0

I have this array, for example (the size is variable):

x = ["10111", "10122", "10250", "10113"]

I need to find the longest string that is a substring of each array element ("10" in this case) (it need not to be a prefix of the strings). I have to remove it from all the strings. The output for this example would be:

x=["111","222","250","113"] //common value = "10"
12
  • 2
    Is the most common substring supposed to be at the beginning? Also, is this homework? Sep 23, 2013 at 6:47
  • 1
    Have you tried anything so far? Sep 23, 2013 at 6:50
  • Go through posts at geeksforgeeks.org
    – 0xF1
    Sep 23, 2013 at 6:53
  • 4
    The most common substring in your example is 1. This appears 10 times. 10 appears only 4 times.
    – Lee Taylor
    Sep 23, 2013 at 7:14
  • Is the most common substring one that must be contained in all arrays or the one that is most common? Sep 23, 2013 at 7:18

3 Answers 3

5

This extension finds the longest most common substring(s). Note that "1" is also contained in every string even more often than "10". (C# only):

public static class StringExtensions
{
    public static IEnumerable<string> GetMostCommonSubstrings(this IList<string> strings)
    {
        if (strings == null)
            throw new ArgumentNullException("strings");
        if (!strings.Any() || strings.Any(s => string.IsNullOrEmpty(s)))
            throw new ArgumentException("None string must be empty", "strings");

        var allSubstrings = new List<List<string>>();
        for (int i = 0; i < strings.Count; i++)
        {
            var substrings = new List<string>();
            string str = strings[i];
            for (int c = 0; c < str.Length - 1; c++)
            {
                for (int cc = 1; c + cc <= str.Length; cc++)
                {
                    string substr = str.Substring(c, cc);
                    if (allSubstrings.Count < 1 || allSubstrings.Last().Contains(substr))
                        substrings.Add(substr);
                }
            }
            allSubstrings.Add(substrings);
        }
        if (allSubstrings.Last().Any())
        {
            var mostCommon = allSubstrings.Last()
                .GroupBy(str => str)
                .OrderByDescending(g => g.Key.Length)
                .ThenByDescending(g => g.Count())
                .Select(g => g.Key);
            return mostCommon;
        }
        return Enumerable.Empty<string>();
    }
}

Now it's easy:

string[] x = new[] { "10111", "10122", "10250", "10113" };
string mostCommonSubstring = x.GetMostCommonSubstrings().FirstOrDefault();
if (mostCommonSubstring != null)
{
    for (int i = 0; i < x.Length; i++)
        x[i] = x[i].Replace(mostCommonSubstring, "");
}
Console.Write(string.Join(", ", x));

output:

111, 122, 250, 113

DEMO


Edit: If you just want to find the longest common substring without taking the frequency of occurrence into account you can use this optimzed approach(O(n) operation) using a HashSet<string>:

public static string GetLongestCommonSubstring(this IList<string> strings)
{
    if (strings == null)
        throw new ArgumentNullException("strings");
    if (!strings.Any() || strings.Any(s => string.IsNullOrEmpty(s)))
        throw new ArgumentException("None string must be empty", "strings");

    var commonSubstrings = new HashSet<string>(strings[0].GetSubstrings());
    foreach (string str in strings.Skip(1))
    {
        commonSubstrings.IntersectWith(str.GetSubstrings());
        if (commonSubstrings.Count == 0)
            return null;
    }
    return commonSubstrings.OrderByDescending(s => s.Length).First();
}

public static IEnumerable<string> GetSubstrings(this string str)
{
    if (string.IsNullOrEmpty(str))
        throw new ArgumentException("str must not be null or empty", "str");

    for (int c = 0; c < str.Length - 1; c++)
    {
        for (int cc = 1; c + cc <= str.Length; cc++)
        {
            yield return str.Substring(c, cc);
        }
    }
}

Use it in this way:

string[] x = new[] { "101133110", "101233210", "102533010", "101331310" };
string longestCommon = x.GetLongestCommonSubstring();  // "10"
10
  • this works perfect, I suppose it is a basic algorithm where we find the sub-string combinations of a string and check with the substrings of the rest(eliminating unnecessary). Thanks. Let me know if you can improve the algorithm. As of now this works for me.
    – whysai
    Sep 23, 2013 at 9:20
  • @user1785050: There's always room for improvement. However, until performance is not a real issue i would keep it as it is since unnecessary micro-optimization makes code less readable and maintainable. Sep 23, 2013 at 9:25
  • What is the purpose of allSubstrings.Last().Contains(substr) in the if statement? You are collecting strings for consideration only if they are substrings of the most recent previously collected string? What happens with “111”, “222”, “222”? Will the “222” strings not be collected, even though they are more common? Sep 23, 2013 at 10:45
  • What does “longest most common substring” mean? If it means the longest of the substrings that are tied for most common, it would be “1” in the given strings. How can this phrase refer to the “10” the OP seeks? Sep 23, 2013 at 10:48
  • @EricPostpischil: No, "222" will be omitted since it is one constraint that all strings must contain this substring. That's also the reason why i just have to look at the last substring collection to find all common substrings. Sep 23, 2013 at 10:50
1

Try this: (I suppose the common string should be at the beginning):

string[] x = {"10111","10222","10250","10113"};
string common = x[0];
foreach(var i in x){
  while(!i.StartsWith(common)){
    common = common.Substring(0,common.Length-1);
    if(common == "") break;
  }
}
x = x.Select(a=>a.Substring(common.Length)).ToArray();
2
  • This works only if they begin every time with 10. With this sequence for example it does not work: {"11110","12210","11210","22110"};
    – user2704193
    Sep 23, 2013 at 7:29
  • @Regu I stated clearly that I suppose the common string should be at the beginning, that's because the OP didn't make it clear
    – King King
    Sep 23, 2013 at 7:31
1

Find the maximum number of times a substring of length 1 appears. This is a simple O(n^2) search. Call this maximum number of occurrence K.

In your example, this is "1", "0", and K=5.

Now you know that all substrings of length 2 cannot appear in more than K input strings. Also, any substring that occurs K times must be made of the length 1 substrings that occured K times. Search the length 1 substrings for substrings of length 2 that exist K times, this is again a simple O(n^2) search.

Repeat for longer lengths until no more substrings exist in K inputs.

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