Electric grids originated in the late 19th century as small-scale, primitive, and isolated town-based networks (Grid 1.0). However, driven by a growing reliance on electric power and a substantial surge in energy demand, electric grids evolved into national, large-scale centralized power grids centered around significant power plants (Grid 2.0). A new transformation occurred in less than a century, spurred by the imperative to decarbonize the energy sector. This shift, driven by the increasing integration of renewable energy (RE) systems and DERs, led to a decentralized topology (Grid 3.0).
2. Centralized vs. Decentralized Electric Grid Resilience
Electric grid operators globally face a persistent challenge posed by natural, non-natural, predictable, and unpredictable factors. These elements can compromise the flexibility and reliability of the grid [
8]. Incidents like extreme weather conditions, geodesic events, wildfires, acts of war, and cyberattacks constitute genuine threats to the electric grid’s reliability. Consequently, there has been an increasing interest in recent research on electric grid resilience. However, a notable majority of these studies in the energy sector concentrate on centralized grids.
The initial phase in comprehending the issue of electric grid resilience involves defining it and establishing a framework. Article [
9] delves into various terminologies related to grid resilience, presenting a comprehensive framework that defines the concept and explores diverse quantitative metrics and approaches for evaluating grid resilience. In [
10], Liu et al. formulate a resilience assessment framework to design more resilient transmission lines, especially in the face of extreme weather events. Meanwhile, Jasiunas et al. [
11] reviewed energy grid resilience and proposed a framework for mapping potential threats. To understand threats and vulnerabilities that compromise electric grid resilience, Sakshi et al. [
12] define microgrid resilience, conducting an in-depth analysis of threats, vulnerabilities, and mitigation techniques. Furthermore, Nguyen et al. [
13] surveyed the vulnerabilities of modern electric grids to cyber-attacks.
Addressing resilience strategies, ref. [
14] introduces a multi-stage stochastic robust optimization model to enhance the management of distribution network resilience. The works presented in [
15,
16] comprehensively review recently adopted strategies to bolster grid resilience. In grid resilience, a central challenge lies in determining how to measure resilience and identifying the relevant metrics. In [
17], Das et al. provide an in-depth exploration of the metrics for a resilient grid and the challenges and limitations involved in formulating and calculating these metrics. The study in [
18] also delves into metrics that enable quantifying energy grid resilience, offering insights into proposed enhancement techniques.
Recent research also delves into electric grid resilience’s regulatory and socio-economic dimensions, recognizing their pivotal roles. Regulations are instrumental in ensuring and enhancing grid resilience, providing a framework for utilities, operators, and stakeholders to manage, maintain, and upgrade grid infrastructure to withstand diverse challenges and disruptions. Article [
19] examines federal regulations related to a resilient electric grid in the United States of America. From a complementary perspective, the active involvement of prosumers in energy production, consumption, and management diversifies grid resources, enhances flexibility, and contributes to overall improvements in electric grid resilience. The significance of the active role of prosumers in operating a modern electric grid is highlighted in the study presented in [
20].
The currently applied metrics for grid resilience measurement are indices such as the System Average Interruption Duration Index (SAIDI) and the System Average Interruption Frequency Index (SAIFI), which measure the frequency and duration of outages experienced by customers over a specific period. Nevertheless, these metrics can only be calculated once incidents have occurred. Another method to simulate the grid’s resilience is to use computer simulation techniques such as dynamic system simulation models. These models simulate the transient behavior of the grid, including the response to sudden changes such as equipment failures, disturbances, or switching events. This technique helps to assess the grid’s stability, reliability, and response under various dynamic conditions. However, dynamic system simulation models can be highly complex, requiring detailed data on grid topology, equipment characteristics, control systems, and operating conditions. They may require significant computational resources, high-performance computing infrastructure, and long computation times, especially for large-scale grids with numerous components and complex interactions. Another used technique is Monte Carlo simulation. This technique involves running multiple simulations with randomly generated input parameters to assess the probabilistic behavior of the grid. It helps to evaluate the likelihood and impact of different events, such as extreme weather events, equipment failures, or cyberattacks, on grid resilience. Yet, Monte Carlo simulation involves running many iterations to simulate the probabilistic behavior of the grid under different scenarios. This also requires significant computational resources and time, especially for complex grid models or when simulating rare or extreme events. Also, this simulation relies on accurate and representative input data, including probability distributions for different parameters such as weather conditions, equipment failures, and demand patterns. Obtaining and validating these data can be challenging, and data uncertainties or inaccuracies can affect simulation results. Running Monte Carlo simulation also requires computational resources and expertise in statistical analysis, simulation techniques, and grid modeling. Small utilities or organizations with limited resources may struggle to implement Monte Carlo simulation effectively without access to specialized software, personnel, or external support. Therefore, the methodology proposed in this article for simulating the grid’s resilience uses a simple mathematical model that does not require significant computational resources, unique expertise, or minimal simulation time.
