fastRG

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fastRG quickly samples a broad class of network models known as generalized random dot product graphs (GRDPGs). In particular, for matrices \(X\), \(S\) and \(Y\), fastRG samples a matrix \(A\) with expectation \(X S Y^T\) where the entries are independently Poisson distributed conditional on \(X\) and \(Y\). This is primarily useful when \(A\) is the adjacency matrix of a graph. Crucially, the sampling is \(\mathcal O(m)\), where \(m\) is the number of the edges in graph, as opposed to the naive sampling approach, which is \(\mathcal O(n^2)\), where \(n\) is the number of nodes in the network. For additional details, see the paper [1].

fastRG has two primary use cases:

  1. Sampling enormous sparse graphs that cannot feasibly be sampled with existing samplers, and
  2. validating new methods for random dot product graphs (and variants).

fastRG makes the latent parameters of random dot product graphs readily available to users, such that simulation studies for community detection, subspace recovery, etc, are straightforward.

Installation

You can install the released version of fastRG from CRAN with:

install.packages("fastRG")

And the development version from GitHub with:

# install.packages("devtools")
devtools::install_github("RoheLab/fastRG")

Usage

There are two stages to sampling from generalized random dot product graphs. First, we sample the latent factors \(X\) and \(Y\). Then we sample \(A\) conditional on those latent factors. fastRG mimics this two-stage sample structure. For example, to sample from a stochastic blockmodel, we first create the latent factors.

library(fastRG)
#> Loading required package: Matrix

set.seed(27)

sbm <- sbm(n = 1000, k = 5, expected_density = 0.01)
#> Generating random mixing matrix `B` with independent Uniform(0, 1) entries. This distribution may change in the future. Explicitly set `B` for reproducible results.

You can specify the latent factors and the mixing matrix \(B\) yourself, but there are also defaults to enable fast prototyping. Here \(B\) was randomly generated with Uniform[0, 1] entries and nodes were assigned randomly to communities with equal probability of falling in all communities. Printing the result object gives us some additional information:

sbm
#> Undirected Stochastic Blockmodel
#> --------------------------------
#> 
#> Nodes (n): 1000 (arranged by block)
#> Blocks (k): 5
#> 
#> Traditional SBM parameterization:
#> 
#> Block memberships (z): 1000 [factor] 
#> Block probabilities (pi): 5 [numeric] 
#> Factor model parameterization:
#> 
#> X: 1000 x 5 [dgCMatrix] 
#> S: 5 x 5 [dgeMatrix] 
#> 
#> Poisson edges: TRUE 
#> Allow self loops: TRUE 
#> 
#> Expected edges: 4995
#> Expected degree: 5
#> Expected density: 0.01

Now, conditional on this latent representation, we can sample graphs. fastRG supports several different output types, each of which is specified by the suffix to sample_*() functions. For example, we can obtain an edgelist in a tibble with:

sample_edgelist(sbm)
#> # A tibble: 4,985 × 2
#>     from    to
#>    <int> <int>
#>  1   111   127
#>  2    86   109
#>  3    43    97
#>  4    61    94
#>  5    22   143
#>  6     4    89
#>  7    30   159
#>  8   119   210
#>  9    41   197
#> 10   145   175
#> # … with 4,975 more rows

but we can just as easily obtain the graph as a sparse matrix

A <- sample_sparse(sbm)
A[1:10, 1:10]
#> 10 x 10 sparse Matrix of class "dsCMatrix"
#>                          
#>  [1,] . . . . . . . . . .
#>  [2,] . . . . . . . . . .
#>  [3,] . . . . . . . . . .
#>  [4,] . . . . . . . . . .
#>  [5,] . . . . . . . . . .
#>  [6,] . . . . . . . . . .
#>  [7,] . . . . . . . . . .
#>  [8,] . . . . . . . . . .
#>  [9,] . . . . . . . . . .
#> [10,] . . . . . . . . . .

or an igraph object

sample_igraph(sbm)
#> IGRAPH a506dc4 UN-- 1000 5033 -- 
#> + attr: name (v/c)
#> + edges from a506dc4 (vertex names):
#>  [1] 63 --76  135--215 59 --182 21 --134 180--218 53 --189 138--139 21 --78 
#>  [9] 49 --70  76 --127 6  --139 64 --214 31 --132 56 --93  75 --144 9  --185
#> [17] 33 --150 115--165 163--213 53 --6   47 --179 25 --26  7  --51  10 --55 
#> [25] 120--183 43 --152 25 --34  84 --216 114--191 34 --127 152--164 178--189
#> [33] 106--181 28 --38  41 --89  34 --139 6  --213 24 --153 32 --173 47 --111
#> [41] 157--205 108--133 98 --116 26 --117 18 --194 32 --18  74 --209 18 --128
#> [49] 13 --127 26 --12  1  --133 52 --72  128--213 13 --173 61 --214 33 --142
#> [57] 22 --111 163--191 191--205 108--5   9  --72  6  --217 113--122 90 --154
#> + ... omitted several edges

Note that every time we call sample_*() we draw a new sample.

A <- sample_sparse(sbm)
B <- sample_sparse(sbm)

all(A == B)  # random realizations from the SBM don't match!
#> [1] FALSE

Efficient spectral decompositions

If you would like to obtain the singular value decomposition of the population adjacency matrix conditional on latent factors, that is straightforward:

s <- eigs_sym(sbm)
s$values
#> [1]  5.0999835  1.8365365  0.6679806 -0.5241303 -0.8109449

Note that eigendecompositions and SVDS (for directed graphs) use RSpectra and do not require explicitly forming large dense population adjacency matrices; the population decompositions should be efficient in both time and space for even large graphs.

Key sampling options

There are several essential tools to modify graph sampling that you should know about. First there are options that affect the latent factor sampling:

In the second stage of graph sampling, the options are:

Known issues

Sampling blockmodels with very small numbers of nodes (or blockmodels with the number of blocks k on the same order as n) results in a degeneracy that can cause issues.

igraph allows users to sample SBMs (in \(\mathcal O(m + n + k^2)\) time) and random dot product graphs (in \(\mathcal O(n^2 k)\) time).

You can find the original research code associated with fastRG here. There is also a Python translation of the original code in Python here. Both of these implementations are bare bones.

References

[1] Rohe, Karl, Jun Tao, Xintian Han, and Norbert Binkiewicz. 2017. “A Note on Quickly Sampling a Sparse Matrix with Low Rank Expectation.” Journal of Machine Learning Research; 19(77):1-13, 2018. https://www.jmlr.org/papers/v19/17-128.html