Sensitivity of the second objective function to the multiplication of demand in AAs

Figure 12

Sensitivity of the second objective function to the multiplication of demand in AAs

Sensitivity analysis of the first objective function based on the multiplication of capacity of transportation modes

Figure 13

Sensitivity analysis of the first objective function based on the multiplication of capacity of transportation modes

Sensitivity analysis of the second objective function based on the multiplication of capacity of transportation modes

Figure 14

Sensitivity analysis of the second objective function based on the multiplication of capacity of transportation modes

Sensitivity analysis of the third objective function based on the multiplication of capacity of transportation modes

Figure 15

Sensitivity analysis of the third objective function based on the multiplication of capacity of transportation modes

Sensitivity analysis of the first objective function based on facility capacity

Figure 16

Sensitivity analysis of the first objective function based on facility capacity

Sensitivity analysis of the second objective function based on facility capacity

Figure 17

Sensitivity analysis of the second objective function based on facility capacity

Sensitivity analysis of the third objective function based on facility capacity

Figure 18

Sensitivity analysis of the third objective function based on facility capacity

Notations

Sets
I Index of suppliers, i = 1,2, 3, …, I
J Index of DRWs, j = 1,2, 3, …, J
L Index of LDCs, l = 1,2, 3, …., L
A Index of AA, a = 1,2, 3, …, A
S Index of scenarios, s = 1,2,3
F Index of disasters that occur after the main disaster
K Index of relief items, k = 1,2, 3, …, K
M Index of modes of transportation, m = 1, 2, 3, …, M
Parameters
W A large number
CSi The capacity of the i-th supplier
CDj The capacity of the j-th DRW
CLl The capacity of the l-th LDC
CMm Transport capacity by mode m
Cki The total cost of producing each unit of relief item K in supplier i
EDj The establishing cost of the j-th DRW
ELl Establishing the cost of the l-th LDC
ERa The total cost of shelter construction in the a-th affected area
TSDijmk The cost of transporting each unit of product k from the i-th supplier to the j-th DRW by the m mode of transportation
TDLjlmk The cost of transporting each unit of product k from the j-th DRW to the l-th LDC by the m mode of transportation
TLAlamk The cost of transporting each unit of product k from the l-th LDC to the a-th AA by the m mode of transportation
SSDijm The total transportation time from the i-th supplier to the j-th DRW by mode m
SDLjlm The total transportation time from the j-th DRW to the l-th LDC by mode m
SLAlam The total transportation time from the l-th LDC to the a-th AA by mode m
Uk Capacity occupied by each unit of relief items k
CTSijm Transport capacity between supplier i and DRW j in mode m
CDLjlm Transport capacity between DRW j and LDC l in mode m
CLAlam Transport capacity between LDC l and AA a in mode m
δk The importance coefficient of the k-th relief item
Л The coefficient of the importance of the maximum time compared to the obtained demand
UIDjk The cost of each unit of unused k relief item in j-th DRW
UILlk The cost of each unit of unused k relief item in l-th LDC
UIAAk The cost of each unit of unused k relief item in a-th AA
UISik The cost of each unit of unused k relief item in i-th supplier
CSDk The cost of not fulfilling each unit of the demand for k-th relief items
Dak The amount of demand in the AA for the k-th relief item
Ps The probability of scenario s
θfs The rate of the impact that postdisaster f has on people’s demand in s scenario
Rfs The impact rate of postdisaster f on relief time in scenario s
jks Usable (nondestroyed) inventory rate for relief item k in j-th DRW in scenario s
Ɩlks Usable (nondestroyed) inventory rate for relief item k in l-th LDC in scenario s
чaks Usability rate for k-th relief items that have reached a-th affected area (AA) in scenario s
GPki The amount of GHG released to produce each unit of relief item k in each supplier i
GSijkm The amount of GHG released for shipping each unit of relief items k from supplier i to j-th DRW in mode m Transportation
GSjlkm The amount of GHG released for shipping each unit of relief items k from DRW j to l-th LDC in mode m Transportation
GSlakm The amount of GHG released for shipping each unit of relief items k from LDC l to a-th AA in mode m Transportation
Pcjk The amount of GHG caused by the disposal of the k-th relief items in DRW j
Pclk The amount of GHG caused by the disposal of the k-th relief items in LDC l
Pcak The amount of GHG caused by the disposal of the k-th relief items in a-th AA
Variables
Ei 1 for whether the i-th supplier is selected, otherwise 0
JJj 1 for whether the j-th DRW is established, otherwise 0
BLl 1 for whether the l-th LDC is established, otherwise 0
BAa 1 for whether the a-th AA is established, otherwise 0
BIijm 1 if mode m transportation is used between the i-th supplier and the j-th DRW, otherwise 0 under scenario s
Yjlm 1 if mode m transportation is used between the j-th DRW and the l-th LDC, otherwise 0
ηlam 1 if mode m transportation is used between the l-th LDC supplier and the a-th AA, otherwise 0
Qijkms The amount of relief item k that is sent from the i-th supplier to the j-th DRW by mode m transportation in scenario s
Wjlkms The amount of relief item k that is sent from the j-th DRW to the l-th LDC by mode m transportation in scenario s
Xlakms The amount of the k-th relief item delivered by the lth LDC to the a-th AA by mode m transportation in scenario s
UUkas The amount of unsatisfied demand for the k-th relief item in a-th AA in s scenarios
ILIiks The inventory level of k-th item in i-th supplier in scenario s
ILDjks The inventory level of k-th item in j-th DRW in scenario s
ILIlks The inventory level of k-th item in l-th LDC in scenario s
ILAaks The inventory level of k-th item in a-th AA in scenario s
ULDjks Amount of unused k-th relief item in the j-th DRW in scenario s
ULLlks Amount of unused k-th relief item in the l-th LDC in scenario s
ULSiks Amount of unused k-th relief item in the i-th supplier in scenario s
Tmax The maximum optimal time for relief items to reach AA

