# Explanation of this LINQ code which generates permutations

Can someone explain to me how this code works which generates permutations?

I see that it's using recursive list building but I can't quite get my brain around the exact mechanics.

``````public static IEnumerable<IEnumerable<T>> Permute<T>(this IEnumerable<T> list)
{
if (list.Count() == 1)
return new List<IEnumerable<T>> { list };
return list
.Select((a, i1) =>
Permute(list.Where((b, i2) => i2 != i1))
.Select(b => (new List<T> { a }).Union(b)))
.SelectMany(c => c);
}
``````
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If you care about efficiency, don't bother on learning this code. –  Yorye Nathan Oct 4 '12 at 17:40
And, unless I'm reading too hastily, if you care about accuracy. Permutations are by definition unordered, while Union, a set operation, both ignores order and eliminates duplicates. –  phoog Oct 4 '12 at 17:43
mostly i care that i understand what the code does but now how it does it –  Aaron Anodide Oct 4 '12 at 17:45
Instead of list.Count() == 1, you can avoid over-enumerating the list with `list.Any() && !list.Skip(1).Any()` –  phoog Oct 4 '12 at 17:45
"mostly i care that i understand what the code does but now how it does it" -- have you tried stepping through the code in a debugger? –  phoog Oct 4 '12 at 17:46

Firstly, I'd point out that this relies on the ordering of `Union`, which is unspecified, and only works if the values in the original collection are unique. Changing `Union` to `Concat` would fix that.

I suspect it's also frighteningly expensive. Anyway...

You can understand it by induction. It definitely works for a single element collection, based on the `if`. So, let's go from there.

Suppose we start with the assumption that it works for a collection of size `n` like this:

``````{ e1, ... en }
``````

Now let's see whether it works for a collection of size `n + 1`. The call will bypass the "if", and go into the recursive return part. So we're left with:

``````list.Select((a, i1) =>
Permute(list.Where((b, i2) => i2 != i1))
.Select(b => (new List<T> { a }).Union(b)))
.SelectMany(c => c);
``````

The `SelectMany` part just flattens a collection of collections - that's straightforward. So let's focus on the `Select` call. It's saying...

• For each element (`a`) in the original collection, which we know has index `i1`...
• Work out the list except that element (that's the `list.Where(...)` part)
• For each permutation of that smaller list (that's the `Permute` call)...
• ... generate a new list consisting of element `a` followed by the "current permutation" (That's the `new List(...).Union(b)` part.)

So if our collection was { x, y, z } we'd get:

• Every collection of `{ y, z }` prefixed by `x`
• Every collection of `{ x, z }` prefixed by `y`
• Every collection of `{ x, y }` prefixed by `z`

That pretty much defines "every permutation"... so it works for `n + 1`.

Given the base case and the induction step, it therefore works for collections of any size greater than or equal to 1.

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