Given an array S of n integers, are there elements a, b, c, and d in S such that a + b + c + d = target? Find all unique quadruplets in the array which gives the sum of target.
Note:
- Elements in a quadruplet (a,b,c,d) must be in non-descending order. (ie, a ? b ? c ? d)
- The solution set must not contain duplicate quadruplets.
For example, given array S = {1 0 -1 0 -2 2}, and target = 0.
A solution set is:
(-1, 0, 0, 1)
(-2, -1, 1, 2)
(-2, 0, 0, 2)
First solution (based on 3 sum). O(n^3).
public class Solution {
public ArrayList<ArrayList<Integer>> fourSum(int[] num, int target) {
// Start typing your Java solution below
// DO NOT write main() function
ArrayList<ArrayList<Integer>> res = new ArrayList<ArrayList<Integer>>();
if (num.length < 4)
return res;
ArrayList<Integer> inner;
Arrays.sort(num);
int first, second, left, right, sum;
for (int i = 0; i < num.length - 2;) {
first = num[i];
for (int j = i + 1; j < num.length;) {
second = num[j];
left = j + 1;
right = num.length - 1;
while (left < right) {
sum = first + second + num[left] + num[right];
if (sum == target) {
inner = new ArrayList<Integer>();
inner.add(first);
inner.add(second);
inner.add(num[left]);
inner.add(num[right]);
res.add(inner);
int temp = num[left];
while (left < right && temp == num[left])
left++;
temp = num[right];
while (left < right && temp == num[right])
right--;
} else if (sum > target) {
right--;
} else
left++;
}
while (++j < num.length && num[j] == second);
}
while (++i < num.length && num[i] == first);
}
return res;
}
}Second solution. Find sums for each two elements, then find two 2-sum equal to target. O(n^2 * lgn). Finish later.
Following one is not good enough though. Passed judge small, failed on large judge. O( ((n-1)n)^2 ).
For O(n^2 lgn), need a sorting method for two_sums, and use similar O(n) method to find a match. Maybe finish later.
import java.util.Iterator;
public class Solution {
public ArrayList<ArrayList<Integer>> fourSum(int[] num, int target) {
// Start typing your Java solution below
// DO NOT write main() function
ArrayList<ArrayList<Integer>> res = new ArrayList<ArrayList<Integer>>();
ArrayList<Integer> inner;
HashSet<ArrayList<Integer>> hashset = new HashSet<ArrayList<Integer>>();
if (num.length < 4)
return res;
int n = num.length, k = 0;
int len = (n - 1) * n / 2;
Sums[] two_sums = new Sums[len];
int[] result_set = new int[4];
for (int i = 0; i < num.length; i++) {// rows
for (int j = i + 1; j < num.length; j++) {// columns
two_sums[k++] = new Sums(num[i] + num[j], i, j);
}
}
for (int i = 0; i < two_sums.length; i++) {// rows
for (int j = i + 1; j < two_sums.length; j++) {// columns
if (two_sums[i].value + two_sums[j].value == target
&& two_sums[i].row_index != two_sums[j].row_index
&& two_sums[i].column_index != two_sums[j].column_index
&& two_sums[i].row_index != two_sums[j].column_index
&& two_sums[i].column_index != two_sums[j].row_index) {
// skip duplicates
result_set[0] = num[two_sums[i].row_index];
result_set[1] = num[two_sums[i].column_index];
result_set[2] = num[two_sums[j].row_index];
result_set[3] = num[two_sums[j].column_index];
Arrays.sort(result_set);
inner = new ArrayList<Integer>();
inner.add(result_set[0]);
inner.add(result_set[1]);
inner.add(result_set[2]);
inner.add(result_set[3]);
hashset.add(inner);// results still contains duplicates
}
}
}
Iterator<ArrayList<Integer>> it = hashset.iterator();
while(it.hasNext()){
res.add(it.next());
}
return res;
}
private class Sums {
int value;
int row_index;
int column_index;
Sums(int val, int r_index, int c_index) {
value = val;
row_index = r_index;
column_index = c_index;
}
}
}
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