Combination of List<List<int>>

I've a List of this type List> that contains this

``````List<int> A = new List<int> {1, 2, 3, 4, 5};
List<int> B = new List<int> {0, 1};
List<int> C = new List<int> {6};
List<int> X = new List<int> {....,....};
``````

I want to have all combinations like this

``````1-0-6
1-1-6
2-0-6
2-1-6
3-0-6
``````

and so on.

According to you is This possibile to resolve using Linq?

• It's a cross product, trust Garry answer, it will do it. Feb 13, 2009 at 12:31
• Are the number of dimensions fixed at 3? Or (from the X) is this dynamic? Feb 13, 2009 at 12:34

It's quite similar to this answer I gave to another question:

``````var combinations = from a in A
from b in B
from c in C
orderby a, b, c
select new List<int> { a, b, c };

var x = combinations.ToList();
``````

For a variable number of inputs, now with added generics:

``````var x = AllCombinationsOf(A, B, C);

public static List<List<T>> AllCombinationsOf<T>(params List<T>[] sets)
{
// need array bounds checking etc for production
var combinations = new List<List<T>>();

// prime the data
foreach (var value in sets[0])

foreach (var set in sets.Skip(1))

return combinations;
}

(List<List<T>> combinations, List<T> set)
{
var newCombinations = from value in set
from combination in combinations
select new List<T>(combination) { value };

return newCombinations.ToList();
}
``````
• I don't think that works... I believe (from the X) that the OP means that the number of items in the list (and thus the number of dimensions) is dynamic Feb 13, 2009 at 12:33
• Hmmm, it's still possible based on my other references answer, you could just take a paramarray of sets and build it up. I'll ask for clarification in a comment. Feb 13, 2009 at 12:34
• I see you beat me to doing just that! Feb 13, 2009 at 12:35
• Yes guys the number of items is dynamic! Feb 13, 2009 at 13:51
• I see - you repeatedly cross 2 lists at a time in the loop - cute. Feb 13, 2009 at 13:56

If the number of dimensions is fixed, this is simply `SelectMany`:

``````var qry = from a in A
from b in B
from c in C
select new {A=a,B=b,C=c};
``````

However, if the number of dimensions is controlled by the data, you need to use recursion:

``````static void Main() {
List<List<int>> outerList = new List<List<int>>
{   new List<int>(){1, 2, 3, 4, 5},
new List<int>(){0, 1},
new List<int>(){6,3},
new List<int>(){1,3,5}
};
int[] result = new int[outerList.Count];
Recurse(result, 0, outerList);
}
static void Recurse<TList>(int[] selected, int index,
IEnumerable<TList> remaining) where TList : IEnumerable<int> {
IEnumerable<int> nextList = remaining.FirstOrDefault();
if (nextList == null) {
StringBuilder sb = new StringBuilder();
foreach (int i in selected) {
sb.Append(i).Append(',');
}
if (sb.Length > 0) sb.Length--;
Console.WriteLine(sb);
} else {
foreach (int i in nextList) {
selected[index] = i;
Recurse(selected, index + 1, remaining.Skip(1));
}
}
}
``````
• I managed it in a different manner that may be more readable depending on your viewpoint. What do you think? Feb 13, 2009 at 13:32

How about following way of generating combinations using .Join method?

``````static void Main()
{
List<List<int>> collectionOfSeries = new List<List<int>>
{   new List<int>(){1, 2, 3, 4, 5},
new List<int>(){0, 1},
new List<int>(){6,3},
new List<int>(){1,3,5}
};
int[] result = new int[collectionOfSeries.Count];

List<List<int>> combinations = GenerateCombinations(collectionOfSeries);

Display(combinations);
}
``````

This Method GenerateCombinations(..) does main work of generating combinations. This method is generic so could be used for generating combinations of any type.

``````private static List<List<T>> GenerateCombinations<T>(
List<List<T>> collectionOfSeries)
{
List<List<T>> generatedCombinations =
collectionOfSeries.Take(1)
.FirstOrDefault()
.Select(i => (new T[]{i}).ToList())
.ToList();

foreach (List<T> series in collectionOfSeries.Skip(1))
{
generatedCombinations =
generatedCombinations
.Join(series as List<T>,
combination => true,
i => true,
(combination, i) =>
{
List<T> nextLevelCombination =
new List<T>(combination);
return nextLevelCombination;
}).ToList();

}

return generatedCombinations;
}
``````

