Answered on Math.SE, generating matrix for a recurrence relation

for the recurrence `f(n)=a*f(n-1)+b*f(n-2)+c*f(n-3)+d*f(n-4)`

, how can one get the generating matrix so that it can be solved by matrix exponentiation?

For `f(n)=a*f(n-1)+b*f(n-2)+c*f(n-3)`

the corresponding generating matrix is:

```
| a 0 c | | f(n) | | f(n+1) |
| 1 0 0 | x | f(n-1) | = | f(n) |
| 0 1 0 | | f(n-2) | | f(n-1) |
```

so how to get the same for required recurrence? Also what should be the procedure for any recurrence which may be of the form :

`f(n)=a*f(n-1)+b*f(n-2)+c*f(n-3)+..+someconstant*f(n-k)`

?

Thanks.