On the other side of the spectrum, grid interruptions, such as power outages, can have profound and multifaceted impacts on the economy, affecting consumers and various sectors. This impact is elucidated in [
21], where a dynamic inoperability input–output model (DIIM), combined with a customer interruption cost (CIC) model, is employed to assess the economic consequences of power interruptions. Likewise, the IIM has found applications in various economic analyses related to unexpected events and perturbations. In [
22], Xu et al. introduced a dynamic IIM to simulate economic sector dynamics during emergencies, specifically when facing value-added perturbations or interruptions. Another instance is found in [
23], where Jin et al. utilized the IIM to analyze the economic impact of COVID-19 in Shanghai. However, the utility of the inoperability input–output model extends beyond economic analysis. Numerous researchers have employed Leontief’s input–output model to model and analyze the resilience of infrastructures and networks. For instance, in [
24], Jia et al. applied the IIM to analyze the effects of disturbances, such as droughts, earthquakes, and terrorist attacks, on water systems in industrial parks.
Similarly, ref. [
25] employed the IIM to analyze cascading effects induced by critical infrastructure dependencies. Nevertheless, much of the research on electric grid resilience primarily focuses on the traditional centralized electric grid as a fundamental model. While many articles underscore the significance of DERs in enhancing grid resilience, a detailed exploration of measuring this resilience with associated metrics is often lacking. Drawing from definitions, frameworks, and measurement metrics established for electric grid resilience and inspired by the application of the inoperability Input–output (IIO) model in similar contexts, this article proposes a comparative analysis between centralized and decentralized electric grids in terms of resilience. The objective is to quantify the importance of DERs in improving grid resilience and mitigating its vulnerability to unexpected perturbations and interruptions.
3. Leontief’s Input–Output Model
Leontief’s IO model, developed by Nobel laureate economist Wassily Leontief in the 1930s, is a quantitative economic technique that analyzes inter-industry relationships
within an economy. This model examines dependencies between different sectors or industries, tracking the flow of goods and services among them. Represented in matrix
format, it assesses how much output one industry requires from another to produce its own output. The model is crucial for understanding the ripple effects of changes in one
sector on others within the economy, providing insights into potential impacts resulting from alterations in production, consumption, investments, or external shocks such as policy
changes or disasters. Widely used in economics, Leontief’s model is particularly valuable for studying regional economics, international trade, economic planning, and forecasting.
Its application aids policymakers in making well-informed decisions by revealing complex interdependencies within an economy.
The main idea behind Leontief’s IO model is to create a matrix of interdependency between different economic industries by using the items purchased as inputs and the sales
as outputs. In other words, this model represents the economy as a matrix of transactions between sectors, where each element of the matrix represents the amount of goods or services purchased from one sector by another. So, if we consider the model presented in Table 1, showing two industries X1 and X2, then:
• x11: Proportion produced by X1 and consumed by X1
• x12: Proportion produced by X2 and consumed by X1
• x21: Proportion produced by X1 and consumed by X2
• x22: Proportion produced by X2 and consumed by X2
Table 1. Leontief’s IO matrix.
Industry |
X1 |
X2 |
X1 |
x11 |
x12 |
X2 |
x21 |
x22 |
The following equation can present the above model:
X = A.X (1)
where A is the input–output matrix.
However, the above model represents Leontief’s closed model, wherein all production is assumed to be consumed by various entities within the economic group under study.
Certain products may be exported to entities outside the studied industries. In such cases, the model is referred to as Leontief’s open model, and the following equation represents it:
X = A.X + D (2)
where D is the external demand vector.
In the context of Leontief’s input–output model, the supply and demand sides represent distinct aspects of economic activity analyzed by the model. The supply side focuses
on producing or supplying goods and services by various industries or sectors within an economy. It examines how different sectors generate output, including the goods and
services they contribute as inputs to other sectors. This side of the model traces the flow of goods and services from industries to final consumption or intermediate use.
Conversely, the demand side in the input–output model scrutinizes the consumption or demand for goods and services from various sectors or industries. It centers on how
different sectors utilize or demand these goods and services, encompassing households, businesses, government, and exports. The demand side tracks how final consumers and
intermediate users stimulate the demand for goods and services produced by different industries.
Leontief’s input–output model interconnects the supply and demand sides, enabling the analysis of interdependencies and linkages between sectors on both fronts. It illustrates
how changes in one sector’s output or demand can impact other economic sectors. Such understanding is crucial for economic planning, policymaking, and forecasting, offering
insights into the interactions between production and consumption activities across the economy. The versatility of Leontief’s IO model finds application in various fields:
1. Economic Analysis: It aids in understanding an economy’s structure by quantifying relationships between different sectors, helping to predict the effects of changes in
one sector on others and the overall economy [26].
