This python
package is designed for multiscale community detection with Markov Stability (MS) analysis [1, 2] and allows researchers to identify robust network partitions at different resolutions. It implements several variants of the MS cost functions that are based on graph diffusion processes to explore the network (see illustration below). Whilst primarily built for MS, the internal architecture of PyGenStability has been designed to solve for a wide range of clustering cost functions since it is based on optimising the so-called generalized Markov Stability function [3]. To maximize the generalized Markov Stability cost function, PyGenStability provides a convenient python
interface for C++
implementations of Louvain [4] and Leiden [5] algorithms.
We further provide specific analysis tools to process and analyse the results from multiscale community detection, and to facilitate the automatic selection of robust partitions [6]. PyGenStability is accompanied by a software paper that further details the implementation, result analysis, benchmarks and applications [7].
A documentation of all features of the PyGenStability package is available here: https://barahona-research-group.github.io/PyGenStability/, or in pdf here.
You can install the package using pypi:
pip install pygenstability
Using a fresh python3 virtual environment, e.g. conda, may be recommended to avoid conflicts with other python packages.
By default, the package uses the Louvain algorithm [4] for optimizing generalized Markov Stability. To use the Leiden algorithm [5], install this package with:
pip install pygenstability[leiden]
To plot network partitions using networkx
, install this package with:
pip install pygenstability[networkx]
To use plotly
for interactive plots in the browser, install this package with:
pip install pygenstability[plotly]
To install all dependencies, run:
pip install pygenstability[all]
You can also install the source code of this package from GitHub directly by first cloning this repo with:
git clone --recurse-submodules https://github.com/ImperialCollegeLondon/PyGenStability.git
(if the --recurse-submodules
has not been used, just do git submodule update --init --recursive
to fetch the submodule with M. Schaub's code).
The wrapper for the submodule uses Pybind11 https://github.com/pybind/pybind11 and, to install the package, simply run (within the PyGenStability
directory):
pip install .
using a fresh python3 virtual environment to avoid conflicts. Similar to above, you can also specify additional dependencies, e.g. to install the package with networkx
run:
pip install .[networkx]
The code is simple to run with the default settings. We can input our graph (of type scipy.csgraph), run a scan in scales with a chosen Markov Stability constructor and plot the results in a summary figure presenting different partition quality measures across scales (values of MS cost function, number of communities, etc.) with an indication of optimal scales.
import pygenstability as pgs
results = pgs.run(graph)
pgs.plot_scan(results)
Although it is enforced in the code, it is advised to set environment variables
export OPENBLAS_NUM_THREADS=1
export OMP_NUM_THREADS=1
export NUMEXPR_MAX_THREADS=1
to ensure numpy does not use multi-threadings, which may clash with the parallelisation and slow down the computation.
There are a variety of further choices that users can make that will impact the partitioning, including:
- Constructor: Generalized Markov Stability requires the user to input a quality matrix and associated null models. We provide an object-oriented module to write user-defined constructors for these objects, with several already implemented (see
pygenstability/constructors.py
for some classic examples). - Generalized Markov Stability maximizers: To maximize the NP-hard optimal generalized Markov Stability we interface with two algorithms: (i) Louvain and (ii) Leiden.
While Louvain is defined as the default due to its familiarity within the research community, Leiden is known to produce better partitions and can be used by specifying the run function.
results = pgs.run(graph, method="leiden")
There are also additional post-processing and analysis functions, including:
- Plotting via matplotlib and plotly (interactive).
- Automated optimal scale selection.
