Abruptness of Cascade Failures in Power Grids

Pahwa, Sakshi; Scoglio, Caterina; Scala, Antonio

doi:10.1038/srep03694

Cited by 153 publications

(139 citation statements)

References 36 publications

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“…Finding network topologies that enhance the stability of power grids has been an active subfield of network theory. Previous studies have typically focused on the structural vulnerability of power grids against external attacks [1][2][3][4][5][6][7] and the cascading spreading of system failure over power grids [6,[8][9][10]. In addition, researchers have studied the relation between topology and dynamics via network synchronization models.…”

Section: Introductionmentioning

confidence: 99%

Building blocks of the basin stability of power grids

2016

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Given a power grid and a transmission (coupling) strength, basin stability is a measure of synchronization stability for individual nodes. Earlier studies have focused on the basin stability's dependence of the position of the nodes in the network for single values of transmission strength. Basin stability grows from zero to one as transmission strength increases, but often in a complex, nonmonotonous way. In this study, we investigate the entire functional form of the basin stability's dependence on transmission strength. To be able to perform a systematic analysis, we restrict ourselves to small networks. We scan all isomorphically distinct networks with an equal number of power producers and consumers of six nodes or less. We find that the shapes of the basin stability fall into a few, rather well-defined classes, that could be characterized by the number of edges and the betweenness of the nodes, whereas other network positional quantities matter less.

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Section: Introductionmentioning

confidence: 99%

Building blocks of the basin stability of power grids

2016

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“…The CN community, including part of the electrical engineering community [91], argue that the CN approach does not aim to reflect the detailed operation of a given grid, but to discover the possible emergence of a systemic or collective behavior, beyond that of its single components. This is supported by a number of high-impact works [86,[92][93][94][95][96][97]. An interesting example of its feasibility is the appearance of synchronization in smart grids [36].…”

Section: Discussion: Is the Cn Approach Useful In Power Grids?mentioning

confidence: 99%

Optimizing the Structure of Distribution Smart Grids with Renewable Generation against Abnormal Conditions: A Complex Networks Approach with Evolutionary Algorithms

et al. 2017

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Abstract:In this work, we describe an approach that allows for optimizing the structure of a smart grid (SG) with renewable energy (RE) generation against abnormal conditions (imbalances between generation and consumption, overloads or failures arising from the inherent SG complexity) by combining the complex network (CN) and evolutionary algorithm (EA) concepts. We propose a novel objective function (to be minimized) that combines cost elements, related to the number of electric cables, and several metrics that quantify properties that are beneficial for SGs (energy exchange at the local scale and high robustness and resilience). The optimized SG structure is obtained by applying an EA in which the chromosome that encodes each potential network (or individual) is the upper triangular matrix of its adjacency matrix. This allows for fully tailoring the crossover and mutation operators. We also propose a domain-specific initial population that includes both small-world and random networks, helping the EA converge quickly. The experimental work points out that the proposed method works well and generates the optimum, synthetic, small-world structure that leads to beneficial properties such as improving both the local energy exchange and the robustness. The optimum structure fulfills a balance between moderate cost and robustness against abnormal conditions. Our approach should be considered as an analysis, planning and decision-making tool to gain insight into smart grid structures so that the low level detailed design is carried out by using electrical engineering techniques.

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“…However, it not only brings considerable economic benefits, but also brings greater uncertainty in grid operation and makes the analysis of operating status and dynamic properties of the power grid more difficult. In recent years, many researchers have paid much attention to analyzing power grids based on the complex network theory [9] in three aspects: to reveal the topology characteristics [10]; to reveal the inherent vulnerabilities and weaknesses [11]; to analyze the mechanism of cascading failures [12]. Since there are relatively few research works on the controllability of power grids, this Letter focuses on this topic according to the controllability research fruits in complex networks.…”

Section: Introductionmentioning

confidence: 99%

The Controllability of Power Grids in Comparison with Classical Complex Network Models

Zhang

Kang

Li³

et al. 2016

IEICE Trans. Inf. & Syst.

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SUMMARYThe controllability of complex networks has attracted increasing attention within various scientific fields. Many power grids are complex networks with some common topological characteristics such as small-world and scale-free features. This Letter investigate the controllability of some real power grids in comparison with classical complex network models with the same number of nodes. Several conclusions are drawn after detailed analyses using several real power grids together with Erdös-Rényi (ER) random networks, Wattz-Strogatz (WS) small-world networks, Barabási-Albert (BA) scale-free networks and configuration model (CM) networks. The main conclusion is that most driver nodes of power grids are hub-free nodes with low nodal degree values of 1 or 2. The controllability of power grids is determined by degree distribution and heterogeneity, and power grids are harder to control than WS networks and CM networks while easier than BA networks. Some power grids are relatively difficult to control because they require a far higher ratio of driver nodes than ER networks, while other power grids are easier to control for they require a driver node ratio less than or equal to ER random networks.

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Abruptness of Cascade Failures in Power Grids

Cited by 153 publications

References 36 publications

Building blocks of the basin stability of power grids

Building blocks of the basin stability of power grids

Optimizing the Structure of Distribution Smart Grids with Renewable Generation against Abnormal Conditions: A Complex Networks Approach with Evolutionary Algorithms

The Controllability of Power Grids in Comparison with Classical Complex Network Models

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