## Assuming you mean two normal/Gaussian vectors of values with correlation 0.56

We can use `mvrnorm()`

from package **MASS**

```
require(MASS)
out <- mvrnorm(50, mu = c(0,0), Sigma = matrix(c(1,0.56,0.56,1), ncol = 2),
empirical = TRUE)
```

which gives

```
> cor(out)
[,1] [,2]
[1,] 1.00 0.56
[2,] 0.56 1.00
```

The `empirical = TRUE`

bit is important otherwise the actual correlation achieved is subject to randomness too and will not be exactly the stated value with larger discrepancies for smaller samples.

## Assuming you mean a lag 1 correlation of 0.56 & Gaussian random variables

For this one you can use the `arima.sim()`

function:

```
> arima.sim(list(ar = 0.56), n = 50)
Time Series:
Start = 1
End = 50
Frequency = 1
[1] 0.62125233 -0.04742303 0.57468608 -0.07201988 -1.91416757 -1.11827563
[7] 0.15718249 0.63217365 -1.24635896 -0.22950855 -0.79918784 0.31892842
[13] 0.33335688 -1.24328177 -0.79056890 1.08443057 0.55553819 0.33460674
[19] -0.33037659 -0.65244221 0.70461755 0.61450122 0.53731454 0.19563672
[25] 1.73945110 1.27119241 0.82484460 1.58382861 1.81619212 -0.94462052
[31] -1.36024898 -0.30964390 -0.94963216 -3.75725819 -1.77342095 -1.20963799
[37] -1.76325350 -1.20556172 -0.94684678 -0.85407649 0.14922226 -0.31109945
[43] 0.39456259 0.89610859 -0.70913792 -2.27954408 -1.14722464 0.39140446
[49] 0.66376227 1.63275483
```

betweenthem,`mvrnorm`

in the`MASS`

package is a good place to start. – Ben Bolker Nov 8 '12 at 14:54