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This Question was asked to me at the Google interview. I could do it O(n*n) ... Can I do it in better time. A string can be formed only by 1 and 0.

Definition:

X & Y are strings formed by 0 or 1

D(X,Y) = Remove the things common at the start from both X & Y. Then add the remaining lengths from both the strings.

For e.g.

D(1111, 1000) = Only First alphabet is common. So the remaining string is 111 & 000. Therefore the result length("111") & length("000") = 3 + 3 = 6

D(101, 1100) = Only First two alphabets are common. So the remaining string is 01 & 100. Therefore the result length("01") & length("100") = 2 + 3 = 5

It is pretty that obvious that do find out such a crazy distance is going to be linear. O(m).

Now the question is

given n input, say like

1111
1000
101
1100

Find out the maximum crazy distance possible.

n is the number of input strings. m is the max length of any input string.

The solution of O(n2 * m) is pretty simple. Can it be done in a better way? Let's assume that m is fixed. Can we do this in better than O(n^2) ?

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I was thinking that I can sort all of them. But even then i am not able proceed anywhere. Can anyone please guide me with the approach to this problem. –  user1540945 Feb 25 '13 at 7:23
    
@Dukeling : Thanks for editing. Is it possible for you help me with the approach. –  user1540945 Feb 25 '13 at 7:28
    
Then sorting will be part of the algorithm too. If list is sorted then just check consecutive elements for crazy distance & the hence maximum. However, I don't think sorting is the only way. –  SparKot ॐ Feb 25 '13 at 7:34
2  
DoSparKot, counter-example to what you propose: what about "000", "001", "0010"? Sorting them lexicographically, and then checking the distance between consecutive elements, give D(000, 001) = len("0") + len("1") = 2, D(001, 0010) = len("") + len("0") = 1, but D(000, 0010) = len("0") + len("10") = 3. –  Bruno Reis Feb 25 '13 at 7:43
1  
Over here I am referring to 'n' as the number of strings. To find out the maximum crazy distance, I will have to compare it with the remaining n-1 strings. Therefore, the complexity is going to O(n^2) –  user1540945 Feb 25 '13 at 7:55

5 Answers 5

Put the strings into a tree, where 0 means go left and 1 means go right. So for example

1111
1000
101
1100

would result in a tree like

        Root
             1
          0     1
         0 1*  0  1
        0*    0*    1*

where the * means that an element ends there. Constructing this tree clearly takes O(n m).

Now we have to find the diameter of the tree (the longest path between two nodes, which is the same thing as the "crazy distance"). The optimized algorithm presented there hits each node in the tree once. There are at most min(n m, 2^m) such nodes.

So if n m < 2^m, then the the algorithm is O(n m).

If n m > 2^m (and we necessarily have repeated inputs), then the algorithm is still O(n m) from the first step.

This also works for strings with a general alphabet; for an alphabet with k letters build a k-ary tree, in which case the runtime is still O(n m) by the same reasoning, though it takes k times as much memory.

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1  
Looks like you coded 110 instead of 1100. Anyways, great solution. +1 –  Bruno Reis Feb 25 '13 at 8:18
    
@BrunoReis Whoops! Fixed. –  Dougal Feb 25 '13 at 8:19
    
I have a doubt. How can you guarantee that Diameter of the tree will be the crazy distance? Because we are deleting the Prefix from the tree. So, that changes the dynamics. –  user1540945 Feb 25 '13 at 8:45
    
But that's exactly what the crazy distance is: after considering the common prefix, how long is each string? The common prefix is the common ancestor of the two strings in the tree, and their lengths after that deletion is the same thing as their depth in the tree below the common ancestor. –  Dougal Feb 25 '13 at 8:46
1  
This is a trie. –  keyser Sep 27 at 17:20

I think this is possible in O(nm) time by creating a binary tree where each bit in a string encodes the path (0 left, 1 right). Then finding the maximum distance between nodes of the tree which can be done in O(n) time.

