# Recursively generate ordered substrings from an ordered sequence of chars?

Edited after getting answers

Some excellent answers here. I like Josh's because it is so clever and uses C++. However I decided to accept Dave's answer because of it's simplicity and recursion. I tested them both and they both produced identical correct results (although in a different order). So thanks again everyone.

Say I have a string s of chars s[0]:s[N] and where each char s[i] <= s[i+1] For example the string

``````aaacdddghzz
``````

I want to generate all combinations of substrings while keeping the same relationship between chars.

So for example I would get

``````a
aa
aaa
d
dd
ddd
.
.
.
ac
aac
.
.
.
acdddghzz
aacdddghzz
aaacdddghzz
``````

But not

``````ca
hdz
...etc
``````

Now I know how to work out how many combinations there are. You create a histogram of the frequency of letters in the string. So in the above example the that would be

For string aaacdddghzz

``````a=3
d=3
c=1
g=1
h=1
z=2
``````

and the formula is `(a+1)(c+1)(d+1)(g+1)(h+1)(z+1) = 4*4*2*2*2*3 = 384`. There are 384 substrings that keep the s[i] <=s [i+1] relationship.

So the question is how do I generate those 384 substrings recursively? Actually an iterative method would be just as good, maybe better as large strings with many unique chars might cause the stack to overflow. This sounds like homework but it isn't. I'm just useless at coming up with algorithms like this. I use C++ but pseudocode would be fine.

-
Just to clarify, do you consider the same sequence of letters taken from a different position to be the same substring? I.e., [0..1] == "aa" is the same as [1..2] == "aa"? –  Curt Sampson May 22 '09 at 4:12
Further, I notice that you have "ac" in your result, yet no "ac" sequence occurs in the original string. So technically, it's not a "substring" of the original string, though it is a permutation derived from the original sequence of letters. –  Curt Sampson May 22 '09 at 4:13
c < d, but appears after d in the example string - should it be assumed that the input is aaacdddghzz? –  JimG May 22 '09 at 4:24
@Curt - yes "aa" would be the same substring in that case –  20th Century Boy May 22 '09 at 5:59
@Curt again - yes, sorry by "all substrings" I really meant "all permutations" that keep the original order (i.e. alphabetically) –  20th Century Boy May 22 '09 at 6:03
show 1 more comment

Following is a recursive algorithm to generate all subsequences.

``````/* in C -- I hope it will be intelligible */

#include <stdio.h>

static char input[] = "aaabbbccc";
static char output[sizeof input];

/* i is the current index in the input string
* j is the current index in the output string
*/
static void printsubs(int i, int j) {
/* print the current output string */
output[j] = '\0';
printf("%s\n", output);
/* extend the output by each character from each remaining group and call ourselves recursively */
while(input[i] != '\0') {
output[j] = input[i];
printsubs(i + 1, j + 1);
/* find the next group of characters */
do ++i;
while(input[i] == input[i - 1]);
}
}

int main(void) {
printsubs(0, 0);
return 0;
}
``````

If your interest is merely in counting how many subsequences there are, you can do it much more efficiently. Simply count up how many of each letter there are, add 1 to each value, and multiply them together. In the above example, there are 3 a's, 3 b's, 3 c's, and 2 d's, for (3 + 1) * (3 + 1) * (3 + 1) * (2 + 1) = 192 subsequences. The reason this works is that you can choose between 0 and 3 a's, 0 and 3 b's, 0 and 3 c's, and 0 and 2 d's, and all of these choices are independent.

-
This does not take advantage of the s[i] <= s[i+1] constraint, that simplifies the problem a great deal. –  Tom Leys May 22 '09 at 4:52
Yes it does. You didn't run it, did you? –  Dave May 22 '09 at 4:54
I'll try this tonight - it seems incredibly short if it works! –  20th Century Boy May 22 '09 at 7:01
I tested this - it works perfectly. In fact I think I'll accept it as the answer because it's so concise and more in the spirit of what I was thinking. Again, I would never have been able to come up with this myself, thank God for SO! –  20th Century Boy May 22 '09 at 12:37

An ammendement to Ryan Shaw's answer above:

Instead of counting in binary, count each digit in a base dependant on the number of each letter. For example:

``````a d c g h z
3 3 1 1 1 2
``````

So count:

``````0 0 0 0 0 0
0 0 0 0 0 1
0 0 0 0 0 2
0 0 0 0 1 0
0 0 0 0 1 1
0 0 0 0 1 2
0 0 0 1 0 0
...
0 0 0 1 1 2
0 0 1 0 0 0
...
0 0 1 1 1 2
0 1 0 0 0 0
...
0 3 1 1 1 2
1 0 0 0 0 0
...
3 3 1 1 1 2
``````

And you've enumerated all the possible subset, without duplicates. For any one of these outputting the string is simply a matter of looping through the digits and outputting as many of each letter as are specified.

``````1 2 0 0 1 1 => addhz
3 0 0 0 1 2 => aaahzz
``````

