I have 2 series of 45 values in the interval [0,1]. The first series is a human-generated standard, the second one is computer-generated (full series here http://www.copypastecode.com/74844/). The first series is sorted decreasingly.

```
0.909090909 0.216196598
0.909090909 0.111282099
0.9 0.021432587
0.9 0.033901106
...
0.1 0.003099256
0 0.001084533
0 0.008882249
0 0.006501463
```

Now what I want to assess is the degree to which the order is preserved in the second series, given that the first series is monotonic.
The **Pearson correlation** is 0.454763067, but I think that the relationship is not linear so this value is difficult to interpret.

A natural approach would be to use the **Spearman rank correlation**, which in this case is 0.670556181.
I noticed that with random values, while Pearson is very close to 0, the Spearman rank correlation goes up to 0.5, so a value of 0.67 seems very low.

What would you use to assess the order similarity between these 2 series?

Mulone