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.

  • 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


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;

            m.begin(), m.end(),
            n.begin(), n.end(),

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

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

  • 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

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)
    for(char c : s2)

    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.

  • 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

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

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

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.

  • 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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