And the code:

``````void GetCounts(const string &source, vector<char> &characters, vector<int> &counts)
{
characters.clear();
counts.clear();

char currentChar = 0;
for (string::const_iterator iSource = source.begin(); iSource != source.end(); ++iSource)
{
if (*iSource == currentChar)
counts.back()++;
else
{
characters.push_back(*iSource);
counts.push_back(1);
currentChar = *iSource;
}
}
}

bool Advance(vector<int> &current, const vector<int> &max)
{
if (current.size() == 0)
return false;

current[0]++;
for (size_t index = 0; index < current.size() - 1 && current[index] > max[index]; ++index)
{
current[index] = 0;
current[index + 1]++;
}
if (current.back() > max.back())
return false;
return true;
}

string ToString(const vector<int> &current, const vector<char> &characters)
{
string result;
for (size_t index = 0; index < characters.size(); ++index)
for (int i = 0; i < current[index]; ++i)
result += characters[index];
return result;
}

int main() {
vector<int> max;
vector<char> characters;

vector<int> current(characters.size(), 0);
int index = 1;
{
cout << index++ << ":" << ToString(current, characters) << endl;
}
}
``````
-
Perfect solution. Now you need pseudocode –  Tom Leys May 22 '09 at 4:53
This is all kinds of awesomeness. I could have thought about the problem for days (weeks? months?) and never come up with this. Did you make the code up on the fly or was it something you had already? –  20th Century Boy May 22 '09 at 6:58
I've used things very similar to the Advance() function several times. It's really just an adder with carry, and with a variable base for each digit. It's a handy algorithm to have at your disposal. –  Eclipse May 22 '09 at 18:33

Actually your question is to list all subsets from a given set.

Considering the set {a,a,a,d,d,d,c,g,h,z,z}, your goal is to list all its unique subsets in order, except the empty set: {a} {a,a} {a,a,a} {a,a,a,d}

There is a quick way to list all subsets from a given set.

Let's take {ABC} as example:

``````{}     = 000
{C}    = 001
{B}    = 010
{BC}   = 011
{A}    = 100
{AC}   = 101
{AB}   = 110
{ABC}  = 111
``````

See the pattern? Simply use an integer that grows from 0 to 2^n - 1. If the i'th digit of the integer is 1, fetch the i'th element from the set.

Note: Since in your example, there are duplicates in the string; therefore after generation you might need to remove duplicates.

-
This is called the "power set". A search on Google for "c++ power set" is quite fruitful: google.com/search?q=c%2B%2B+power+set –  Alex Reynolds May 22 '09 at 4:59

Well, it seems to me that one solution that is similar to yours, but doesn't match your output (see my comments on the question, though), is simply to iterate through the list of tails of the original string (e.g., for "abc", iterate through "abc", "bc" and "c"), and for each of those generate the list of prefixes ("abc", "ab", "a", then "bc", "b", then "c"). How does this compare to what you want?

-

i used this java code (http://www.merriampark.com/comb.htm) and came up with only 383. the code generates way too many duplicates so i had to throw a lot of them away. i ended up with only 383 (please see below). you probably want to look at the c++ code for next-combinatiom in the stl (but i could not find the source anywhere easily). the power set is probably the best approach (but you may have duplicates there also).

``````a
aa
aaa
aaac
aaacg
aaacgh
aaacghz
aaacghzz
aaacgz
aaacgzz
aaach
aaachz
aaachzz
aaacz
aaaczz
aaag
aaagh
aaaghz
aaaghzz
aaagz
aaagzz
aaah
aaahz
aaahzz
aaaz
aaazz
aac
aacg
aacgh
aacghz
aacghzz
aacgz
aacgzz
aach
aachz
aachzz
aacz
aaczz
aag
aagh
aaghz
aaghzz
aagz
aagzz
aah
aahz
aahzz
aaz
aazz
ac
acg
acgh
acghz
acghzz
acgz
acgzz
ach
achz
achzz
acz
aczz
ag
agh
aghz
aghzz
agz
agzz
ah
ahz
ahzz
az
azz
c
cg
cgh
cghz
cghzz
cgz
cgzz
ch
chz
chzz
cz
czz
d
dc
dcg
dcgh
dcghz
dcghzz
dcgz
dcgzz
dch
dchz
dchzz
dcz
dczz
dd
ddc
ddcg
ddcgh
ddcghz
ddcghzz
ddcgz
ddcgzz
ddch
ddchz
ddchzz
ddcz
ddczz
ddd
dddc
dddcg
dddcgh
dddcghz
dddcghzz
dddcgz
dddcgzz
dddch
dddchz
dddchzz
dddcz
dddczz
dddg
dddgh
dddghz
dddghzz
dddgz
dddgzz
dddh
dddhz
dddhzz
dddz
dddzz
ddg
ddgh
ddghz
ddghzz
ddgz
ddgzz
ddh
ddhz
ddhzz
ddz
ddzz
dg
dgh
dghz
dghzz
dgz
dgzz
dh
dhz
dhzz
dz
dzz
g
gh
ghz
ghzz
gz
gzz
h
hz
hzz
z
zz
``````
-
The 384th result is the blank string. –  Eclipse May 22 '09 at 6:06