Optimal scale selection [6] is performed by default with the run function but can be repeated with different parameters if needed, see pygenstability/optimal_scales.py
. To reduce noise, e.g., one can increase the parameter values for block_size
and window_size
. The optimal network partitions can then be plotted given a NetworkX nx_graph.
results = pgs.identify_optimal_scales(results, kernel_size=10, window_size=5)
pgs.plot_optimal_partitions(nx_graph, results)
We provide an object-oriented module for constructing quality matrices and null models in pygenstability/constructors.py
. Various constructors are implemented for different types of graphs:
linearized
based on linearized MS for large undirected weighted graphs [2]continuous_combinatorial
based on combinatorial Laplacian for undirected weighted graphs [2]continuous_normalized
based on random-walk normalized Laplacians for undirected weighted graphs [2]signed_modularity
based on signed modularity for large signed graphs [8]signed_combinatorial
based on signed combinatorial Laplacian for signed graphs [3]directed
based on random-walk Laplacian with teleportation for directed weighted graphs [2]linearized_directed
based on random-walk Laplacian with teleportation for large directed weighted graphs
For the computationally efficient analysis of large graphs, we recommend using the linearized
, linearized_directed
or signed_modularity
constructors instead of continuous_combinatorial
, continuous_normalized
, directed
or signed_combinatorial
that rely on the computation of matrix exponentials.
For those of you that wish to implement their own constructor, you will need to design a function with the following properties:
- take a scipy.csgraph
graph
and a floattime
as argument - return a
quality_matrix
(sparse scipy matrix) and anull_model
(multiples of two, in a numpy array)
PyGenStability can also be used to perform multiscale graph-based data clustering on data that comes in the form of a sample-by-feature matrix. This approach was shown to achieve better performance than other popular clustering methods without the need of setting the number of clusters externally [9].
We provide an easy-to-use interface in our pygenstability.data_clustering.py
module. Given a sample-by-feature matrix X
, one can apply graph-based data clustering as follows:
clustering = pgs.DataClustering(
graph_method="cknn-mst",
k=5,
constructor="continuous_normalized")
# apply graph-based data clustering to X
results = clustering.fit(X)
# identify optimal scales and plot scan
clustering.scale_selection(kernel_size=0.2)
clustering.plot_scan()
We currently support graph_method
) augmented with the minimum spanning tree to guarentee connectivity, where k
refers to the number of neighbours considered in the construction. See documentation for a list of all parameters. All functionalities of PyGenStability including plotting and scale selection are also available for data clustering. For example, given two-dimensional coordinates of the data points one can plot the optimal partitions directly:
# plot robust partitions
clustering.plot_robust_partitions(x_coord=x_coord,y_coord=y_coord)
- Alexis Arnaudon, GitHub:
arnaudon <https://github.com/arnaudon>
- Robert Peach, GitHub:
peach-lucien <https://github.com/peach-lucien>
- Dominik Schindler, GitHub:
d-schindler <https://github.com/d-schindler>
We always look out for individuals that are interested in contributing to this open-source project. Even if you are just using PyGenStability and made some minor updates, we would be interested in your input.
Please cite our paper if you use this code in your own work:
@article{pygenstability,
author = {Arnaudon, Alexis and Schindler, Dominik J. and Peach, Robert L. and Gosztolai, Adam and Hodges, Maxwell and Schaub, Michael T. and Barahona, Mauricio},
title = {Algorithm 1044: PyGenStability, a Multiscale Community Detection Framework with Generalized Markov Stability},
journal = {ACM Trans. Math. Softw.},
volume = {50},
number = {2},
pages = {15:1–15:8}
year = {2024},
doi = {10.1145/3651225}
}
The original paper for Markov Stability can also be cited as:
@article{delvenne2010stability,
title={Stability of graph communities across time scales},
author={Delvenne, J-C and Yaliraki, Sophia N and Barahona, Mauricio},
journal={Proceedings of the National Academy of Sciences},
volume={107},
number={29},
pages={12755--12760},
year={2010},
publisher={National Acad Sciences}
}
In the example
folder, a demo script with a stochastic block model can be tried with
python simple_example.py
or using the click app:
./run_simple_example.sh
Other examples can be found as jupyter-notebooks in the examples/
directory, including:
- Example 1: Undirected SBM
- Example 2: Multiscale SBM
- Example 3: Directed networks
- Example 4: Custom constructors
- Example 5: Hypergraphs
- Example 6: Signed networks
- Example 7: Graph-based data clustering
Finally, we provide applications to real-world networks in the examples/real_examples/
directory, including:
- Power grid network
- Protein structures
If you are interested in trying our other packages, see the below list:
- GDR : Graph diffusion reclassification. A methodology for node classification using graph semi-supervised learning.
