1

I have a simple question but it makes me confused.

I have two strings, and I want to count how many different characters between the two. The strings are sorted, equal length. Do not split the strings.

For example

input:  abc, bcd
output: 2, because a and d are different characters

input:  abce, bccd
output: 4, because a, c, d and e are different.

I know I can do it in O(N^2), but how can I solve it in O(N) for these sorted strings?

Only need the number of different characters, no need to indicate which number.

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  • 1
    Are both only alphanumeric chars? So you can make histogram of those chars (histograms for both strings separately). Then just compare histogram columns of zero elements. (O(n) + O(n) + O(very small m*m)) Mar 28, 2015 at 20:43
  • "I know I can do it in O(N2)" How are you doing so? You probably can't do it (sorted strings or not), to catch all of the differences. Mar 28, 2015 at 20:43
  • 1
    @πάντα ῥεῖ "How are you doing so?" By using fingers. Mar 28, 2015 at 20:46
  • @VladfromMoscow You do jokes now instead of providing answers for LQ questions? Well, you seem to improve now. Mar 28, 2015 at 20:48
  • @πάνταῥεῖ Huh? Why not something like this?
    – dyp
    Mar 28, 2015 at 20:55

4 Answers 4

3

I was originally thinking that you needed a fairly complicated algorithm, like Smith-Waterman for example. But the restrictions on your input makes it fairly easy to implement this in O(m + n), where m is the length of the first string, and n is the length of the second string.

We can use a builtin algorithm to calculate the number of characters that are in common, and then we can use that information to produce the number you are looking for:

#include <algorithm>
#include <iostream>
#include <string>

int main() {
    std::string m = "abce";
    std::string n = "bccd";
    std::string result;

    std::set_intersection(
            m.begin(), m.end(),
            n.begin(), n.end(),
            std::back_inserter(result));

    std::cout << m.size() + n.size() - 2 * result.size() << "\n";
}

In this particular case, it outputs 4, as you wanted.

2
  • If you only need the number, but not the different characters, you can write an algorithm that doesn't need memory allocations: coliru.stacked-crooked.com/a/909d1f4747991164
    – dyp
    Mar 28, 2015 at 21:15
  • @dyp: Absolutely. We could also write an output iterator that just counts how many times it was incremented. But it is pretty nice to solve these problems in 2 lines of code.
    – Bill Lynch
    Mar 28, 2015 at 21:16
1

After seeing how simple the answer really is, thanks to @Bill Lynch , my solution may be too complex! Anyways, its a simple counting-difference.

#include <iostream>
#include <algorithm>
#include <array>

int main() {
    std::array<int,26> str1 = {};
    std::array<int,26> str2 = {};

    std::string s1("abce");
    std::string s2("bccd");


    for(char c : s1)
        ++str1[c-'a'];
    for(char c : s2)
        ++str2[c-'a'];

    int index = 0;

    std::cout << std::count_if(str1.begin(),str1.end(),[&](int x)
    {
        return x != str2[index++];
    });
}

Its O(n+m), unless I've made a mistake in the analysis.

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  • 1
    Wow, good point. How in the world could I let that go. Thanks!
    – Alejandro
    Mar 28, 2015 at 21:22
  • I did notice that, which is why I did the str1.fill(0) and str2.fill(0) calls, but yes, the braced initializer is much cleaner. Thanks for pointing that out.
    – Alejandro
    Mar 28, 2015 at 21:25
0

you can achieve O(n) using dynamic programming. i.e. use an integer d for storing difference.

Algo:
move from lower index to higher index of both array.  
if a[i] not equal b[j]:
           increase d by 2
           move the index of smaller array and check again.
if a[i] is equal to b[j] : 
           decrease d by 1
           move both index
repeat this until reach the end of array
-1

O(2n) and O(n) are exactly the same thing, since the "O" indicates the asymptotic behavior for the cost of your method.

Update: I just noticed you meant O(n^2) with your O(N2).

If you need to do that comparison, you'll always have O(n^2) as your cost, since you have to:

1) Loop for every character of your words, and this is O(n)

2) Compare the current character in each word, and you'll have to use a temporary list that contains the characters you have already checked. So, this is another nested O(n).

So, O(n) * O(n) = O(n^2).

Note: you can always ignore a numeric coefficient inside your O expression, as it doesn't matter.

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  • 1
    "O(2n)" The OP probably meant O(n^2). Mar 28, 2015 at 20:46
  • @Sergio0694: As seen in the comments and in my answer, you can solve this problem in fewer than O(n^2) comparisons.
    – Bill Lynch
    Mar 28, 2015 at 21:19

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