Hairball Graphs (data): Difference between revisions

Dataset Description

A simple model generating random graphs with cohesive groups that are connected into a small world is the planted partition model (PPM).

Let ${\displaystyle {\mathcal {C}}=\{C_{1},\ldots ,C_{k}\}}$ be a partition of $V$ for a graph ${\displaystyle G=(V,E)}$. Then ${\displaystyle {\mathcal {C}}}$ is called a clustering of ${\displaystyle G}$ with class ${\displaystyle c(v)\in {\mathcal {C}}}$ for a vertex ${\displaystyle v\in V}$. The probability of an edge ${\displaystyle (u,v)}$ is ${\displaystyle p_{\text{in}}}$ if ${\displaystyle c(u)=c(v)}$ and ${\displaystyle p_{\text{out}}}$ if ${\displaystyle c(u)\neq c(v)}$.

${\displaystyle p(u,v)={\begin{cases}p_{\text{in}}&{\mbox{if }}c(u)=c(v){\text{ (intra-cluster)}}\\p_{\text{out}}&{\mbox{if }}c(u)\neq c(v){\text{ (inter-cluster)}}\end{cases}}.}$

We generated 50 graphs from a PPM with ${\displaystyle 500}$ vertices, ${\displaystyle k=9}$, ${\displaystyle p_{in}=0.3}$, and ${\displaystyle p_{out}=0.01}$. On top of that, we ran a random noise model with ${\displaystyle p_{in}=p_{out}=0.1}$ to obfuscate the underlying groups. The resulting graphs are very dense, have a low diameter, and are real hairballs without any visible structure when laid out using force-directed methods.

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graphml format: Hairball-Graphs-PPM500.zip (11 MB)