亚洲精品乱码久久久久久蜜桃91,欧美日韩精品免费,久久成人亚洲

Btree算法實現代碼

基于<<算法導論>>中關于btree算法的描述,雖然書中沒有關于刪除結點算法的偽碼實現,不過還是根據描述寫了出來,經過測試,似乎是沒有問題,歡迎測試找bug.

不過,值得一提的是,btree算法大部分情況下是使用在操作存放在諸如磁盤等慢速且大容量介質中的,但是這里給出的算法仍然是操作的內存中的數據.如何使用這個算法操作存放在磁盤的數據,恐怕還要自定義文件的格式等,我對這方面還沒有涉及到,以后會抽空研究如tokyocabinet等數據庫的代碼,給出一個解決方案來,如果能做到這一點,基本上就可以算是一個小型的數據庫的后端存儲系統了.

話說回來,這份代碼我編碼調試了很久,幾百行的代碼從國慶在家休息的時候開始,前后花費了將近一周時間.我想,諸如紅黑樹/btree這樣的復雜數據結構的算法之所以難以調試,很大的原因在于,即使在某一處你不小心犯了一個錯誤,程序運行時也可能不是在這個地方core dump,因為你破壞了這個結構而只在后面才反映出來,于是,加大了調試的難度.所以,這就需要自己多閱讀資料,加深對算法的理解,盡可能的肉眼多審核幾次代碼.

我之前研究過紅黑樹,研究過memcached,自己也寫了一個commoncache,看來,我個人更感興趣的方向是這種大規模數據的處理上,很有挑戰的說.未來,將繼續在這方面發力,希望能有機會從事這方面的工作,如Linux文件系統,分布式文件系統,云計算等等方向.

頭文件:

/*
* implementation of btree algorithm, base on <<Introduction to algorithm>>
* author: lichuang
* blog: m.shnenglu.com/converse
*/

#ifndef __BTREE_H__
#define __BTREE_H__

#define M 4
#define KEY_NUM (2 * M - 1)

typedef int type_t;

typedef struct btree_t
{
    int num;                        /* number of keys */
    char leaf;                      /* if or not is a leaf */
    type_t key[KEY_NUM];
    struct btree_t* child[KEY_NUM + 1];
}btree_t, btnode_t;

btree_t*    btree_create();
btree_t*    btree_insert(btree_t *btree, type_t key);
btree_t*    btree_delete(btree_t *btree, type_t key);

/*
* search the key in the btree, save the key index of the btree node in the index
*/
btree_t*    btree_search(btree_t *btree, type_t key, int *index);

#endif /* __BTREE_H__ */

實現代碼以及測試文件:

/*
* implementation of btree algorithm, base on <<Introduction to algorithm>>
* author: lichuang
* blog: m.shnenglu.com/converse
*/

#include "btree.h"
#include <stdio.h>
#include <stdlib.h>
#include <string.h>

static btree_t* btree_insert_nonfull(btree_t *btree, type_t key);
static btree_t* btree_split_child(btree_t *parent, int pos, btree_t *child);
static int      btree_find_index(btree_t *btree, type_t key, int *ret);

btree_t* btree_create()
{
    btree_t *btree;

    if (!(btree = (btree_t*)malloc(sizeof(btree_t))))
    {
        printf("[%d]malloc error!\n", __LINE__);
        return NULL;
    }

    btree->num = 0;
    btree->leaf = 1;

    return btree;
}

btree_t* btree_insert(btree_t *btree, type_t key)
{
    if (btree->num == KEY_NUM)
    {
        /* if the btree is full */
        btree_t *p;
        if (!(p = (btree_t*)malloc(sizeof(btree_t))))
        {
            printf("[%d]malloc error!\n", __LINE__);
            return NULL;
        }
        p->num = 0;
        p->child[0] = btree;
        p->leaf = 0;
        btree = btree_split_child(p, 0, btree);
    }

    return btree_insert_nonfull(btree, key);
}

btree_t* btree_delete(btree_t *btree, type_t key)
{
    int index, ret, i;
    btree_t *preceding, *successor;
    btree_t *child, *sibling;
    type_t replace;

    index = btree_find_index(btree, key, &ret);

