# shuffle algorithm with only random 0, 1

I just read some interview question on the internet and made me curious at the solution.

Problem is like this.

Given a list of numbers and a rand(0,1) function, which returns a random integer between 0 and 1. Provide an algorithm to randomly sort the given list, based on the output of the rand() function, which should be called once for every number on the list.

It seems asking to generate a random number with only 0 and 1 for shuffle. And I came up with this solution.

``````int random(int array_index, int array size)
{
return (array_index * 41 * (array_size + rand(0,1)) % array_size;
}
``````

But I feel this is not good enough since it depends on array_index.

Anyone has better answer for this?

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`41`? Where'd you get that? –  sarnold Mar 27 '12 at 0:22
@sarnold 41 is just a random prime number. I also viewed this problem as generating hash number with less collision because we don't want to generate duplicate random numbers. so I used the tactic from hash function. –  code animal Mar 27 '12 at 0:58
Ah, fair enough. Note that if I were an interviewer, I'd be just as curious about the number... the good reason is welcome, but perhaps should have been in a comment or something similar. –  sarnold Mar 27 '12 at 1:02
@sarnold well, there you go. haha. –  code animal Mar 27 '12 at 1:11
You sure it is a random integer between 0 and 1? –  Lasse V. Karlsen Mar 28 '12 at 9:52

You should use the Fisher-Yates Shuffle algorithm, which performs a truly random shuffle in O(n) time (ie: "called once for every number on the list").

``````To shuffle an array a of n elements (indices 0..n-1):
for i from n − 1 downto 1 do
j ← random integer with 0 ≤ j ≤ i
exchange a[j] and a[i]
``````
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Not valid for this problem. random j is not 0 ≤ j ≤ i. it's 0 or 1. –  code animal Mar 27 '12 at 0:55
Oh sorry - I read the value as random number between 0 and 1, which can easily be converted to 0 ≤ j ≤ i. –  EnsignRicky Mar 27 '12 at 1:10

I'll just write mine in Ruby, since I use it more.

``````def random_sort(numbers)
sorted = Array.new
index = 0
numbers.each do |number|
while rand(1)
index += 1
end

index = index % numbers.length
while numbers[index] != nil
if index > numbers.length - 1
index = 0
continue
end
index += 1
end

sorted[index] = number
end

return sorted
end
``````
-
You're allocating your `sorted` from within the `numbers.each do |number|` block -- giving you a new `sorted[]` for every individual number. –  sarnold Mar 27 '12 at 1:01
I am not familiar with Ruby. But output of while rand(1) looks like index == 1. I don't get that. –  code animal Mar 27 '12 at 1:04
@sarnold: Yeahhhhh, didn't really notice that while I was typing it (since I did it on here). Gonna fix that...don't wanna look COMPLETELY idiotic. Though looking somewhat idiotic is fine with me. –  Mizuho Mar 27 '12 at 1:09

Let the array size be N

To shuffle the list of numbers randomly we use the following strategy.

``````For the first element we find a position out of the all available N choices.
Then, the second element has N-1 choices and so on.
We generate the N! possible outcomes which ensures all are equi-probable.
``````

Now to generate the position randomly out of (say N) choices we do the following; (We do the same for N-1, N-2 ...)

``````Use Divide - And - Conquer.
First modify N to (Least Power of 2 >= N) Example: For N=5, modified_N=8
Run rand(0,1) -
If 0 - we the position is from 1 to modified_N/2
Else - the position is in modified_N/2+1 to modified_N

We do this recursively till we find the final position.
If the final position is between N+1 and modified_N we run this procedure again.
``````

This way we can find 1 position at a time randomly using rand(0,1)

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This is similar to generating bits of an integer using rand(0,1) –  Sajal Jain Sep 13 '12 at 12:37

Suppose I have a 10 element list. Then there are 10! = 3628800 different ways of ordering it.

If I can call rand(0,1) only 10 times, I can generate only 2^10 = 1024 different binary sequences.

There is no way to uniquely identify one of the 10! orderings with a number between 0 and 1024. That is we cannot perform an unbiased shuffle. (except for lists of greater than 3 elements). So, we can now focus on choosing an easy to implement biased shuffling.

For example:

``````result = new List<int>();

foreach( int i in list )
{
int r = rand(0,1);

if( r == 0 )
result.Prepend(i);
else
result.Append(i);
}
return result;
``````

This is very biased to putting elements further in the list away from the middle of the list.

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