# Fragmenting the sequence to a maximum randomness (arrays, any language)

I had an interesting discussion with my good developer friends. I wanted to create a random sequence of given array values but with maximum fragmentation, without any detectable patterns. This so called maximum randomness would be practically always identical for any unique sequence.

Example input array:

``````array(1, 2, 3, 4, 5);
``````

Example result of a standard rand() function:

``````array(2, 3, 1, 5, 4);
``````

What I don't like in the output above are the sequence values like "2, 3" and "5, 4", It's not fragmented enough.

Expecting result would/could be:

``````array(3, 5, 1, 4, 2);
``````

So my question; is there any known formula to calculate the maximum randomness or for better choice of words, maximum fragmentation?

-
Have you tried `shuffle()`? –  bsdnoobz Jun 6 '12 at 10:40
This is more an idea than a problem to solve :) `shuffle()` randomizes the order of the elements in array, some problem again. This does not fragmentize the array enough. For example, If I randomize/shuffle a list of songs, I don't want to hear another rock song after similar one that just played, just because shuffle accidentally randomized the sequence in that way. –  Edi Budimilic Jun 6 '12 at 10:48
It's not maximum randomness then, is rather maximum distance of each element? As soon you put some rule to random shuffle, then it's not random any more, and there's a chance that two different arrays produce same "shuffled" array. –  Hrvoje Jun 6 '12 at 11:14
That's true Hrvoje, and that's why I corrected myself with a better choice of words "maximum fragmentation". So, we're trying to find a combination of maximum distance of each element but again, without a recognizable pattern. Fragmetation that would be the hardest to compress, for example. –  Edi Budimilic Jun 6 '12 at 11:16
You have to state the problem in a more formal way. How is your fragmentation measured? –  galymzhan Jun 6 '12 at 12:08

Assuming the fragmentation is defined as the sum of the absolute differences of successive values, the maximum fragmentation sequence is not unique -- the reverse sequence will always have the exact same fragmentation and there're many more options, e.g. all the following orderings will have a fragmentation of 11, which is maximal for this array: (3,1,5,2,4), (3,2,5,1,4), (2,5,1,4,3), (2,4,1,5,3), (4,1,5,2,3), (4,2,5,1,3), (3,5,1,4,2), (3,4,1,5,2). There're yet more symmetries if one incorporates the difference between the last and the first element, too.

If one seeks to identify a particular maximum fragmentation sequence, e.g. the one "without a noticeable pattern", the latter notion has to be formalized and a search performed, which, I suspect, would be costly from the computational point of view, unless the objective can be formalized so as to permit efficient decoding. I suspect that for all practical purposes a good heuristic would suffice, e.g. inserting elements into an array one by one (greedy fashion) so as to maximize the gain in fragmentation on each step.

If the elements of the array are not numbers but some entities with a defined distance for each pair, however, the problem does become equivalent to the traveling salesman problem, as user802500 pointed out.

-

So what are you talking about, not randomization, it is sorting. The result of randomization should not depend on order of the initial data.

By fragmentation in this case it is necessary to understand the differences between the array before sorting and after. But it must be evaluated differently depending on the task. For example, one can evaluate the difference between the positions of the elements or it's order.

Sorting example.

``````    <?
// it must be uksort() function with sequence formula, but for me easier do like this
\$array = array(1, 2, 3, 4, 5);
uk_sort(\$array);
function uk_sort(&\$array) {
for(\$i=0;\$i<count(\$array);\$i++) {
if(\$i%2==0) {
\$even[] = \$array[\$i];
} else {
\$odd[] = \$array[\$i];
}
}
\$even[] = array_shift(\$even);
rsort(\$odd);
\$array = array_merge(\$even, \$odd);
}
print_r(\$array);
?>
Array
(
[0] => 3
[1] => 5
[2] => 1
[3] => 4
[4] => 2
)
``````
-

You could split the list into two (or more) collections, shuffle those THEN mix them in order?

``````array(1, 2, 3, 4, 5, 6, 7, 8, 9, 10);

array(1, 2, 3, 4, 5);
array(6, 7, 8, 9, 10);

array(2, 3, 1, 5, 4);
array(8, 7, 10, 9, 6);

array(2, 8, 3, 7, 1, 10, 5, 9, 4, 6)
``````

This would give you a fairly high fragmentation but not the maximum. I suspect to get the maximum would require a LOT more work.

-
This is a really nice shortcut, but it will be more difficult to use if the data varies in multiple dimensions. If the data varies on multiple dimensions (like the OP's example of music genres), then it gets more difficult to apply. –  Justin Blank Jun 6 '12 at 13:18
``````[2,5,1,3,4] // the first three choices force us to not fragment the last two