sdk/lib/internal/sort.dart - sdk.git - Git at Google

 // Copyright (c) 2011, the Dart project authors.  Please see the AUTHORS file
 // for details. All rights reserved. Use of this source code is governed by a
 // BSD-style license that can be found in the LICENSE file.

 part of dart._internal;

 /**
  * Dual-Pivot Quicksort algorithm.
  *
  * This class implements the dual-pivot quicksort algorithm as presented in
  * Vladimir Yaroslavskiy's paper.
  *
  * Some improvements have been copied from Android's implementation.
  */
 class Sort {
   // When a list has less then [:_INSERTION_SORT_THRESHOLD:] elements it will
   // be sorted by an insertion sort.
   static const int _INSERTION_SORT_THRESHOLD = 32;

   /**
    * Sorts all elements of the given list [:a:] according to the given
    * [:compare:] function.
    *
    * The [:compare:] function takes two arguments [:x:] and [:y:] and returns
    *  -1 if [:x < y:],
    *   0 if [:x == y:], and
    *   1 if [:x > y:].
    *
    * The function's behavior must be consistent. It must not return different
    * results for the same values.
    */
   static void sort/*<E>*/(List/*<E>*/ a, int compare(dynamic /*=E*/ a, dynamic /*=E*/ b)) {
     _doSort(a, 0, a.length - 1, compare);
   }

   /**
    * Sorts all elements in the range [:from:] (inclusive) to [:to:] (exclusive)
    * of the given list [:a:].
    *
    * If the given range is invalid an "OutOfRange" error is raised.
    * TODO(floitsch): do we want an error?
    *
    * See [:sort:] for requirements of the [:compare:] function.
    */
   static void sortRange/*<E>*/(List/*<E>*/ a, int from, int to, int compare(dynamic /*=E*/ a, dynamic /*=E*/ b)) {
     if ((from < 0) || (to > a.length) || (to < from)) {
       throw "OutOfRange";
     }
     _doSort(a, from, to - 1, compare);
   }

   /**
    * Sorts the list in the interval [:left:] to [:right:] (both inclusive).
    */
   static void _doSort/*<E>*/(List/*<E>*/ a, int left, int right, int compare(dynamic /*=E*/ a, dynamic /*=E*/ b)) {
     if ((right - left) <= _INSERTION_SORT_THRESHOLD) {
       _insertionSort(a, left, right, compare);
     } else {
       _dualPivotQuicksort(a, left, right, compare);
     }
   }

   static void _insertionSort/*<E>*/(List/*<E>*/ a, int left, int right, int compare(dynamic /*=E*/ a, dynamic /*=E*/ b)) {
     for (int i = left + 1; i <= right; i++) {
       var el = a[i];
       int j = i;
       while ((j > left) && (compare(a[j - 1], el) > 0)) {
         a[j] = a[j - 1];
         j--;
       }
       a[j] = el;
     }
   }

   static void _dualPivotQuicksort/*<E>*/(List/*<E>*/ a,
                                   int left, int right,
                                   int compare(dynamic /*=E*/ a, dynamic /*=E*/ b)) {
     assert(right - left > _INSERTION_SORT_THRESHOLD);

     // Compute the two pivots by looking at 5 elements.
     int sixth = (right - left + 1) ~/ 6;
     int index1 = left + sixth;
     int index5 = right - sixth;
     int index3 = (left + right) ~/ 2;  // The midpoint.
     int index2 = index3 - sixth;
     int index4 = index3 + sixth;

     var el1 = a[index1];
     var el2 = a[index2];
     var el3 = a[index3];
     var el4 = a[index4];
     var el5 = a[index5];

