# graphlet_basis

##### Graphlet decomposition of a graph

Graphlet decomposition models a weighted undirected graph via the union of potentially overlapping dense social groups. This is done by a two-step algorithm. In the first step a candidate set of groups (a candidate basis) is created by finding cliques if the thresholded input graph. In the second step these the graph is projected on the candidate basis, resulting a weight coefficient for each clique in the candidate basis.

##### Usage

`graphlet_basis(graph, weights = NULL)`graphlet_proj(graph, weights = NULL, cliques, niter = 1000, Mu = rep(1,
length(cliques)))

##### Arguments

- graph
- The input graph, edge directions are ignored. Only simple graph (i.e. graphs without self-loops and multiple edges) are supported.
- weights
- Edge weights. If the graph has a
`weight`

edge attribute and this argument is`NULL`

(the default), then the`weight`

edge attribute is used. - cliques
- A list of vertex ids, the graphlet basis to use for the projection.
- niter
- Integer scalar, the number of iterations to perform.
- Mu
- Starting weights for the projection.

##### Details

igraph contains three functions for performing the graph decomponsition of a
graph. The first is `graphlets`

, which performed both steps on the
method and returns a list of subgraphs, with their corresponding weights.
The second and third functions correspond to the first and second steps of
the algorithm, and they are useful if the user wishes to perform them
individually: `graphlet_basis`

and `graphlet_proj`

.

##### Value

`graphlets`

returns a list with two members:cliques A list of subgraphs, the candidate graphlet basis. Each subgraph is give by a vector of vertex ids. Mu The weights of the subgraphs in graphlet basis. `graphlet_basis`

returns a list of two elements:cliques A list of subgraphs, the candidate graphlet basis. Each subgraph is give by a vector of vertex ids. thresholds The weight thresholds used for finding the subgraphs. `graphlet_proj`

return a numeric vector, the weights of the graphlet basis subgraphs.

##### Examples

```
## Create an example graph first
D1 <- matrix(0, 5, 5)
D2 <- matrix(0, 5, 5)
D3 <- matrix(0, 5, 5)
D1[1:3, 1:3] <- 2
D2[3:5, 3:5] <- 3
D3[2:5, 2:5] <- 1
g <- simplify(graph_from_adjacency_matrix(D1 + D2 + D3,
mode="undirected", weighted=TRUE))
V(g)$color <- "white"
E(g)$label <- E(g)$weight
E(g)$label.cex <- 2
E(g)$color <- "black"
layout(matrix(1:6, nrow=2, byrow=TRUE))
co <- layout_with_kk(g)
par(mar=c(1,1,1,1))
plot(g, layout=co)
## Calculate graphlets
gl <- graphlets(g, niter=1000)
## Plot graphlets
for (i in 1:length(gl$cliques)) {
sel <- gl$cliques[[i]]
V(g)$color <- "white"
V(g)[sel]$color <- "#E495A5"
E(g)$width <- 1
E(g)[ V(g)[sel] %--% V(g)[sel] ]$width <- 2
E(g)$label <- ""
E(g)[ width == 2 ]$label <- round(gl$Mu[i], 2)
E(g)$color <- "black"
E(g)[ width == 2 ]$color <- "#E495A5"
plot(g, layout=co)
}
#'
```

*Documentation reproduced from package igraph, version 1.0.0, License: GPL (>= 2)*