Display helper..

``````private static void Display<T>(List<List<T>> generatedCombinations)
{
int index = 0;
foreach (var generatedCombination in generatedCombinations)
{
Console.Write("{0}\t:", ++index);
foreach (var i in generatedCombination)
{
Console.Write("{0,3}", i);
}
Console.WriteLine();
}
}
``````
• Excellent solution. Nov 18, 2017 at 11:20
``````//Done in 2 while loops. No recursion required
#include<stdio.h>
#define MAX 100
typedef struct list
{
int elements[MAX];
}list;
list n[10];
int number,count[10],temp[10];
void print();
int main()
{
int i,j,mult=1,mult_count;
printf("Enter the number of lists - ");
scanf("%d",&number);
for(i=0;i<number;i++)
{
printf("Enter the number of elements - ");
scanf("%d",&count[i]);
for(j=0;i<count[i];j++)
{
printf("Enter element %d - "j);
scanf("%d",&n[i].elements[j]);
}
}
for(i=0;i<number;i++)
temp[i]=0;
for(i=0;i<number;i++)
mult*=count[i];
printf("%d\n",mult);
mult_count=0;
while(1)
{
print();
mult_count++;
if(mult_count==mult)
break;
i=0;
while(1)
{
temp[i]++;
if(temp[i]==count[i])
{
temp[i]=0;
i++;
}
else break;
}
}
return 0;
}
void print()
{
int i;
for(i=0;i<number;i++)
{
printf("%d\n",n[i].elements[temp[i]]);
printf("\n");
}
}
``````

Great solution from Abhijeet Nagre. Small improvement in case when some serie is empty or series are empty.

``````List<List<T>> generatedCombinations =
collectionOfSeries.Where(l => l.Any())
.Take(1)
.DefaultIfEmpty(new List<T>())
.First()
.Select(i => (new T[]{i}).ToList())
.ToList();
``````

Just for fun:

``````using CSScriptLibrary;
using System;
using System.Collections.Generic;

namespace LinqStringTest
{
public class Program
{
static void Main(string[] args)
{

var lists = new List<List<int>>() {
new List<int> { 0, 1, 2, 3 },
new List<int> { 4, 5 },
new List<int> { 6, 7 },
new List<int> { 10,11,12 },
};
var code = GetCode(lists);

var result = (IEnumerable<dynamic>)scriptAsm.Invoke("Script.LinqCombine", lists);

foreach (var item in result)
{
Console.WriteLine(item);
}

}

private static string GetCode(List<List<int>> listsToCombine)
{
var froms = "";
var selects = "";

for (int i = 0; i < listsToCombine.Count; i++)
{
froms += string.Format("from d{0} in lists[{0}]{1}", i, Environment.NewLine);
selects += string.Format("D{0} = d{0},", i);
}

return @"using System;
using System.Linq;
using System.Collections.Generic;
public class Script
{
public static IEnumerable<dynamic> LinqCombine(List<List<int>> lists)
{
var x = " + froms + @"
select new { " + selects + @" };
return x;
}
}";
}
}
}
``````
``````    public static List<List<string>> CrossProduct(List<List<string>> s)
{
if (!s.Any())
return new List<List<string>>();

var c1 = s.First();
var cRest = s.Skip(1).ToList();
var sss = from v1 in c1
from vRest in CrossProduct(cRest)
select (new[] { v1 }.Concat(vRest)).ToList();
var r = sss.ToList();
return r;
}
``````

Solution without Linq and recursion:

``````private List<List<T>> GetAllCombinations<T>(List<List<T>> source)
{
List<List<T>> result = new List<List<T>>();

foreach (var value in source[0])
{
}

for (int i = 1; i < source.Count; i++)
{
var resultCount = result.Count;

for (int j = 1; j < source[i].Count; j++)
{
for (var k = 0; k < resultCount; k++)
{
}
}

var t = (result.Count / source[i].Count);

for (int j = 0; j < source[i].Count; j++)
{
for (int k = 0; k < t; k++)
{
}
}
}

return result;
}
``````

Generates all combinations from the input lists

``````var combinations = AllCombinationsOf(A, B, C);

public static IEnumerable<List<T>> AllCombinationsOf<T>(params List<T>[] inputs)
{
var seed = Enumerable.Repeat(new List<T>(), 1);
return inputs.Aggregate(seed, CreateCombinations);
}

private static IEnumerable<List<T>> CreateCombinations<T>(IEnumerable<List<T>> oldCombinations, List<T> newValues)
=>  from value in newValues
from combination in oldCombinations
select new List<T>(combination) {value};
``````

Simplified version of this answer by @Garry Shutler.

Try it online! (test cases included along with the question's example)