     // Sort the selected 5 elements using a sorting network.
     if (compare(el1, el2) > 0) { var t = el1; el1 = el2; el2 = t; }
     if (compare(el4, el5) > 0) { var t = el4; el4 = el5; el5 = t; }
     if (compare(el1, el3) > 0) { var t = el1; el1 = el3; el3 = t; }
     if (compare(el2, el3) > 0) { var t = el2; el2 = el3; el3 = t; }
     if (compare(el1, el4) > 0) { var t = el1; el1 = el4; el4 = t; }
     if (compare(el3, el4) > 0) { var t = el3; el3 = el4; el4 = t; }
     if (compare(el2, el5) > 0) { var t = el2; el2 = el5; el5 = t; }
     if (compare(el2, el3) > 0) { var t = el2; el2 = el3; el3 = t; }
     if (compare(el4, el5) > 0) { var t = el4; el4 = el5; el5 = t; }

     var pivot1 = el2;
     var pivot2 = el4;

     // el2 and el4 have been saved in the pivot variables. They will be written
     // back, once the partioning is finished.
     a[index1] = el1;
     a[index3] = el3;
     a[index5] = el5;

     a[index2] = a[left];
     a[index4] = a[right];

     int less = left + 1;    // First element in the middle partition.
     int great = right - 1;  // Last element in the middle partition.

     bool pivots_are_equal = (compare(pivot1, pivot2) == 0);
     if (pivots_are_equal) {
       var pivot = pivot1;
       // Degenerated case where the partioning becomes a dutch national flag
       // problem.
       //
       // [ |  < pivot  | == pivot | unpartitioned | > pivot  | ]
       //  ^             ^          ^             ^            ^
       // left         less         k           great         right
       //
       // a[left] and a[right] are undefined and are filled after the
       // partitioning.
       //
       // Invariants:
       //   1) for x in ]left, less[ : x < pivot.
       //   2) for x in [less, k[ : x == pivot.
       //   3) for x in ]great, right[ : x > pivot.
       for (int k = less; k <= great; k++) {
         var ak = a[k];
         int comp = compare(ak, pivot);
         if (comp == 0) continue;
         if (comp < 0) {
           if (k != less) {
             a[k] = a[less];
             a[less] = ak;
           }
           less++;
         } else {
           // comp > 0.
           //
           // Find the first element <= pivot in the range [k - 1, great] and
           // put [:ak:] there. We know that such an element must exist:
           // When k == less, then el3 (which is equal to pivot) lies in the
           // interval. Otherwise a[k - 1] == pivot and the search stops at k-1.
           // Note that in the latter case invariant 2 will be violated for a
           // short amount of time. The invariant will be restored when the
           // pivots are put into their final positions.
           while (true) {
             comp = compare(a[great], pivot);
             if (comp > 0) {
               great--;
               // This is the only location in the while-loop where a new
               // iteration is started.
               continue;
             } else if (comp < 0) {
               // Triple exchange.
               a[k] = a[less];
               a[less++] = a[great];
               a[great--] = ak;
               break;
             } else {
               // comp == 0;
               a[k] = a[great];
               a[great--] = ak;
               // Note: if great < k then we will exit the outer loop and fix
               // invariant 2 (which we just violated).
               break;
             }
           }
         }
       }
     } else {
       // We partition the list into three parts:
       //  1. < pivot1
       //  2. >= pivot1 && <= pivot2
       //  3. > pivot2
       //
       // During the loop we have:
       // [ | < pivot1 | >= pivot1 && <= pivot2 | unpartitioned  | > pivot2  | ]
       //  ^            ^                        ^              ^             ^
       // left         less                     k              great        right
       //
       // a[left] and a[right] are undefined and are filled after the
       // partitioning.
       //
       // Invariants:
       //   1. for x in ]left, less[ : x < pivot1
       //   2. for x in [less, k[ : pivot1 <= x && x <= pivot2
       //   3. for x in ]great, right[ : x > pivot2
       for (int k = less; k <= great; k++) {
         var ak = a[k];
         int comp_pivot1 = compare(ak, pivot1);
         if (comp_pivot1 < 0) {
           if (k != less) {
             a[k] = a[less];
             a[less] = ak;
           }
           less++;
         } else {
           int comp_pivot2 = compare(ak, pivot2);
           if (comp_pivot2 > 0) {
             while (true) {
               int comp = compare(a[great], pivot2);
               if (comp > 0) {
                 great--;
                 if (great < k) break;
                 // This is the only location inside the loop where a new
                 // iteration is started.
                 continue;
               } else {
                 // a[great] <= pivot2.
                 comp = compare(a[great], pivot1);
                 if (comp < 0) {
                   // Triple exchange.
                   a[k] = a[less];
                   a[less++] = a[great];
                   a[great--] = ak;
                 } else {
                   // a[great] >= pivot1.
                   a[k] = a[great];
                   a[great--] = ak;
                 }
                 break;
               }
             }
           }
         }
       }
     }

