Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Can someone please tell how to generate n-bit strings(all possible combinations) i.e. counting bits form 0 to 2^n-1 using Divide and Conquer Approach.

I was able to do this with the following algorithm, but the space complexity as well as time complexity are of O(2^n). Can someone give me a better algorithm (using Divide and conquer) which requires less space than this.

ArrayList generate(int n)
 {
      if(n==1) 
         {  
            Create an arrayList and store strings "0" and "1";
         }
     else
    {
         generate(n-1)

         now recompose the solution to get 2^n strings and return this arraylist
         "PROBLEM here is that the length of the array list is also getting
         exponential"

    }
 }
share|improve this question

1 Answer 1

up vote 0 down vote accepted

I believe you are misunderstood. Generating a bit string is not a problem on its own, so you can not propose a solution for it. Perhaps you left out a part of the problem. For instance you might define a representation of a solution using a bit string and then try to find the optimal bit string for a given problem.

One more thing, in general the time complexity of a problem represented as an n-bit string is always O(2^n) unless the problem is defined. Then you can use problem's criteria for reducing the either complexity. But before the problem is defined, generating and traversing an n-bit string always requires you to tend to each and every single possible 2^n combination.

EDIT:

Here's a pseudocode for divide & conquer, if you must:

solution breakdown(problem p)
{
    if (smallenough(p))
    {
        return solve(p);
    }
    problem[] subproblems = divide(p);
    solution[] subsolutions;
    for (i=0; i<count(subproblems); i++)
    {
        subsolutions[i] = breakdown(subproblems[i]);
    }
    return reconstruct(subsolutions);
}
share|improve this answer
    
Yes you are right in saying that I need to find one bit string from the set of 2^n possible bit strings, but prior to finding that bit string i must be able to generate those and then see which is the most optimal of these all ( A Brute Force Approach). Thus I am faced with a problem of generating these n-bit strings using divide and conquer, Please help if u can give a divide and conquer algo for the same. I hope I have made myself clear!! –  Great Coder Sep 17 '12 at 5:50
    
Here again your solution is using space proportional to 2^n. I was even able to solve this problem with this constraint. But I want to solve this problem with space complexity O(n) and use Divide and Conquer approach –  Great Coder Sep 17 '12 at 8:23
    
Wrong! Its space complexity is not O(2^n), it's O(n)! Each (sub)problem is divided only once. This means you can have n subproblems at most. Hence the space complexity is proportional to n. –  Mehran Sep 17 '12 at 9:23
    
Actually I dont think this will lead to O(n). You have just given a Pseudo code, It will be great if u can try to build a working code using the pseudo code (may be in Java--its easy there), and then we can verify –  Great Coder Sep 17 '12 at 14:14

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.