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I'm always surprised when a question's been up for an hour and then two people post the exact same answer within 30 seconds of each other... :) –  Dougal Feb 25 '13 at 8:15
    
hatching period :) you beat me though –  perreal Feb 25 '13 at 8:16
    
LOL... Even i too was surprised... Thanks guys. I knew this Diameter thing. But I could not apply it.. :( :( ... Thanks guys. –  user1540945 Feb 25 '13 at 8:19
    
I have a doubt. How can you guarantee that Diameter of the tree will be the crazy distance? Because we are deleting the Prefix from the tree. So, that changes the dynamics. –  user1540945 Feb 25 '13 at 8:46
    
@user1540945, if the strings have common prefixes then they will branch out at the point where they differ. So, the distance between them will not contain the common prefix. –  perreal Feb 25 '13 at 8:50

This is my solution, I think it works:

  1. Create a binary tree from all strings. The tree will be constructed in this way: at every round, select a string and add it to the tree. so for your example, the tree will be:

                      <root>
              <1>            <empty>
     <1>            <0>
    

    <1> <0> <1> <0> <1> <0> <0>

So each path from root to a leaf will represent a string.

  1. Now the distance between each two leaves is the distance between two strings. To find the crazy distance, you must find the diameter of this graph, that you can do it easily by dfs or bfs.

The total complexity of this algorithm is: O(n*m) + O(n*m) = O(n*m).

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1  
See the link in the answers by perreal and me for an O(n) algorithm to find the diameter. Doesn't change the overall runtime though. –  Dougal Feb 25 '13 at 8:24
1  
on the link, n is the number of nodes so here we have n*m nodes. is that right ? or I'm wrong ? (thanks in advance) –  Majid Darabi Feb 25 '13 at 8:27
    
Hmm - yeah, you're right, it needs to hit each node in the tree, for O(n m). Well, technically it's O(n m'), where m' is the mean length (rather than the max length), but so is the tree construction step. –  Dougal Feb 25 '13 at 8:29
    
thank you. m*n is the worst case but in average you are right. –  Majid Darabi Feb 25 '13 at 8:31
1  
Actually, no, it's not quite either of those things. The number of nodes in the tree is upper-bounded by min(n m, 2^m). –  Dougal Feb 25 '13 at 8:33

I think this problem is something like "find prefix for two strings", you can use trie(http://en.wikipedia.org/wiki/Trie) to accerlate searching

I have a google phone interview 3 days before, but maybe I failed...

Best luck to you

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To get an answer in O(nm) just iterate across the characters of all string (this is an O(n) operation). We will compare at most m characters, so this will be done O(m). This gives a total of O(nm). Here's a C++ solution:

int max_distance(char** strings, int numstrings, int &distance) {
    distance = 0;
    // loop O(n) for initialization
    for (int i=0; i<numstrings; i++) 
        distance += strlen(strings[i]);

    int max_prefix = 0;
    bool done = false;
    // loop max O(m)
    while (!done) {
        int c = -1;
        // loop O(n)
        for (int i=0; i<numstrings; i++) {
            if (strings[i][max_prefix] == 0) {
                done = true; // it is enough to reach the end of one string to be done
                break;  
            }

            int new_element = strings[i][max_prefix] - '0';
            if (-1 == c)
                c = new_element;
            else {
                if (c != new_element) {
                    done = true;    // mismatch
                     break;
                }
            }
        }
        if (!done) {
            max_prefix++;
            distance -= numstrings;
        }
    }

    return max_prefix;
}


void test_misc() {
    char* strings[] = { 
        "10100",
        "10101110",
        "101011",
        "101"
    };

    std::cout << std::endl;
    int distance = 0;
    std::cout << "max_prefix = " << max_distance(strings, sizeof(strings)/sizeof(strings[0]), distance) << std::endl;
}
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