     // Move pivots into their final positions.
     // We shrunk the list from both sides (a[left] and a[right] have
     // meaningless values in them) and now we move elements from the first
     // and third partition into these locations so that we can store the
     // pivots.
     a[left] = a[less - 1];
     a[less - 1] = pivot1;
     a[right] = a[great + 1];
     a[great + 1] = pivot2;

     // The list is now partitioned into three partitions:
     // [ < pivot1   | >= pivot1 && <= pivot2   |  > pivot2   ]
     //  ^            ^                        ^             ^
     // left         less                     great        right

     // Recursive descent. (Don't include the pivot values.)
     _doSort(a, left, less - 2, compare);
     _doSort(a, great + 2, right, compare);

     if (pivots_are_equal) {
       // All elements in the second partition are equal to the pivot. No
       // need to sort them.
       return;
     }

     // In theory it should be enough to call _doSort recursively on the second
     // partition.
     // The Android source however removes the pivot elements from the recursive
     // call if the second partition is too large (more than 2/3 of the list).
     if (less < index1 && great > index5) {
       while (compare(a[less], pivot1) == 0) { less++; }
       while (compare(a[great], pivot2) == 0) { great--; }

       // Copy paste of the previous 3-way partitioning with adaptions.
       //
       // We partition the list into three parts:
       //  1. == pivot1
       //  2. > pivot1 && < pivot2
       //  3. == pivot2
       //
       // During the loop we have:
       // [ == pivot1 | > pivot1 && < pivot2 | unpartitioned  | == pivot2 ]
       //              ^                      ^              ^
       //            less                     k              great
       //
       // Invariants:
       //   1. for x in [ *, less[ : x == pivot1
       //   2. for x in [less, k[ : pivot1 < x && x < pivot2
       //   3. for x in ]great, * ] : x == pivot2
       for (int k = less; k <= great; k++) {
         var ak = a[k];
         int comp_pivot1 = compare(ak, pivot1);
         if (comp_pivot1 == 0) {
           if (k != less) {
             a[k] = a[less];
             a[less] = ak;
           }
           less++;
         } else {
           int comp_pivot2 = compare(ak, pivot2);
           if (comp_pivot2 == 0) {
             while (true) {
               int comp = compare(a[great], pivot2);
               if (comp == 0) {
                 great--;
                 if (great < k) break;
                 // This is the only location inside the loop where a new
                 // iteration is started.
                 continue;
               } else {
                 // a[great] < pivot2.
                 comp = compare(a[great], pivot1);
                 if (comp < 0) {
                   // Triple exchange.
                   a[k] = a[less];
                   a[less++] = a[great];
                   a[great--] = ak;
                 } else {
                   // a[great] == pivot1.
                   a[k] = a[great];
                   a[great--] = ak;
                 }
                 break;
               }
             }
           }
         }
       }
       // The second partition has now been cleared of pivot elements and looks
       // as follows:
       // [  *  |  > pivot1 && < pivot2  | * ]
       //        ^                      ^
       //       less                  great
       // Sort the second partition using recursive descent.
       _doSort(a, less, great, compare);
     } else {
       // The second partition looks as follows:
       // [  *  |  >= pivot1 && <= pivot2  | * ]
       //        ^                        ^
       //       less                    great
       // Simply sort it by recursive descent.
       _doSort(a, less, great, compare);
     }
   }
 }
	// Copyright (c) 2011, the Dart project authors. Please see the AUTHORS file
	// for details. All rights reserved. Use of this source code is governed by a
	// BSD-style license that can be found in the LICENSE file.

