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Let's assume we will consider binary numbers which has length 2n and n might be about 1000. We are looking for kth number (k is limited by 10^9) which has following properties:

  • Amount of 1's is equal to amount of 0's what can be described as following: #(1) = #(0)
  • Every prefix of this number has to contain atleast as much 0's as 1's. It might be easier to understand it after negating the sentence, which is: There is no prefix which would contain more 1's than 0's.

And basically that's it. So to make it clear let's do some example: n=2, k=2 we have to take binary number of length 2n:

and so on...

And now we have to find 2nd number which fulfill those two requirements. So we see 0011 is the first one, and 0101 is second one. If we change k=3, then answer doesn't exist since there are number which have same amount of opposite bits, but for 0110, there is prefix 011 so number doesn't fulfill second constraint and same would be with all numbers which has 1 as most significant bit.

So what I did so far to find algorithm?

Well my first idea was to generate all possible bits settings, and check whether it has those two properties, but generate them all would take O(2^(2n)) which is not an option for n=1000.

Additionally I realize there is no need to check all numbers which are smaller than 0011 for n=2, 000111 for n=3, and so on... frankly speaking those which half of most significant bits remains "untouched" because those numbers have no possibility to fulfill #(1) = #(0) condition. Using that I can reduce n by half, but it doesn't help much. Instead of 2 * forever I have forever running algorithm. It's still O(2^n) complexity, which is way too big.

Any idea for algorithm?


This text has been created as a result of my thoughts after reading Andy Jones post.

First of all I wouldn't post code I have used since it's point 6 in following document from Andy's post Kasa 2009. All you have to do is consider nr as that what I described as k. Unranking Dyck words algorithm, would help us find out answer much faster. However it has one bottleneck.

while (k >= C(n-i,j))

Considering that n <= 1000, Catalan number can be quite huge, even C(999,999). We can use some big number arithmetic, but on the other hand I came up with little trick to overpass it and use standard integer.

We don't want to know how big actually Catalan number is as long as it's bigger than k. So now we will create Catalan numbers caching partial sums in n x n table.

...                                     ...
5 |                              42     ...
4 |                        14    42     ...
3 |                   5    14    28     ...
2 |             2     5     9    14     ...
1 |       1     2     3     4     5     ...
0 | 1     1     1     1     1     1     ...
   ----------------------------------   ...
    0     1     2     3     4     5     ...

To generate it is quite trivial:

C(x,0) = 1
C(x,y) = C(x,y-1) + C(x-1,y)  where y > 0 && y < x
C(x,y) = C(x,y-1) where x == y

So what we can see only this:

C(x,y) = C(x,y-1) + C(x-1,y)  where y > 0 && y < x

can cause overflow.

Let's stop at this point and provide definition.

k-flow - it's not real overflow of integer but rather information that value of C(x,y) is bigger than k.

My idea is to check after each running of above formula whether C(x,y) is grater than k or any of sum components is -1. If it is we put -1 instead, which would act as a marker, that k-flow has happened. I guess it quite obvious that if k-flow number is sum up with any positive number it's still be k-flowed in particular sum of 2 k-flowed numbers is k-flowed.

The last what we have to prove is that there is no possibility to create real overflow. Real overflow might only happen if we sum up a + b which non of them is k-flowed but as sum they generated the real overflow.

Of course it's impossible since maximum value can be described as a + b <= 2 * k <= 2*10^9 <= 2,147,483,647 where last value in this inequality is value of int with sign. I assume also that int has 32 bits, as in my case.

share|improve this question
I haven't got a full solution, but thinking about it a bit I feel like you can build strings like this up by deciding n places to put the 1's, starting from the right side, and a rule that you can only place 0's if you have that many 1's already there. For example, if you have ???101, you've placed two 1's and one 0. Therefore you can only place up to one more 0 before placing another 1. Might be a start... – pandubear Dec 16 '13 at 0:29
What is the limit for k? – rendon Dec 16 '13 at 0:43
k is limited by 10^9. I have updated question. – abc Dec 16 '13 at 0:45
Ok, so basically, you have the first number that matches k=3 is 000111 so the second number would be 000111 + 111 which is 01110 and for k=4 you will have 00001111 then add 1111 to it so you got the second matching number which is 00011110 and so on and so forth. correct me if I'm wrong. – mamdouh alramadan Dec 16 '13 at 2:12
This is partly a combinatorics problem and as such you might get some good insight by asking on Just replace your 0s and 1s with As and Bs and don't mention the word "binary" ;-) – Digital Trauma Dec 16 '13 at 3:08
up vote 4 down vote accepted

The numbers you are describing correspond to Dyck words. Pt 2 of Kasa 2009 gives a simple algorithm for enumerating them in lexicographic order. Its references should be helpful if you want to do any further reading.

