I don't believe a cointegration test has been implemented for scipy. You may be better off using `rpy2`

to interface Python with R. R provides cointegration tests in the `urca`

package.

For example:

```
import rpy2.robjects as ro
r=ro.r
a = [10.23, 11.65, 12.36, 12.96]
b = [5.23, 6.10, 8.3, 4.98]
```

Define `a`

and `b`

in R:

```
ro.globalEnv['a']=ro.FloatVector(a)
ro.globalEnv['b']=ro.FloatVector(b)
```

Call the R `cor`

(correlation) function:

```
print(r('cor(a,b,method="pearson")'))
# [1] 0.2438518
```

Call the R `ca.po`

(Phillips & Ouliaris Cointegration Test)

```
r('library(urca)')
print(r('ca.po(cbind(a,b))'))
# ########################################################
# # Phillips and Ouliaris Unit Root / Cointegration Test #
# ########################################################
# The value of the test statistic is: 0
```

I'm not familiar with cointegration, however, so apologies if my use of `ca.po`

is totally inept.

Also note that R is programming language unto itself, with (at least currently) a richer library of statistical functions than `scipy`

. It's possible to run R directly (without Python). The calls would look a little simpler:

```
> a = c(10.23, 11.65, 12.36, 12.96)
> b = c(5.23, 6.10, 8.3, 4.98)
> z = cbind(a,b)
> z
a b
[1,] 10.23 5.23
[2,] 11.65 6.10
[3,] 12.36 8.30
[4,] 12.96 4.98
> ca.po(z)
########################################################
# Phillips and Ouliaris Unit Root / Cointegration Test #
########################################################
The value of the test statistic is: 0
```