    if (btree->leaf && !ret)
    {
        /*
           case 1:
           if found the key and the node is a leaf then delete it directly
        */
        memmove(&btree->key[index], &btree->key[index + 1], sizeof(type_t) * (btree->num - index - 1));
        --btree->num;
        return btree;
    }
    else if (btree->leaf && ret)
    {
        /* not found */
        return btree;
    }

    if (!ret)               /* btree includes key */
    {
        /*
           case 2:
           If the key k is in node x and x is an internal node, do the following:
         */
        preceding = btree->child[index];
        successor = btree->child[index + 1];

        if (preceding->num >= M) /* case 2a */
        {
            /*
               case 2a:
               If the child y that precedes k in node x has at least t keys,
               then find the predecessor k′ of k in the subtree rooted at y.
               Recursively delete k′, and replace k by k′ in x.
               (Finding k′ and deleting it can be performed in a single downward pass.)
             */
            replace = preceding->key[preceding->num - 1];
            btree->child[index] = btree_delete(preceding, replace);
            btree->key[index] = replace;
            return btree;
        }
        if (successor->num >= M)  /* case 2b */
        {
            /*
               case 2b:
               Symmetrically, if the child z that follows k in node x
               has at least t keys, then find the successor k′ of k
               in the subtree rooted at z. Recursively delete k′, and
               replace k by k′ in x. (Finding k′ and deleting it can
               be performed in a single downward pass.)
             */
            replace = successor->key[0];
            btree->child[index + 1] = btree_delete(successor, replace);
            btree->key[index] = replace;
            return btree;
        }
        if ((preceding->num == M - 1) && (successor->num == M - 1)) /* case 2c */
        {
            /*
               case 2c:
               Otherwise, if both y and z have only t - 1 keys, merge k
               and all of z into y, so that x loses both k and the pointer
               to z, and y now contains 2t - 1 keys. Then, free z and
               recursively delete k from y.
             */
            /* merge key and successor into preceding */
            preceding->key[preceding->num++] = key;
            memmove(&preceding->key[preceding->num], &successor->key[0], sizeof(type_t) * (successor->num));
            memmove(&preceding->child[preceding->num], &successor->child[0], sizeof(btree_t*) * (successor->num + 1));
            preceding->num += successor->num;

            /* delete key from btree */
            if (btree->num - 1 > 0)
            {
                memmove(&btree->key[index], &btree->key[index + 1], sizeof(type_t) * (btree->num - index - 1));
                memmove(&btree->child[index + 1], &btree->child[index + 2], sizeof(btree_t*) * (btree->num - index - 1));
                --btree->num;
            }
            else
            {
                /* if the parent node contain no more child, free it */
                free(btree);
                btree = preceding;
            }

            /* free successor */
            free(successor);

            /* delete key from preceding */
            btree_delete(preceding, key);

            return btree;
        }
    }

    /* btree not includes key */
    if ((child = btree->child[index]) && child->num == M - 1)
    {
        /*
           case 3:
           If the key k is not present in internal node x, determine
           the root ci[x] of the appropriate subtree that must contain k,
           if k is in the tree at all. If ci[x] has only t - 1 keys,
           execute step 3a or 3b as necessary to guarantee that we descend
           to a node containing at least t keys. Then, finish by recursing
           on the appropriate child of x.
         */
        /*
           case 3a:
           If ci[x] has only t - 1 keys but has an immediate sibling
           with at least t keys, give ci[x] an extra key by moving a
           key from x down into ci[x], moving a key from ci[x]'s immediate
           left or right sibling up into x, and moving the appropriate
           child pointer from the sibling into ci[x].
         */
        if ((index < btree->num) &&
                (sibling = btree->child[index + 1]) &&
                (sibling->num >= M))
        {
            /* the right sibling has at least M keys */
            child->key[child->num++] = btree->key[index];
            btree->key[index]        = sibling->key[0];

            child->child[child->num] = sibling->child[0];

            sibling->num--;
            memmove(&sibling->key[0], &sibling->key[1], sizeof(type_t*) * (sibling->num));
            memmove(&sibling->child[0], &sibling->child[1], sizeof(btree_t*) * (sibling->num + 1));
        }
        else if ((index > 0) &&
                (sibling = btree->child[index - 1]) &&
                (sibling->num >= M))
        {
            /* the left sibling has at least M keys */
            memmove(&child->key[1], &child->key[0], sizeof(type_t) * child->num);
            memmove(&child->child[1], &child->child[0], sizeof(btree_t*) * (child->num + 1));
            child->key[0] = btree->key[index - 1];
            btree->key[index - 1]  = sibling->key[sibling->num - 1];
            child->child[0] = sibling->child[sibling->num];

