NetworkX
Original author(s) | Aric Hagberg Pieter Swart Dan Schult |
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Developer(s) | Many others |
Initial release | 11 April 2005[1][2] |
Stable release | 3.4.2[3]
/ 21 October 2024 |
Repository | |
Written in | Python |
Operating system | Cross-platform |
Type | Software library |
License | BSD-new license |
Website | networkx |
Part of a series on | ||||
Network science | ||||
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NetworkX is a Python library for studying graphs and networks. NetworkX is free software released under the BSD-new license.
History
[edit]NetworkX began development in 2002 by Aric A. Hagberg, Daniel A. Schult, and Pieter J. Swart.[4] It is supported by the National Nuclear Security Administration of the U.S. Department of Energy at Los Alamos National Laboratory.
The package was crafted with the aim of creating tools to analyze data and intervention strategies for controlling the epidemic spread of disease, while also exploring the structure and dynamics of more general social, biological, and infrastructural systems.[4]
Inspired by Guido van Rossum's 1998 essay on Python graph representation,[5] NetworkX made its public debut at the 2004 SciPy annual conference. In April of 2005, NetworkX was made available as open source software.[1]
Several Python packages focusing on graph theory, including igraph, graph-tool, and numerous others, are available. As of April 2024, NetworkX had over 50 million downloads,[6] surpassing the download count of the second most popular package, igraph, by more than 50-fold.[7] This substantial adoption rate could potentially be attributed to NetworkX's early release and its continued evolution within the SciPy ecosystem.
In 2008, SageMath, an open source mathematics system, incorporated NetworkX into its package and added support for more graphing algorithms and functions.[4]
Version | Release Date | Major Changes |
---|---|---|
0.22 | 17 June 2005
|
Topological sorting for testing directed acyclic graphs (DAGs).
Integration of Dijkstra's algorithm for finding shortest paths in weighted graphs. [8] |
0.99 | 18 November 2008
|
Default graph type transitioned to a weighted graph.
MultiGraph, MultiDiGraph, LabeledGraph, and LabeledDiGraph introduced.[8] |
1.0 | 8 January 2010
|
Addition of difference and intersection operators.
Implementation of the A* algorithm for optimized pathfinding. Incorporation of PageRank, HITS, and [eigenvector] centrality algorithms for network analysis. Integration of Kruskal’s algorithm for constructing minimum spanning trees. [8] |
2.0 | 20 September 2017
|
Significant revisions to the methods within the MultiGraph and DiGraph classes.
Overhaul of documentation system. Various user quality of life changes.[8] |
3.0 | 7 January 2023
|
Improved integrations to SciPy ecosystem packages.
Added new plugin feature to allow users to use different backends (GraphBLAS, CuGraph) for computation. [9] |
Features
[edit]- Classes for graphs and digraphs.
- Conversion of graphs to and from several formats.
- Ability to construct random graphs or construct them incrementally.
- Ability to find subgraphs, cliques, k-cores.
- Explore adjacency, degree, diameter, radius, center, betweenness, etc.
- Draw networks in 2D and 3D.
Supported Graph Types
[edit]Overview
[edit]Graphs, in this context, represent collections of vertices (nodes) and edges (connections) between them. NetworkX provides support for several types of graphs, each suited for different applications and scenarios.
Directed Graphs (DiGraph)
[edit]Directed graphs, or DiGraphs, consist of nodes connected by directed edges. In a directed graph, edges have a direction indicating the flow or relationship between nodes. [10]
Undirected Graphs (Graph)
[edit]Undirected graphs, simply referred to as graphs in NetworkX, are graphs where edges have no inherent direction. The connections between nodes are symmetrical, meaning if node A is connected to node B, then node B is also connected to node A. [11]
MultiGraphs
[edit]MultiGraphs allow multiple edges between the same pair of nodes. In other words, MultiGraphs permit parallel edges, where more than one edge can exist between two nodes. [12]
MultiDiGraphs
[edit]MultiDiGraphs are directed graphs that allow multiple directed edges between the same pair of nodes. Similar to MultiGraphs, MultiDiGraphs enable the modeling of scenarios where multiple directed relationships exist between nodes. [13]
Challenges in Visualization
[edit]While NetworkX provides powerful tools for graph creation and analysis, producing visualizations of complex graphs can be challenging. Visualizing large or densely connected graphs may require specialized techniques and external libraries beyond the capabilities of NetworkX alone.
Graph Layouts
[edit]NetworkX provides various layout algorithms for visualizing graphs in two-dimensional space. These layout algorithms determine the positions of nodes and edges in a graph visualization, aiming to reveal its structure and relationships effectively.
Spring Layout
[edit]The Spring layout is a force-directed layout algorithm inspired by physical systems. It simulates the attraction and repulsion forces between nodes, treating edges as springs and nodes as charged particles. This results in a layout where nodes with strong connections are placed closer together, while nodes with weaker connections are pushed farther apart.[14]
Spectral Layout
[edit]The Spectral layout is based on the spectral properties of the graph's adjacency matrix. It uses the eigenvalues and eigenvectors of the adjacency matrix to position nodes in a low-dimensional space. Spectral layout tends to emphasize the global structure of the graph, making it useful for identifying clusters and communities.[15]
Circular Layout
[edit]The Circular layout arranges nodes evenly around a circle, with edges drawn as straight lines connecting them. This layout is particularly suitable for visualizing cyclic or symmetric graphs, where the arrangement of nodes along the circle reflects the underlying topology of the graph.[16]
Shell Layout
[edit]The Shell layout organizes nodes into concentric circles or shells based on their distance from a specified center. Nodes within the same shell have the same distance from the center, while edges are drawn radially between nodes in adjacent shells. Shell layout is often used for visualizing hierarchical or tree structures.[17]
Kamada-Kawai Layout
[edit]The Kamada-Kawai layout algorithm positions nodes based on their pairwise distances, aiming to minimize the total energy of the system. It takes into account both the graph's topology and edge lengths, resulting in a layout that emphasizes geometric accuracy and readability.[18]
Usage
[edit]NetworkX provides functions for applying different layout algorithms to graphs and visualizing the results using Matplotlib or other plotting libraries. Users can specify the desired layout algorithm when calling the drawing functions, allowing for flexible and customizable graph visualizations.