	part of dart._internal;

	/**
	* Dual-Pivot Quicksort algorithm.
	*
	* This class implements the dual-pivot quicksort algorithm as presented in
	* Vladimir Yaroslavskiy's paper.
	*
	* Some improvements have been copied from Android's implementation.
	*/
	class Sort {
	// When a list has less then [:_INSERTION_SORT_THRESHOLD:] elements it will
	// be sorted by an insertion sort.
	static const int _INSERTION_SORT_THRESHOLD = 32;

	/**
	* Sorts all elements of the given list [:a:] according to the given
	* [:compare:] function.
	*
	* The [:compare:] function takes two arguments [:x:] and [:y:] and returns
	* -1 if [:x < y:],
	* 0 if [:x == y:], and
	* 1 if [:x > y:].
	*
	* The function's behavior must be consistent. It must not return different
	* results for the same values.
	*/
	static void sort/<E>/(List/<E>/ a, int compare(dynamic /=E/ a, dynamic /=E/ b)) {
	_doSort(a, 0, a.length - 1, compare);
	}

	/**
	* Sorts all elements in the range [:from:] (inclusive) to [:to:] (exclusive)
	* of the given list [:a:].
	*
	* If the given range is invalid an "OutOfRange" error is raised.
	* TODO(floitsch): do we want an error?
	*
	* See [:sort:] for requirements of the [:compare:] function.
	*/
	static void sortRange/<E>/(List/<E>/ a, int from, int to, int compare(dynamic /=E/ a, dynamic /=E/ b)) {
	if ((from < 0) \|\| (to > a.length) \|\| (to < from)) {
	throw "OutOfRange";
	}
	_doSort(a, from, to - 1, compare);
	}

	/**
	* Sorts the list in the interval [:left:] to [:right:] (both inclusive).
	*/
	static void _doSort/<E>/(List/<E>/ a, int left, int right, int compare(dynamic /=E/ a, dynamic /=E/ b)) {
	if ((right - left) <= _INSERTION_SORT_THRESHOLD) {
	_insertionSort(a, left, right, compare);
	} else {
	_dualPivotQuicksort(a, left, right, compare);
	}
	}

	static void _insertionSort/<E>/(List/<E>/ a, int left, int right, int compare(dynamic /=E/ a, dynamic /=E/ b)) {
	for (int i = left + 1; i <= right; i++) {
	var el = a[i];
	int j = i;
	while ((j > left) && (compare(a[j - 1], el) > 0)) {
	a[j] = a[j - 1];
	j--;
	}
	a[j] = el;
	}
	}

	static void _dualPivotQuicksort/<E>/(List/<E>/ a,
	int left, int right,
	int compare(dynamic /=E/ a, dynamic /=E/ b)) {
	assert(right - left > _INSERTION_SORT_THRESHOLD);

	// Compute the two pivots by looking at 5 elements.
	int sixth = (right - left + 1) ~/ 6;
	int index1 = left + sixth;
	int index5 = right - sixth;
	int index3 = (left + right) ~/ 2; // The midpoint.
	int index2 = index3 - sixth;
	int index4 = index3 + sixth;

	var el1 = a[index1];
	var el2 = a[index2];
	var el3 = a[index3];
	var el4 = a[index4];
	var el5 = a[index5];