2. Policy Planning: Governments and policymakers use input–output analysis to assess the potential impact of policy changes, such as alterations in taxation, investments, or
subsidies, on different sectors and the economy [27].
3. Regional Development: The model is valuable for assessing regional economies, identifying key sectors, and planning strategies for regional development by understanding
economic linkages among various industries [28].
4. Supply Chain Management: The input–output model optimizes supply chains in the business sector, identifying dependencies and potential vulnerabilities [29].
5. Environmental Analysis: The model is adaptable to assessing environmental impacts by tracing resource use, energy consumption, and pollution across sectors, aiding in
sustainability assessments and policy formulation [30].
6. Trade Analysis: It aids in understanding trade patterns, dependencies on imports/ exports, and the effects of international trade on domestic industries [31].
One of the main characteristics of the electric grid is the complex interdependency between its nodes. Therefore, an interruption on any bus or transmission line can create a
ripple effect in the grid and affect other parts. Hence, a mathematical model is needed to simulate the interdependent relationships between the different elements of an electric grid
and calculate the ripple resulting from any interruption on any node. Leontief’s IO model is a quantitative tool that allows for rigorous analysis of interdependent relationships and
dynamics, such as the one between the nodes of an electric grid. The proposed model uses the power flow between buses as exchanged goods, which permits the development of
interdependencies between all buses of a grid and quantifies the impacts of interruptions or outside impacts on any part of the grid.
Consequently, Leontief’s IO model can be beneficial for analyzing grid resilience due to its ability to capture these interdependencies between nodes and identify critical
ones within the grid. The IO model quantifies the relationships between different grid nodes, showing how changes on one bus or transmission line can affect others through
input–output linkages. This is crucial for understanding the ripple effects of disruptions within the grid, such as power outages or infrastructure failures. Henceforth, the model
proposed in this article represents a simple mathematical model that simulates the electric grid’s resilience under different scenarios without the need for complex models, significant
computational resources, or unique expertise outside the electric field.
4. Modelling and Numerical Study
Leontief’s IIM is developed to quantify the impact of decentralization on the electric grid’s resilience. This model calculates the inoperability of the grid following a disturbance,
interruption, or perturbation, utilizing Leontief’s open-loop, supply-side IO model. In the power grid, nodes are interconnected, with each node potentially housing a power ggenerator (considered a manufactured product), a connected load (representing the proportion produced by the node and consumed locally), and power transmitted from one node to another. This framework captures the interdependent relationship between nodes in an electric grid.
The open-loop model was employed to evaluate the reduction in power supplied to each load connected to the grid during a disturbance, treating the loads connected to each
node as an external demand vector. The following relation defines the normalized power loss in this scenario:
𝑁𝑜𝑟𝑚𝑎𝑙𝑖𝑧𝑒𝑑 𝑝𝑜𝑤𝑒𝑟 𝑙𝑜𝑠𝑠 = (𝐵𝑒𝑓𝑜𝑟𝑒 𝑑𝑖𝑠𝑡𝑢𝑟𝑏𝑎𝑛𝑐𝑒 𝑝𝑜𝑤𝑒𝑟 𝑜𝑢𝑡𝑝𝑢𝑡 − 𝑑𝑒𝑔𝑟𝑎𝑑𝑒𝑑 𝑝𝑜𝑤𝑒𝑟 𝑜𝑢𝑡𝑝𝑢𝑡)/𝐵𝑒𝑓𝑜𝑟𝑒 𝑑𝑖𝑠𝑡𝑢𝑟𝑏𝑎𝑛𝑐𝑒 𝑝𝑜𝑤𝑒𝑟 𝑜𝑢𝑡𝑝𝑢𝑡
Thus, we leverage this analogy to construct an IIM based on the power transmitted between nodes, the power generated at each node, and the loads connected to each node.
The formulated electric grid inoperability input–output model is presented in Equation (3):
𝑿 = 𝑨. 𝑿 + 𝑫 (3)
where:
A: Interdependence Matrix
I: Identity matrix
D: Power supplied to the load connected to each bus (demand vector)
Since the interdependence matrix defines the portion produced by the ith node and consumed by the jth node, this can be translated in the case of the power grid as the power
transmitted from the ith bus to the jth bus. Therefore, the interdependence matrix is given by Equation (4):
𝒂𝒊𝒋 = 𝐒𝒊𝒋/ 𝑺𝒋 (4)
where:
𝑺𝒊𝒋: Power transmitted from node i to node j.
𝑺𝒋: Power of node j.
And since the load consumed by the ith bus itself is considered as an external demand, then:
𝒂𝒊𝒊 = 𝟎 (5)
I