As an aside (and be warned I'm half asleep as I write this, so it might be wrong), the wikipedia article notes that the number of Dyck words of length 2n is the n th Catalan number, C(n). You might want to find the smallest n such that C(n) is larger than the k you're looking for, and then enumerate Dyck words starting from X^n Y^n.

share|improve this answer
I will search information about it and try to figure out myself and if I won't succeed I will back for sure so +1 ATM. – abc Dec 16 '13 at 13:20
Problem solved. Generation one by one was too slow, but based on that document and knowledge after reading about Catalan numbers I worked out faster algorithm. – abc Dec 18 '13 at 21:49
Mind sharing the algorithm or code you settled for, in case anyone else needs to solve the same problem? – Andy Jones Dec 18 '13 at 21:59
I have edited question and share an idea as you suggest. – abc Dec 19 '13 at 0:24

I'm sorry for misunderstood this problem last time, so I edit it and now I can promise the correction and you can test the code first, the complexity is O(n^2), the detail answer is follow

First, we can equal the problem to the next one

We are looking for kth largest number (k is limited by 10^9) which has following properties:

  • Amount of 1's is equal to amount of 0's what can be described as following: #(1) = #(0)
  • Every prefix of this number has to contain at least as much [[1's as 0's]], which means: There is no prefix which would contain more [[0's than 1's]].

Let's give an example to explain it: let n=3 and k=4, the amount of satisfied numbers is 5, and the picture below has explain what we should determine in previous problem and new problem:

|                       000111  ------>    111000                          ^
|                       001011  ------>    110100                          |
|                       001101  ------>    110010                          |
|  previous 4th number  010011  ------>    101100  new 4th largest number  |
v                       010101  ------>    101010                          |

so after we solve the new problem, we just need to bitwise not.

Now the main problem is how to solve the new problem. First, let A be the array, so A[m]{1<=m<=2n} only can be 1 or 0, let DP[v][q] be the amount of numbers which satisfy condition2 and condition #(1)=q in {A[2n-v+1]~A[2n]}, so the DP[2n][n] is the amount of satisfied numbers.

A[1] only can be 1 or 0, if A[1]=1, the amount of numbers is DP[2n-1][n-1], if A[1]=0, the amount of numbers is DP[2n-1][n], now we want to find the kth largest number, if k<=DP[2n-1][n-1], kth largest number's A[1] must be 1, then we can judge A[2] with DP[2n-2][n-2]; if k>DP[2n-1][n-1], kth largest number's A[1] must be 0 and k=k-DP[2n-1][n-1], then we can judge A[2] with DP[2n-2][n-1]. So with the same theory, we can judge A[j] one by one until there is no number to compare. Now we can give a example to understand (n=3, k=4)

(We use dynamic programming to determine DP matrix, the DP equation is DP[v][q]=DP[v-1][q-1]+DP[v-1][q])

   Intention: we need the number in leftest row can be compared,
              so we add a row on DP's left row, but it's not include by DP matrix
              in the row, all the number is 1.
              the number include by bracket are initialized by ourselves
              the theory of initialize just follow the mean of DP matrix

   DP matrix = (1) (0) (0) (0)                4<=DP[5][2]=5  -->  A[1]=1
               (1) (1) (0) (0)                4>DP[4][1]=3  -->  A[2]=0, k=4-3=1
               (1) (2) (0) (0)                1<=DP[3][1]=3  -->  A[3]=1
               (1) (3)  2  (0)                1<=1  -->  a[4]=1
               (1) (4)  5  (0)                no number to compare, A[5]~A[6]=0
               (1) (5)  9   5                 so the number is 101100

If you have not understand clearly, you can use the code to understand

IntentionDP[2n][n] increase very fast, so the code can only work when n<=19, in the problem n<1000, so you can use big number programming, and the code can be optimize by bit operation, so the code is just a reference

    Environment: X86 Ubuntu GCC 
    Author: Cong Yu 
    Build_Date: Mon Dec 16 21:52:49 CST 2013 

#include <stdio.h>

int DP[2000][1000];
// kth is the result
int kth[1000];

void Oper(int n, int k){
    int i,j,h;
    // temp is the compare number
    // jishu is the 
    int temp,jishu=0;

    // initialize

    // operate DP matrix with dynamic programming

    // the main thought


int main(){
    int n,k;
    return 0;
share|improve this answer
Print all kth number? There is always only one. As input I have given n which is bits number times two and k which tells me what number we looking for as output we have to write one line containing the number (as binary). – abc Dec 16 '13 at 13:19
@Kostek: I have change my answer, you can have a look – AImager Dec 17 '13 at 3:49

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