	// Sort the selected 5 elements using a sorting network.
	if (compare(el1, el2) > 0) { var t = el1; el1 = el2; el2 = t; }
	if (compare(el4, el5) > 0) { var t = el4; el4 = el5; el5 = t; }
	if (compare(el1, el3) > 0) { var t = el1; el1 = el3; el3 = t; }
	if (compare(el2, el3) > 0) { var t = el2; el2 = el3; el3 = t; }
	if (compare(el1, el4) > 0) { var t = el1; el1 = el4; el4 = t; }
	if (compare(el3, el4) > 0) { var t = el3; el3 = el4; el4 = t; }
	if (compare(el2, el5) > 0) { var t = el2; el2 = el5; el5 = t; }
	if (compare(el2, el3) > 0) { var t = el2; el2 = el3; el3 = t; }
	if (compare(el4, el5) > 0) { var t = el4; el4 = el5; el5 = t; }

	var pivot1 = el2;
	var pivot2 = el4;

	// el2 and el4 have been saved in the pivot variables. They will be written
	// back, once the partioning is finished.
	a[index1] = el1;
	a[index3] = el3;
	a[index5] = el5;

	a[index2] = a[left];
	a[index4] = a[right];

	int less = left + 1; // First element in the middle partition.
	int great = right - 1; // Last element in the middle partition.

	bool pivots_are_equal = (compare(pivot1, pivot2) == 0);
	if (pivots_are_equal) {
	var pivot = pivot1;
	// Degenerated case where the partioning becomes a dutch national flag
	// problem.
	//
	// [ \| < pivot \| == pivot \| unpartitioned \| > pivot \| ]
	// ^ ^ ^ ^ ^
	// left less k great right
	//
	// a[left] and a[right] are undefined and are filled after the
	// partitioning.
	//
	// Invariants:
	// 1) for x in ]left, less[ : x < pivot.
	// 2) for x in [less, k[ : x == pivot.
	// 3) for x in ]great, right[ : x > pivot.
	for (int k = less; k <= great; k++) {
	var ak = a[k];
	int comp = compare(ak, pivot);
	if (comp == 0) continue;
	if (comp < 0) {
	if (k != less) {
	a[k] = a[less];
	a[less] = ak;
	}
	less++;
	} else {
	// comp > 0.
	//
	// Find the first element <= pivot in the range [k - 1, great] and
	// put [:ak:] there. We know that such an element must exist:
	// When k == less, then el3 (which is equal to pivot) lies in the
	// interval. Otherwise a[k - 1] == pivot and the search stops at k-1.
	// Note that in the latter case invariant 2 will be violated for a
	// short amount of time. The invariant will be restored when the
	// pivots are put into their final positions.
	while (true) {
	comp = compare(a[great], pivot);
	if (comp > 0) {
	great--;
	// This is the only location in the while-loop where a new
	// iteration is started.
	continue;
	} else if (comp < 0) {
	// Triple exchange.
	a[k] = a[less];
	a[less++] = a[great];
	a[great--] = ak;
	break;
	} else {
	// comp == 0;
	a[k] = a[great];
	a[great--] = ak;
	// Note: if great < k then we will exit the outer loop and fix
	// invariant 2 (which we just violated).
	break;
	}
	}
	}
	}
	} else {
	// We partition the list into three parts:
	// 1. < pivot1
	// 2. >= pivot1 && <= pivot2
	// 3. > pivot2
	//
	// During the loop we have:
	// [ \| < pivot1 \| >= pivot1 && <= pivot2 \| unpartitioned \| > pivot2 \| ]
	// ^ ^ ^ ^ ^
	// left less k great right
	//
	// a[left] and a[right] are undefined and are filled after the
	// partitioning.
	//
	// Invariants:
	// 1. for x in ]left, less[ : x < pivot1
	// 2. for x in [less, k[ : pivot1 <= x && x <= pivot2
	// 3. for x in ]great, right[ : x > pivot2
	for (int k = less; k <= great; k++) {
	var ak = a[k];
	int comp_pivot1 = compare(ak, pivot1);
	if (comp_pivot1 < 0) {
	if (k != less) {
	a[k] = a[less];
	a[less] = ak;
	}
	less++;
	} else {
	int comp_pivot2 = compare(ak, pivot2);
	if (comp_pivot2 > 0) {
	while (true) {
	int comp = compare(a[great], pivot2);
	if (comp > 0) {
	great--;
	if (great < k) break;
	// This is the only location inside the loop where a new
	// iteration is started.
	continue;
	} else {
	// a[great] <= pivot2.
	comp = compare(a[great], pivot1);
	if (comp < 0) {
	// Triple exchange.
	a[k] = a[less];
	a[less++] = a[great];
	a[great--] = ak;
	} else {
	// a[great] >= pivot1.
	a[k] = a[great];
	a[great--] = ak;
	}
	break;
	}
	}
	}
	}
	}
	}

