Say I have a function f:

```
f(0) = 0
f(i) = (i - 1) % 4
```

f(0..12):

```
0 0 1 2 3 0 1 2 3 0 1 2 3
```

I want to find the cycle start and the cycle length, which are 1 and 4, respectively. The tortoise and hare algorithm works with iterated functions, but I don't have an iterated function. Are there other algorithms that work with non-iterated functions or can the tortoise and hare algorithm be modified for this?

Edit:

Using Jason S's answer, I managed to come up with this, which seems to be working:

```
public static Tuple<int, int> ModifiedTortoiseHare(Func<int, int> f, int x0 = 0, int checks = 4)
{
for (; ; x0++)
{
int lam = 0, tortoise, hare;
do
{
lam++;
tortoise = f(x0 + lam);
hare = f(x0 + 2 * lam);
} while (tortoise != hare);
int mu = -1;
do
{
mu++;
tortoise = f(x0 + mu);
hare = f(x0 + mu + lam);
} while (tortoise != hare);
if (mu != 0) continue;
bool correct = true;
int lamCheckMax = lam * checks;
for (int x = 0; x < lamCheckMax; x++)
{
if (f(x0 + x + mu) != f(x0 + x + mu + lam))
{
correct = false;
if (mu != 0) x0 += mu - 1;
break;
}
}
if (correct) return Tuple.Create(x0 + mu, lam);
}
}
```

`f(x) = (x-x0) % m`

for all x > some x1) – Jason S Jun 18 '11 at 20:52