count and iterate arrangements of a sequence

I have a string and a number of spaces e.g. the string is "accttgagattcagt" and I have 10 spaces to insert.

How can you iterate over all combinations of that string and spaces? The letters in the string cannot be reordered, and all spaces must be inserted.

And how can you calculate the number of rearrangements (without iterating them)?

And what is the proper word for this? Permutations, combinations or something else?

(I visualise this as strings of 1s and 0s where the 1s are used by the string and the 0s are spaces.

So a short string of 3 letters and 2 spaces would be asking for all all 5 bit numbers with 3 1s and 2 0s e.g. 11100, 11010, 11001, 10110, 10101, 10011, 01110, 01101, 01011, 00111?

But easy as short sequences are to make on paper, I am struggling to make a for-loop to do it :(. So nice pseudocode to create this sequence, and count how long it would be, please?

Recursion will be easier to understand but can it be faster if recursion is avoided somehow?)

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So you want all permutations of the string with the inserted spaces, while the order of the chars in your string won't change? –  Nicolas Jun 24 '12 at 12:48
I think so NicoMayer –  Will Jun 24 '12 at 12:50
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3 Answers

That's combinations.

So a short string of 3 letters and 2 spaces would be asking for all all 5 bit numbers with 3 1s and 2 0s e.g. 11100, 11010, 11001, 10110, 10101, 10011, 01110, 01101, 01011, 00111?

You put the three '1's on one of the 5 indices and order does not matter. So its 5 over 3:

5!/((5-3)!3!) = 5*4/(2*1) = 10

The article on wikipedia.org has an image illustrating a random sequence of 3 red and 2 white squares.

This might be useful: Statistics: combinations in Python

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Thank you; I go from not understanding how to even phrase my own question to feeling confident; a lightbulb moment. Great link too. –  Will Jun 24 '12 at 17:21
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Hmm, a bit pseudo code, but you should get the idea

``````list doThat(string, spaces){
returnList
spacesTemp = spaces;
for(c = 0; c < string.length; c++){
subString = string.getSubString(c, string.length);
tmpString = string.insertStringAtPosition(c, createSpaceString(spacesTemp);
retSubStringList = doThat(subString, spaces - spacesTemp);
retCombinedList = addStringInFrontOfAllStringsInList(tmpString, retSubStringList);
returnList.addList(retCombinedList);
spacesTemp--;
}
return returnList;
}
``````
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n - number of letters m - number of spaces

Counting

Denote number of spaces between first and second letter as a_1, between second and third as a_2 and so on. Your question can now be stated as: In how many different ways a_1, a_2 ..a_n-1 can be chosen that each number is not less than 0 and their sum satisfies a_1 + a_2 .... + a_(n-1) = m? Answer to this question is n + m over n (by over I mean Newton symbol).

Why is it so? Visualize this problem as n + m empty bins in a row. If we fill exactly n of them with sand, distances between filled ones will satisfy our requirements for sum of a_1 ... a_n-1.

Generation

``````def generate(s, num_spaces):
ans = generate_aux("_" + s, num_spaces)
return [x[1:] for x in ans]

def generate_aux(s, num_spaces) : # returns list of arrangements
if num_spaces == 0:
return [s]
if s == "":
return []
val = []
for i in range(0, num_spaces + 1):
tmp = generate_aux(s[1:], num_spaces - i)
pref = s[0] + (" " * i)
val.extend([pref + x for x in tmp])
return val

print generate("abc", 2)
``````
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is that python? –  Nicolas Jun 24 '12 at 13:26
Yes, and it has a little error: it works correctly for `range(0, num_spaces + 1)` –  phg Jun 24 '12 at 13:29
@phg: There were even more errors, but it seems to meet Wills specification. –  KCH Jun 24 '12 at 13:33
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