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Can we say that a truncated md5 hash is still uniformly distributed?

To avoid misinterpretations: I'm aware the chance of collisions is much greater the moment you start to hack off parts from the md5 result; my use-case is actually interested in deliberate collisions. I'm also aware there are other hash methods that may be better suited to use-cases of a shorter hash (including, in fact, my own), and I'm definitely looking into those.

But I'd also really like to know whether md5's uniform distribution also applies to chunks of it. (Consider it a burning curiosity.)

Since mediawiki uses it (specifically, the left-most two hex-digits as characters of the result) to generate filepaths for images (e.g. /4/42/The-image-name-here.png) and they're probably also interested in an at least near-uniform distribution, I imagine the answer is 'yes', but I don't actually know.

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While we're here, anyone have good link to a proof of the uniformity of non-truncated md5 sums? –  naught101 Nov 24 '13 at 9:41
    
@naught101: Since this question is rather old (by internet measure) and has an accepted answer, it's unlikely to get much more exposure from people who could answer your question - maybe make your own question? :) –  pinkgothic Nov 25 '13 at 13:50

2 Answers 2

up vote 9 down vote accepted

Yes, not exhibiting any bias is a design requirement for a cryptographic hash. MD5 is broken from a cryptographic point of view however the distribution of the results was never in question.

If you still need to be convinced, it's not a huge undertaking to hash a bunch of files, truncate the output and use ent ( http://www.fourmilab.ch/random/ ) to analyze the result.

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Much appreciated - this is exactly the sort of answer I was looking for. –  pinkgothic Nov 20 '11 at 19:23

I wrote a little php-program to answer this question. It's not very scientific, but it shows the distribution for the first and the last 8 bits of the hashvalues using the natural numbers as hashtext. After about 40.000.000 hashes the difference between the highest and the lowest counts goes down to 1%, so I'd say the distribution is ok. I hope the code is more precise in explaining what was computed :-) Btw, with a similar program I found that the last 8 bits seem to be distributed slightly better than the first.

<?php
// Setup count-array:
for ($y=0; $y<16; $y++) {
  for ($x=0; $x<16; $x++) {
    $count[dechex($x).dechex($y)] = 0;
  }
}

$text = 1; // The text we will hash.
$hashCount = 0;
$steps = 10000;

while (1) {
  // Calculate & count a bunch of hashes:
  for ($i=0; $i<$steps; $i++) {   
    $hash = md5($text);
    $count[substr($hash, 0, 2)]++;
    $count[substr($hash, -2)]++;
    $text++;
  }
  $hashCount += $steps;

  // Output result so far:
  system("clear");
  $min = PHP_INT_MAX; $max = 0;
  for ($y=0; $y<16; $y++) {
    for ($x=0; $x<16; $x++) {  
      $n = $count[dechex($x).dechex($y)];
      if ($n < $min) $min = $n;
      if ($n > $max) $max = $n;
      print $n."\t";
    }
    print "\n";
  }
  print "Hashes: $hashCount, Min: $min, Max: $max, Delta: ".((($max-$min)*100)/$max)."%\n";
} 
?>
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1  
This is fantastic. Thank you! (I suppose I could/should have done this myself, really!) –  pinkgothic Feb 19 '12 at 12:54

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