            child->num++;
            sibling->num--;
        }
        /*
           case 3b:
           If ci[x] and both of ci[x]'s immediate siblings have t - 1 keys,
           merge ci[x] with one sibling, which involves moving a key from x
           down into the new merged node to become the median key for that node.
         */
        else if ((index < btree->num) &&
                (sibling = btree->child[index + 1]) &&
                (sibling->num == M - 1))
        {
            /*
               the child and its right sibling both have M - 1 keys,
               so merge child with its right sibling
             */
            child->key[child->num++] = btree->key[index];
            memmove(&child->key[child->num], &sibling->key[0], sizeof(type_t) * sibling->num);
            memmove(&child->child[child->num], &sibling->child[0], sizeof(btree_t*) * (sibling->num + 1));
            child->num += sibling->num;

            if (btree->num - 1 > 0)
            {
                memmove(&btree->key[index], &btree->key[index + 1], sizeof(type_t) * (btree->num - index - 1));
                memmove(&btree->child[index + 1], &btree->child[index + 2], sizeof(btree_t*) * (btree->num - index - 1));
                btree->num--;
            }
            else
            {
                free(btree);
                btree = child;
            }

            free(sibling);
        }
        else if ((index > 0) &&
                (sibling = btree->child[index - 1]) &&
                (sibling->num == M - 1))
        {
            /*
               the child and its left sibling both have M - 1 keys,
               so merge child with its left sibling
             */
            sibling->key[sibling->num++] = btree->key[index - 1];
            memmove(&sibling->key[sibling->num], &child->key[0], sizeof(type_t) * child->num);
            memmove(&sibling->child[sibling->num], &child->child[0], sizeof(btree_t*) * (child->num + 1));
            sibling->num += child->num;

            if (btree->num - 1 > 0)
            {
                memmove(&btree->key[index - 1], &btree->key[index], sizeof(type_t) * (btree->num - index));
                memmove(&btree->child[index], &btree->child[index + 1], sizeof(btree_t*) * (btree->num - index));
                btree->num--;
            }
            else
            {
                free(btree);
                btree = sibling;
            }

            free(child);

            child = sibling;
        }
    }

    btree_delete(child, key);
    return btree;
}

btree_t* btree_search(btree_t *btree, type_t key, int *index)
{
    int i;

    *index = -1;

    for (i = 0; i < btree->num && key > btree->key[i]; ++i)
        ;

    if (i < btree->num && key == btree->key[i])
    {
        *index = i;
        return btree;
    }

    if (btree->leaf)
    {
        return NULL;
    }
    else
    {
        return btree_search(btree->child[i], key, index);
    }
}

/*
* child is the posth child of parent
*/
btree_t* btree_split_child(btree_t *parent, int pos, btree_t *child)
{
    btree_t *z;
    int i;

    if (!(z = (btree_t*)malloc(sizeof(btree_t))))
    {
        printf("[%d]malloc error!\n", __LINE__);
        return NULL;
    }

    z->leaf = child->leaf;
    z->num = M - 1;

    /* copy the last M keys of child into z */
    for (i = 0; i < M - 1; ++i)
    {
       z->key[i] = child->key[i + M];
    }

    if (!child->leaf)
    {
        /* copy the last M children of child into z */
        for (i = 0; i < M; ++i)
        {
            z->child[i] = child->child[i + M];
        }
    }
    child->num = M - 1;

    for (i = parent->num; i > pos; --i)
    {
        parent->child[i + 1] = parent->child[i];
    }
    parent->child[pos + 1] = z;

    for (i = parent->num - 1; i >= pos; --i)
    {
        parent->key[i + 1] = parent->key[i];
    }
    parent->key[pos] = child->key[M - 1];

    parent->num++;

    return parent;
}

int btree_find_index(btree_t *btree, type_t key, int *ret)
{
    int i, num;

    for (i = 0, num = btree->num; i < num && (*ret = btree->key[i] - key) < 0; ++i)
        ;
    /*
     * when out of the loop, three conditions may happens:
     * ret == 0 means find the key,
     * or ret > 0 && i < num means not find the key,
     * or ret < 0 && i == num means not find the key and out of the key array range
     */

    return i;
}

/*
* btree is not full
*/
btree_t* btree_insert_nonfull(btree_t *btree, type_t key)
{
    int i;

    i = btree->num - 1;

    if (btree->leaf)
    {
        /* find the position to insert the key */
        while (i >= 0 && key < btree->key[i])
        {
            btree->key[i + 1] = btree->key[i];
            --i;
        }

        btree->key[i + 1] = key;

        btree->num++;
    }
    else
    {
        /* find the child to insert the key */
        while (i >= 0 && key < btree->key[i])
        {
            --i;
        }

