Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I write the inversion count code using mergesort , but because the input is a large const

int array,how do I make it faster?(let the coefficient of o(nlogn) smaller?)

Is there some code tips to do it?

Thx in advance.

#include<iostream>
using namespace std;
int invCount(int*, int);
int merge(int*, int*, int, int*, int);
int NumberOfInversion(const int*, int);

int main(void){
    const int array[] = {0, 1, 4, 3, 2};
    cout << NumberOfInversion(array, 5) << "times" << endl;
    return 0;
}

    int invCount(int *array, int length){

        if(length <= 1)return 0;

        int middle = (length + 1) / 2;

        int left[middle];
        int right[length - middle];


        for(int i = 0; i < middle; i ++)left[i] = array[i];
        for(int i = middle; i < length; i ++)right[i - middle] = array[i];

        return invCount(left, middle) + invCount(right, length - middle
        ) + merge(array, left, middle, right, length - middle);
    }


    int merge(int* array, int* left, int leftLength, int* right, int rightLength){
       int i = 0, j = 0, count = 0;

       while(i < leftLength && j < rightLength){
           if (left[i] <= right[j]){
               array[i + j] = left[i];
               i ++;
           }
           else {
               array[i + j] = right[j];
               j ++;
               count += leftLength - i;
           }
       }
       if(i == leftLength){
            while(j < rightLength){
                array[i + j] = right[j];
                j ++;
            }
       }
       else{
            while(i < leftLength){
                array[i + j] = left[i];
                i ++;
            }
        }
       return count;
    }


    int NumberOfInversion(const int *A, int N)
    {
        int input[N];
        for(int i = 0; i < N; i ++)input[i] = A[i];
        int result = invCount(input, N);
        return result;
    }

ps:about 20% of all possible pairs are inverted

share|improve this question
1  
You can try allocating left/right arrays once and then re-using them instead of allocating them on every recursion call. It will reduce memory consumption and time. –  Nikolay Polivanov Mar 9 '13 at 12:13
    
why it comes out reference to left is ambiguous?Thx –  Liang-Yu Pan Mar 9 '13 at 12:50
1  
I think it's not a good idea to pass these arrays via global variables, you may pass pointer to auxiliary array along with arguments of invCount. And it's hard to read code in comments :) –  Nikolay Polivanov Mar 9 '13 at 13:10
    
I am trying another way, Thx! –  Liang-Yu Pan Mar 9 '13 at 13:11
    
a) Interesting usage of VLAs, especially with C++, and b) try std::inplace_merge() –  WhozCraig Mar 9 '13 at 13:27

1 Answer 1

up vote 2 down vote accepted

Here is a C code for count inversions

#include <stdio.h>
#include <stdlib.h>

int  _mergeSort(int arr[], int temp[], int left, int right);
int merge(int arr[], int temp[], int left, int mid, int right);

/* This function sorts the input array and returns the
   number of inversions in the array */
int mergeSort(int arr[], int array_size)
{
    int *temp = (int *)malloc(sizeof(int)*array_size);
    return _mergeSort(arr, temp, 0, array_size - 1);
}

/* An auxiliary recursive function that sorts the input array and
  returns the number of inversions in the array. */
int _mergeSort(int arr[], int temp[], int left, int right)
{
  int mid, inv_count = 0;
  if (right > left)
  {
    /* Divide the array into two parts and call _mergeSortAndCountInv()
       for each of the parts */
    mid = (right + left)/2;

    /* Inversion count will be sum of inversions in left-part, right-part
      and number of inversions in merging */
    inv_count  = _mergeSort(arr, temp, left, mid);
    inv_count += _mergeSort(arr, temp, mid+1, right);

    /*Merge the two parts*/
    inv_count += merge(arr, temp, left, mid+1, right);
  }
  return inv_count;
}

/* This funt merges two sorted arrays and returns inversion count in
   the arrays.*/
int merge(int arr[], int temp[], int left, int mid, int right)
{
  int i, j, k;
  int inv_count = 0;

  i = left; /* i is index for left subarray*/
  j = mid;  /* i is index for right subarray*/
  k = left; /* i is index for resultant merged subarray*/
  while ((i <= mid - 1) && (j <= right))
  {
    if (arr[i] <= arr[j])
    {
      temp[k++] = arr[i++];
    }
    else
    {
      temp[k++] = arr[j++];

     /*this is tricky -- see above explanation/diagram for merge()*/
      inv_count = inv_count + (mid - i);
    }
  }

  /* Copy the remaining elements of left subarray
   (if there are any) to temp*/
  while (i <= mid - 1)
    temp[k++] = arr[i++];

  /* Copy the remaining elements of right subarray
   (if there are any) to temp*/
  while (j <= right)
    temp[k++] = arr[j++];

  /*Copy back the merged elements to original array*/
  for (i=left; i <= right; i++)
    arr[i] = temp[i];

  return inv_count;
}

/* Driver progra to test above functions */
int main(int argv, char** args)
{
  int arr[] = {1, 20, 6, 4, 5};
  printf(" Number of inversions are %d \n", mergeSort(arr, 5));
  getchar();
  return 0;
}

An explanation was given in detail here: http://www.geeksforgeeks.org/counting-inversions/

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.