- hcga : Highly comparative graph analysis. A graph analysis toolbox that performs massive feature extraction from a set of graphs, and applies supervised classification methods.
- MSC : MultiScale Centrality: A scale-dependent metric of node centrality.
- DynGDim : Dynamic Graph Dimension: Computing the relative, local and global dimension of complex networks.
- RMST : Relaxed Minimum Spanning Tree: Computing the relaxed minimum spanning tree to sparsify networks whilst retaining dynamic structure.
- StEP : Spatial-temporal Epidemiological Proximity: Characterising contact in disease outbreaks via a network model of spatial-temporal proximity.
[1] J.-C. Delvenne, S. N. Yaliraki, and M. Barahona, 'Stability of graph communities across time scales', Proceedings of the National Academy of Sciences, vol. 107, no. 29, pp. 12755–12760, Jul. 2010, doi: 10.1073/pnas.0903215107.
[2] R. Lambiotte, J.-C. Delvenne, and M. Barahona, 'Random Walks, Markov Processes and the Multiscale Modular Organization of Complex Networks', IEEE Trans. Netw. Sci. Eng., vol. 1, no. 2, pp. 76–90, Jul. 2014, doi: 10.1109/TNSE.2015.2391998.
[3] M. T. Schaub, J.-C. Delvenne, R. Lambiotte, and M. Barahona, 'Multiscale dynamical embeddings of complex networks', Phys. Rev. E, vol. 99, no. 6, Jun. 2019, doi: 10.1103/PhysRevE.99.062308.
[4] V. D. Blondel, J.-L. Guillaume, R. Lambiotte, and E. Lefebvre, 'Fast unfolding of communities in large networks', J. Stat. Mech., vol. 2008, no. 10, Oct. 2008, doi: 10.1088/1742-5468/2008/10/p10008.
[5] V. A. Traag, L. Waltman, and N. J. van Eck, 'From Louvain to Leiden: guaranteeing well-connected communities', Sci Rep, vol. 9, no. 1, p. 5233, Mar. 2019, doi: 10.1038/s41598-019-41695-z.
[6] D. J. Schindler, J. Clarke, and M. Barahona, 'Multiscale Mobility Patterns and the Restriction of Human Movement', Royal Society Open Science, vol. 10, no. 10, p. 230405, Oct. 2023, doi: 10.1098/rsos.230405.
[7] A. Arnaudon, D. J. Schindler, R. L. Peach, A. Gosztolai, M. Hodges, M. T. Schaub, and M. Barahona, 'Algorithm 1044: PyGenStability, a Multiscale Community Detection Framework with Generalized Markov Stability', ACM Trans. Math. Softw., vol. 50, no. 2, p. 15:1–15:8, Jun. 2024, doi: 10.1145/3651225.
[8] S. Gomez, P. Jensen, and A. Arenas, 'Analysis of community structure in networks of correlated data'. Physical Review E, vol. 80, no. 1, p. 016114, Jul. 2009, doi: 10.1103/PhysRevE.80.016114.
[9] Z. Liu and M. Barahona, 'Graph-based data clustering via multiscale community detection', Applied Network Science, vol. 5, no. 1, p. 3, Dec. 2020, doi: 10.1007/s41109-019-0248-7.
[10] T. Berry and T. Sauer, 'Consistent manifold representation for topological data analysis', Foundations of Data Science, vol. 1, no. 1, p. 1-38, Feb. 2019, doi: 10.3934/fods.2019001.
This program is free software: you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation, either version 3 of the License, or (at your option) any later version.
This program is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for more details.
You should have received a copy of the GNU General Public License along with this program. If not, see http://www.gnu.org/licenses/.