You can create a dendrogram object by hand, but to me the question leaves it a bit unclear as to why this information is needed in the figure 2. If a dendrogram, that clusters all x's and y's together as separate groups, is added to the figure 2, the branches of the dendrogram will cross each other, and render the dendrogram (using real branch lenghts or heights) unreadable. If a dendrogram using some suitable heights is added, the dendrogram branch lengths do not have meaning (they do not correspond to the real correlation coefficients), but the dendrogram still tells the branching order of the tree.

Anyway, here's how to go about this technically (also, see Aniko's answer to a similar question, the details are available there).

An hclust object (a), that uses the "real" (I calculated them fast, so they might not be exactly correct, please use hierarchical clustering algorithm with average linkage to check, if needed) branch lenghts can be generated by hand:

```
a<-list()
a$merge<-matrix(c(-1, -2,
-4, -5,
-3, 1,
-6, 2,
3, 4), ncol=2, byrow=TRUE)
a$height<-c(0.1, 0.12, 0.12, 0.045, 0.1)
a$order<-1:6
a$labels<-c("x1", "x2", "x3", "y1", "y2", "y3")
class(a)<-"hclust"
```

Or by using just some suitable branch lenghts to even get a dendrogram:

```
b<-list()
b$merge<-matrix(c(-1, -2,
-4, -5,
-3, 1,
-6, 2,
3, 4), ncol=2, byrow=TRUE)
b$height<-c(0.1, 0.1, 0.1, 0.1, 0.2)
b$order<-1:6
b$labels<-c("x1", "x2", "x3", "y1", "y2", "y3")
class(b)<-"hclust"
```

After that, the final plot can be generated as:

```
heatmap.2(cor,Rowv=as.dendrogram(a),Colv=as.dendrogram(a),trace="none",col=bluered)#fig2
```

or:

```
heatmap.2(cor,Rowv=as.dendrogram(b),Colv=as.dendrogram(b),trace="none",col=bluered)#fig2
```