Suitability
[edit]NetworkX is suitable for operation on large real-world graphs: e.g., graphs in excess of 10 million nodes and 100 million edges.[clarification needed][19] Due to its dependence on a pure-Python "dictionary of dictionary" data structure, NetworkX is a reasonably efficient, very scalable, highly portable framework for network and social network analysis.[4]
Applications
[edit]NetworkX was designed to be easy to use and learn, as well as a powerful and sophisticated tool for network analysis. It is used widely on many levels, ranging from computer science and data analysis education to large-scale scientific studies.[4]
NetworkX has applications in any field that studies data as graphs or networks, such as mathematics, physics, biology, computer science and social science.[20] The nodes in a NetworkX graph can be specialized to hold any data, and the data stored in edges is arbitrary, further making it widely applicable to different fields. It is able to read in networks from data and randomly generate networks with specified qualities. This allows it to be used to explore changes across wide amounts of networks.[4] The figure below demonstrates a simple example of the software's ability to create and modify variations across large amounts of networks.
NetworkX has many network and graph analysis algorithms, aiding in a wide array of data analysis purposes. One important example of this is its various options for shortest path algorithms. The following algorithms are included in NetworkX, with time complexities given the number of vertices (V) and edges (E) in the graph:[21]
- Dijkstra: O((V+E) log V)
- Bellman-Ford: O(V * E)
- Goldberg-Radzik: O(V * E)
- Johnson: O(V^2 log(V) + VE)
- Floyd Warshall: O(V^3)
- A*: O((V+E) log V)
An example of the use of NetworkX graph algorithms can be seen in a 2018 study, in which it was used to analyze the resilience of livestock production networks to the spread of epidemics. The study used a computer model to predict and study trends in epidemics throughout American hog production networks, taking into account all livestock industry roles. In the study, NetworkX was used to find information on degree, shortest paths, clustering, and k-cores as the model introduced infections and simulated their spread. This was then used to determine which networks are most susceptible to epidemics.[22]
In addition to network creation and analysis, NetworkX also has many visualization capabilities. It provides hooks into Matplotlib and GraphViz for 2D visuals, and VTK and UbiGraph for 3D visuals.[4] This makes the package useful in easily demonstrating and reporting network analysis and data, and allows for the simplification of networks for visual processing.
Integration
[edit]NetworkX is integrated into SageMath.[23]
See also
[edit]References
[edit]- ^ a b NetworkX first public release (NX-0.2), From: Aric Hagberg, Date: 12 April 2005, Python-announce-list mailing list
- ^ NetworkX initial release, NX-0.2, hagberg – 2005-04-11, Project Info – NetworkX, Registered: 2004-10-21, SourceForge.net
- ^ "Release 3.4.2". 21 October 2024. Retrieved 22 October 2024.
- ^ a b c d e f g Aric A. Hagberg, Daniel A. Schult, Pieter J. Swart, Exploring Network Structure, Dynamics, and Function using NetworkX, Proceedings of the 7th Python in Science conference (SciPy 2008), G. Varoquaux, T. Vaught, J. Millman (Eds.), pp. 11–15.
- ^ van Rossum, Guido (February 1998). "Python Patterns - Implementing Graphs". Python.
- ^ "networkx". PyPi Statistics. April 2024.
- ^ "igraph". PyPi Statistics. April 2024.
- ^ a b c d "Old Release Log". NetworkX. 22 August 2020. Retrieved 24 April 2024.
- ^ "NetworkX 3.0". NetworkX. 7 January 2023. Retrieved 24 April 2024.
- ^ "DiGraph—Directed graphs with self loops — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-04-24.
- ^ "Graph—Undirected graphs with self loops — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-04-24.
- ^ "MultiGraph—Undirected graphs with self loops and parallel edges — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-04-24.
- ^ "MultiDiGraph—Directed graphs with self loops and parallel edges — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-04-24.
- ^ "spring_layout — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-05-02.
- ^ "spectral_layout — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-05-02.
- ^ "circular_layout — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-05-02.
- ^ "shell_layout — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-05-02.
- ^ "kamada_kawai_layout — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-05-02.
- ^ Aric Hagberg, Drew Conway, "Hacking social networks using the Python programming language (Module II – Why do SNA in NetworkX)", Sunbelt 2010: International Network for Social Network Analysis.
- ^ Hadaj, P.; Strzałka, D.; Nowak, M. (19 October 2022). "The use of PLANS and NetworkX in modeling power grid system failures". Sci Rep. 12 (1): 17445. doi:10.1038/s41598-022-22268-z. PMC 9581963. PMID 36261496.
- ^ "Shortest Paths — NetworkX 3.3 documentation". networkx.org. Retrieved 2024-04-29.
- ^ Wiltshire, Serge W. (March 9, 2018). "Using an agent-based model to evaluate the effect of producer specialization on the epidemiological resilience of livestock production networks". PLOS ONE. 13 (3): e0194013. doi:10.1371/journal.pone.0194013. PMC 5844541. PMID 29522574.
- ^ "SageMath Mathematical Software System - Sage".