I got how the linkage matrix is generated from the tree representation, thanks @cel for clarification. Let's take the example from the Newick wiki page (https://en.wikipedia.org/wiki/Newick_format)

The tree, in string format is:

```
(A:0.1,B:0.2,(C:0.3,D:0.4):0.5);
```

First, one should compute the distances between all of the leaves. If for example, we wish to compute the distance A and B, the method is to traverse the tree from A to B through the nearest branch. Since in the Newick format, we are given the distance between each leaf and the branch, the distance from A to B is simply
`0.1 + 0.2 = 0.3`

. For A to D, we would have to do `0.1 + (0.5 + 0.4) = 1.0`

, since the distance from D to the nearest branch is given as 0.4, and the distance from D's branch to A's is 0.5. Thus the distance matrix looks like this (with indexing `A=0`

, `B=1`

, `C=2`

, `D=3`

):

```
distance_matrix=
[[0.0, 0.3, 0.9, 1.0],
[0.3, 0.0, 1.0, 1.1],
[0.9, 1.0, 0.0, 0.7],
[1.0, 1.1, 0.1, 0.0]]
```

From here, the linkage matrix is easy to find. Since we already have `n=4`

clusters (`A`

,`B`

,`C`

,`D`

) as original observations, we need to find the additional `n-1`

clusters of the tree. Each step simply combines two clusters into a new one, and we take the two clusters that are closest to each other. In this case, A and B are closest together, so the first row of the linkage matrix will look like this:

```
[A,B,0.3,2]
```

From now on, we treat A & B as one cluster whose distance to the nearest branch is the distance between A & B.

Now we have 3 clusters left, `AB`

, `C`

, and `D`

. We can update the distance matrix to see which clusters are closest together. Let `AB`

have index `0`

in the updated distance matrix.

```
distance_matrix=
[[0.0, 1.1, 1.2],
[1.1, 0.0, 0.7],
[1.2, 0.7, 0.0]]
```

We can now see that C and D are closest to each other, so let's combine them into a new cluster. The second row in the linkage matrix will now be

```
[C,D,0.7,2]
```

Now, we only have two clusters left, `AB`

and `CD`

. The distance from these clusters to the root branch is 0.3 and 0.7 respectively, so their distance is 1.0. The final row of the linkage matrix will be:

```
[AB,CD,1.0,4]
```

Now, the scipy matrix wouldn't actually have the strings in place as I've shown here, we would have the use the indexing scheme, since we combined A and B first, `AB`

would have index 4 and `CD`

would have index 5. So the actual result we should see in the scipy linkage matrix would be:

```
[[0,1,0.3,2],
[2,3,0.7,2],
[4,5,1.0,4]]
```

This is the general way to get from the tree representation to the scipy linkage matrix representation. However, there already exist tools from other python packages to read in trees in Newick format, and from these, we can fairly easily find the distance matrix, and then pass that to scipy's linkage function. Below is a little script that does exactly that for this example.

```
from ete2 import ClusterTree, TreeStyle
import scipy.cluster.hierarchy as sch
import scipy.spatial.distance
import matplotlib.pyplot as plt
import numpy as np
from itertools import combinations
tree = ClusterTree('(A:0.1,B:0.2,(C:0.3,D:0.4):0.5);')
leaves = tree.get_leaf_names()
ts = TreeStyle()
ts.show_leaf_name=True
ts.show_branch_length=True
ts.show_branch_support=True
idx_dict = {'A':0,'B':1,'C':2,'D':3}
idx_labels = [idx_dict.keys()[idx_dict.values().index(i)] for i in range(0, len(idx_dict))]
#just going through the construction in my head, this is what we should get in the end
my_link = [[0,1,0.3,2],
[2,3,0.7,2],
[4,5,1.0,4]]
my_link = np.array(my_link)
dmat = np.zeros((4,4))
for l1,l2 in combinations(leaves,2):
d = tree.get_distance(l1,l2)
dmat[idx_dict[l1],idx_dict[l2]] = dmat[idx_dict[l2],idx_dict[l1]] = d
print 'Distance:'
print dmat
schlink = sch.linkage(scipy.spatial.distance.squareform(dmat),method='average',metric='euclidean')
print 'Linkage from scipy:'
print schlink
print 'My link:'
print my_link
print 'Did it right?: ', schlink == my_link
dendro = sch.dendrogram(my_link,labels=idx_labels)
plt.show()
tree.show(tree_style=ts)
```