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Method needs to return the k elements a[i] such that ABS(a[i] - val) are the k largest evaluation. My code only works for integers greater than val. It will fail if integers less than val. Can I do this without importing anything other than java.util.Arrays? Could somebody just enlighten me? Any help will be much appreciated!

 public static int[] farthestK(int[] a, int val, int k) {// This line should not change
  int[] b = new int[a.length];
  for (int i = 0; i < b.length; i++) {
     b[i] = Math.abs(a[i] - val);
  int[] c = new int[k];
  int w = 0;
  for (int i = b.length-1; i > b.length-k-1; i--) {       
     c[w] = b[i] + val;
  return c;    

test case:

  @Test public void farthestKTest() {
         int[] a = {-2, 4, -6, 7, 8, 13, 15};
         int[] expected = {15, -6, 13, -2};
         int[] actual = Selector.farthestK(a, 4, 4);
         Assert.assertArrayEquals(expected, actual);

 There was 1 failure:
 1) farthestKTest(SelectorTest)
 arrays first differed at element [1]; expected:<-6> but was:<14>
 Tests run: 1,  Failures: 1
share|improve this question
up vote 3 down vote accepted

The top k problem can be solved in many ways. In your case you add a new parameter, but it really doesn't matter.

The first and the easiest one: just sort the array. Time complexity: O(nlogn)

public static int[] farthestK(Integer[] a, final int val, int k) {
    Arrays.sort(a, new java.util.Comparator<Integer>() {
        public int compare(Integer o1, Integer o2) {
            return -Math.abs(o1 - val) + Math.abs(o2 - val);
    int[] c = new int[k];
    for (int i = 0; i < k; i++) {
        c[i] = a[i];
    return c;

The second way: use a heap to save the max k values, Time complexity: O(nlogk)

 * Use a min heap to save the max k values. Time complexity: O(nlogk)
public static int[] farthestKWithHeap(Integer[] a, final int val, int k) {
    PriorityQueue<Integer> minHeap = new PriorityQueue<Integer>(4,
            new java.util.Comparator<Integer>() {
                public int compare(Integer o1, Integer o2) {
                    return Math.abs(o1 - val) - Math.abs(o2 - val);
    for (int i : a) {
        if (minHeap.size() > k) {
    int[] c = new int[k];
    for (int i = 0; i < k; i++) {
        c[i] = minHeap.poll();
    return c;

The third way: divide and conquer, just like quicksort. Partition the array to two part, and find the kth in one of them. Time complexity: O(n + klogk) The code is a little long, so i just provide link here.

Selection problem.

share|improve this answer
Is there a reason you've changed int to Integer here? – Chris Hayes Sep 4 '13 at 3:40
@ChrisHayes Custom comparator could only used to compare Objects, so i have to change int[] to Integer[], you can also do this copy inside the method. – faylon Sep 4 '13 at 3:45
@Override What does this mean? Can you make the code more clear? – catchwisdom Sep 4 '13 at 3:47
@catchwisdom you could try to learn more about Comparator in java. You always need to write your own Comparator to sort different arrays. Override is just a annotation, means that this method override a parent method or implement an interface. – faylon Sep 4 '13 at 3:55
@catchwisdom ... Try to think by yourself since it's a homework... It's so easy to achieve your requirement, by adding a few lines. – faylon Sep 4 '13 at 6:00

Sorting the array will cost you O(n log n) time. You can do it in O(n) time using k-selection.

  1. Compute an array B, where B[i] = abs(A[i] - val). Then your problem is equivalent to finding the k values farthest from zero in B. Since each B[i] >= 0, this is equivalent to finding the k largest elements in B.
  2. Run k-selection on B looking for the (n - k)th element. See Quickselect on Wikipedia for an O(n) expected time algorithm.
  3. After k-selection is complete, B[n - k] through B[n - 1] contain the largest elements in B. With proper bookkeeping, you can link back to the elements in A that correspond to them (see pseudocode below).

Time complexity: O(n) time for #1, O(n) time for #2, and O(k) time for #3 => a total time complexity of O(n). (Quickselect runs in O(n) expected time, and there exist complicated worst-case linear time selection algorithms).

Space complexity: O(n).


farthest_from(k, val, A):
  let n = A.length

  # Compute B. Elements are objects to
  # keep track of the original element in A.
  let B = array[0 .. n - 1]
  for i between 0 and n - 1:
    B[i] = {
      value: abs(A[i] - val)
      index: i

  # k_selection should know to compare
  # elements in B by their "value";
  # e.g., each B[i] could be java.lang.Comparable.
  k_selection(n - k - 1, B)

  # Use the top elements in B to link back to A.
  # Return the result.    
  let C = array[0 .. k - 1]
  for i between 0 and k - 1:
    C[i] = A[B[n - k + i].index]

  return C
share|improve this answer
Thanks! I'm looking through it right now. I will get back to you later. – catchwisdom Sep 4 '13 at 4:27

You can modify this algorithm a little and use it for printing k elements according to your requirement.(This is the only work you will need to do with some changes in this algorithm.)

Explore this link.

This algo uses Selection Sort - so the output would be a Logarithmic Time Complexity based answer which is very efficient.

share|improve this answer

O(n) algorithm, from Wikipedia entry on partial sorting:

Find the k-th smallest element using the linear time median-of-medians selection algorithm. Then make a linear pass to select the elements smaller than the k-th smallest element.

The collection in this case is created by taking the original array, subtracting the given value, taking the absolute value, (and then negating it so that largest becomes smallest).

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