	// Move pivots into their final positions.
	// We shrunk the list from both sides (a[left] and a[right] have
	// meaningless values in them) and now we move elements from the first
	// and third partition into these locations so that we can store the
	// pivots.
	a[left] = a[less - 1];
	a[less - 1] = pivot1;
	a[right] = a[great + 1];
	a[great + 1] = pivot2;

	// The list is now partitioned into three partitions:
	// [ < pivot1 \| >= pivot1 && <= pivot2 \| > pivot2 ]
	// ^ ^ ^ ^
	// left less great right

	// Recursive descent. (Don't include the pivot values.)
	_doSort(a, left, less - 2, compare);
	_doSort(a, great + 2, right, compare);

	if (pivots_are_equal) {
	// All elements in the second partition are equal to the pivot. No
	// need to sort them.
	return;
	}

	// In theory it should be enough to call _doSort recursively on the second
	// partition.
	// The Android source however removes the pivot elements from the recursive
	// call if the second partition is too large (more than 2/3 of the list).
	if (less < index1 && great > index5) {
	while (compare(a[less], pivot1) == 0) { less++; }
	while (compare(a[great], pivot2) == 0) { great--; }

	// Copy paste of the previous 3-way partitioning with adaptions.
	//
	// We partition the list into three parts:
	// 1. == pivot1
	// 2. > pivot1 && < pivot2
	// 3. == pivot2
	//
	// During the loop we have:
	// [ == pivot1 \| > pivot1 && < pivot2 \| unpartitioned \| == pivot2 ]
	// ^ ^ ^
	// less k great
	//
	// Invariants:
	// 1. for x in [ *, less[ : x == pivot1
	// 2. for x in [less, k[ : pivot1 < x && x < pivot2
	// 3. for x in ]great, * ] : x == pivot2
	for (int k = less; k <= great; k++) {
	var ak = a[k];
	int comp_pivot1 = compare(ak, pivot1);
	if (comp_pivot1 == 0) {
	if (k != less) {
	a[k] = a[less];
	a[less] = ak;
	}
	less++;
	} else {
	int comp_pivot2 = compare(ak, pivot2);
	if (comp_pivot2 == 0) {
	while (true) {
	int comp = compare(a[great], pivot2);
	if (comp == 0) {
	great--;
	if (great < k) break;
	// This is the only location inside the loop where a new
	// iteration is started.
	continue;
	} else {
	// a[great] < pivot2.
	comp = compare(a[great], pivot1);
	if (comp < 0) {
	// Triple exchange.
	a[k] = a[less];
	a[less++] = a[great];
	a[great--] = ak;
	} else {
	// a[great] == pivot1.
	a[k] = a[great];
	a[great--] = ak;
	}
	break;
	}
	}
	}
	}
	}
	// The second partition has now been cleared of pivot elements and looks
	// as follows:
	// [ * \| > pivot1 && < pivot2 \| * ]
	// ^ ^
	// less great
	// Sort the second partition using recursive descent.
	_doSort(a, less, great, compare);
	} else {
	// The second partition looks as follows:
	// [ * \| >= pivot1 && <= pivot2 \| * ]
	// ^ ^
	// less great
	// Simply sort it by recursive descent.
	_doSort(a, less, great, compare);
	}
	}
	}