Source: Table created by authors

Payoff table

Z1(x) Z2(x) Zk(x)
x1 Z1(x1) Z2(x1) Zk(x1)
x2 Z1(x2) Z2(x2) Zk(x2)
xk Z1(xk) Z2(xk) Zk(xk)
Maximum m1 m2 mk
Minimum n1 n2 nk

Source: Table created by authors

Capacity allocated to the facility in the small-scale example

Facility Facility number Capacity
Supplier 1 5,000
DRW 1 2,400
2 2,300
LDC 1 2,000
2 2,000

Source: Table created by authors

Cost of unused relief items in each facility

Facility Relief item index
1 2 3 4 5
Supplier
1 10 10 30 20 20
DRW
1 1 1 3 2 2
2 1 1.5 2 2 2
LDC
1 2 2 5 3.5 4
2 3 1.5 4 2 2.5
AA
1 1 1 3 2 2
2 1 1.5 2 2 2
3 2 1 4 1.5 2
4 1 1 3 2 2

Source: Table created by authors

Amount of shortage of each type of relief items in each affected area

AA a1 a2 a3 a4
Relief item k1 335 366 303 257
k2 69 66 61 240
k3 0 0 0 32
k4 127 388 356 295
k5 9 0 0 0

Source: Table created by authors

Capacity of supply chain facilities

Facility Facility number Capacity
Supplier 1 9,500
2 7,000
DRW 1 4,600
2 4,500
3 4,700
LDC 1 4,500
2 3,400
3 4,400
4 2,000

Source: Table created by authors

Cost of establishing or using the facility

Facility Facility number Establish cost
DRW 1 1,000
2 1,200
3 1,500
LDC 1 700
2 700
3 700
4 500
Shelters in AA All 1,000

Source: Table created by authors

Demand for relief items

Relief item indexAmount of demand for all AAs
1 Uniform (200,400)
2 Uniform (200,250)
3 Uniform (100,140)
4 Uniform (300,400)
5 Uniform (100,130)

