1 //简单选择排序 2 void SelectSort(ElemType A[], int n) { 3 int i, j, min,temp; 4 for (i = 1; i <= n-1; ++i) { 5 min = i; 6 for (j = i + 1; j <= n; ++j) 7 if (A[j] < A[min]) 8 min = j; 9 if (min != i) { 10 temp = A[i]; 11 A[i] = A[min]; 12 A[min] = temp; 13 } 14 15 } 16 } 17 18 //重建堆过程(以大根堆为例) 19 void sift(ElemType A[], int k, int m) { 20 int i, j; 21 A[0] = A[k]; 22 i = k; 23 j = 2 * i; 24 int finished = 0; 25 while (j <= m && !finished) { 26 if (j + 1 <= m && A[j] < A[j + 1])//若存在右子树,且右子树的关键字大,则沿右分支筛选 27 j = j + 1; 28 if (A[0] >= A[j]) 29 finished = 1;//筛选完毕 30 else { 31 A[i] = A[j]; 32 i = j; 33 j = 2 * i; 34 } 35 } 36 A[i] = A[0];//A[k]放入适当的位置 37 } 38 //最后一个非叶结点位于第n/2向下取整个位置,n为二叉树结点数目,依次筛选从第n/2向下取整个结点开始,逐层向上倒退,直到根结点 39 void crt_heap(ElemType A[], int n) { 40 //对数组建堆,n为数组的长度 41 int i; 42 for (i = n / 2; i >= 1; --i) 43 sift(A, i, n); 44 } 45 //堆排序 46 void HeapSort(ElemType A[], int n) { 47 ElemType temp; 48 crt_heap(A, n);//初始建堆 49 for (i = n; i >= 2; --i) {//堆尾与堆顶记录交换 50 temp = A[1]; 51 A[1] = A[i]; 52 A[i] = temp; 53 sift(A, 1, i - 1);//重建堆,剩余的i-1个元素整理成堆 54 } 55 }
//重建堆,以小根堆为例 void sifts(ElemType A[], int k, int m) { int i, j; A[0] = A[k]; i = k; j = 2 * i; finished = 0; while (j <= m; && !finished) { if (j + 1 <= m && A[j] > A[j + 1]) j++; if (A[0]<=A[j]) finished = 1; else { A[i] = A[j]; i = j; j = 2 * i; } } A[i] = A[0]; } void crt_heapl(ElemType A[], int n) { int i; for(i=n/2;i>=1;--i) sifts(A,i,n) }