Source: Table created by authors

Cost per unit of unused relief items in the facility

Facility Relief item index
1 2 3 4 5
Supplier
1 10 10 30 20 20
2 10 15 20 20 20
DRW
1 1 1 3 2 2
2 1 1.5 2 2 2
3 2 1 4 1.5 2
LDC
1 2 2 5 3.5 4
2 3 1.5 4 2 2.5
3 2 2 3.5 3 3
4 2 2 3.5 3 3
AA
1 1 1 3 2 2
2 1 1.5 2 2 2
3 2 1 4 1.5 2
4 1 1 3 2 2
5 1 1.5 2 2 2
6 2 1 4 1.5 2

Source: Table created by authors

Values of other important parameters

ParameterDistribution functionParameterDistribution function
TSDijmk Uniform (1,3) Pcjk Uniform (11,15)
TDLjlmk Uniform (1,3) Pclk Uniform (10,15)
TLAlamk Uniform (1,3) Pcak Uniform (25,35)
SSDijm Uniform (40,60) PI 0.01
SDLjlm Uniform (40,60) GPki Uniform (5,15)
SLAlam Uniform (40,60) GSijkm Uniform (5,15)
CTSijm Uniform (10,000,14,000) GPjlkm Uniform (5,15)
CDLjlm Uniform (10,000,14,000) GSlakm Uniform (5,15)
CLAlam Uniform (10,000,14,000)

Source: Table created by authors

Amount of relief items received to or sent from each facility

The shipment amount of type k relief items from supplier i to DRW j (Qijkms)
Q111 237 Q124 380 Q223 159
Q112 73 Q132 94 Q224 517
Q113 114 Q133 698 Q232 1273
Q114 36 Q212 35 Q233 25
Q115 425 Q214 1,063 Q234 494
Q121 1,780 Q215 432 Q235 34
Q122 168 Q222 59
The shipment amount of type k relief items from DRW j to LDC l (Wjlk)
W111 171 W145 564 W244 31
W115 87 W211 1,340 W314 344
W121 51 W214 82 W315 18
W122 33 W223 54 W322 976
W123 84 W231 43 W323 468
W124 51 W232 33 W333 37
W125 48 W233 74 W334 80
W134 895 W234 650 W342 88
W135 40 W241 124 W343 116
W142 70 W242 155 W345 14
The shipment amount of type k relief items from l-th LDC to a-th AA (Xlak)
X111 144 X234 46 X353 17
X114 110 X242 143 X354 173
X115 16 X243 88 X363 16
X121 224 X245 5 X364 240
X124 49 X252 144 X411 68
X131 172 X253 17 X412 63
X135 18 X255 14 X415 35
X141 282 X262 153 X421 87
X145 10 X263 91 X422 31
X151 184 X313 20 X425 87
X154 122 X314 255 X432 35
X155 19 X323 17 X435 87
X161 297 X324 279 X442 31
X164 85 X325 18 X443 26
X165 16 X332 35 X444 28
X212 149 X333 20 X445 86
X213 114 X334 218 X451 40
X221 48 X335 19 X452 43
X222 149 X342 30 X453 77
X223 97 X343 20 X455 77
X225 19 X344 253 X461 5
X232 164 X351 40 X462 31
X233 115 X352 19 X465 91

Source: Table created by authors

Set of objective function values for different epsilons

obj1 obj2 obj3
1 725.112 1,222,577 532,731.2
2 765.327 550,692.9 717,731.9
3 741.384 999,985.1 592,369.1
4 741.384 999,985.1 592,369.1
5 459.734 502,3991 163,370.8
6 520.32 4,110,701 220,301.9
7 591.172 3,041,932 282,874.3
8 649.045 2,383,913 354,898.3
9 676.782 1,965,076 400,347.9

Source: Table created by authors

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Acknowledgements

Funding: This research work did not receive funding.

Compliance with ethical standards:

Ethical approval: This paper does not contain any studies with human participants or animals performed by any of the authors.

Conflict of interest: The authors declare that they have no conflict of interest.

Informed consent: Informed consent was not required as no humans or animals were involved.

Corresponding author

Masoud Rabbani can be contacted at: mrabani@ut.ac.ir

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