        ++i;
        if (btree->child[i]->num == KEY_NUM)
        {
            /* if the child is full, then split it */
            btree_split_child(btree, i, btree->child[i]);
            if (key > btree->key[i])
            {
                ++i;
            }
        }

        btree_insert_nonfull(btree->child[i], key);
    }

    return btree;
}

#define NUM 20000

int main()
{
    btree_t *btree;
    btnode_t *node;
    int index, i;

    if (!(btree = btree_create()))
    {
        exit(-1);
    }

    for (i = 1; i < NUM; ++i)
    {
        btree = btree_insert(btree, i);
    }

    for (i = 1; i < NUM; ++i)
    {
        node = btree_search(btree, i, &index);

        if (!node || index == -1)
        {
            printf("insert error!\n");
            return -1;
        }
    }

    for (i = 1; i < NUM; ++i)
    {
        btree = btree_delete(btree, i);

        btree = btree_insert(btree, i);
    }

    return 0;
}

posted on 2009-10-13 21:00 那誰閱讀(11618) 評論(8) 編輯收藏引用所屬分類: 算法與數據結構

# re: Btree算法實現代碼[未登錄] 回復 更多評論

b-tree..只有膜拜的份啊

2009-10-13 21:55 | vincent

# re: Btree算法實現代碼回復 更多評論

good job!! recently, referring to mit's introduction to algorithms. just for basic.

2009-10-13 21:57 | tiny

# re: Btree算法實現代碼[未登錄] 回復 更多評論

sqlite也實現了一個btree，自己的文件格式，緩存

2009-10-13 23:10 | true

# re: Btree算法實現代碼回復 更多評論

C語言風格。。

2009-10-15 09:02 | expter

# re: Btree算法實現代碼回復 更多評論

@true
怎么用呢？》

2010-11-20 22:34 | 在以

# re: Btree算法實現代碼回復 更多評論

我將 main中
btree_delete調用那塊修改為隨機刪除key
z = rand() % NUM;
btree = btree_delete(btree, z);

并且在btree_delete中加了判斷
if (btree == NULL || btree->num == 0) { return btree; }

為何會出現段錯誤?
用valgrind查看
/* btree not includes key */
if ((child = btree->child[index]) && child->num == M - 1)
這里報 Invalid read of size 4
這是為何請指教

2011-10-26 17:10 | 郭凱

# re: Btree算法實現代碼回復 更多評論

貌似發現錯誤了
case 3a 中
memmove(&sibling->key[0], &sibling->key[1], sizeof(type_t*) * (sibling->num));
"type_t*" 改為 "type_t" 就OK了

2011-10-27 01:53 | 郭凱

# re: Btree算法實現代碼[未登錄] 回復 更多評論

可以實現動態確定btree子樹的算法嗎？

2013-01-16 14:14 | eric

刷新評論列表

只有注冊用戶登錄后才能發表評論。


相關文章: [算法]如何根據數據的多種屬性來查找數據 Btree算法實現代碼二分查找學習札記把二分查找算法寫正確需要注意的地方在一個有序序列中查找重復/不存在的數自己實現的memcpy 另類的鏈表數據結構以及算法 memcached內存管理算法二分查找算法(迭代和遞歸版本) ccache發布0.5版本

網站導航: 博客園 IT新聞 BlogJava 博問 Chat2DB 管理

# re: Btree算法實現代碼[未登錄] 回復 更多評論

# re: Btree算法實現代碼回復 更多評論

# re: Btree算法實現代碼[未登錄] 回復 更多評論

# re: Btree算法實現代碼回復 更多評論

# re: Btree算法實現代碼回復 更多評論

# re: Btree算法實現代碼回復 更多評論

# re: Btree算法實現代碼回復 更多評論

# re: Btree算法實現代碼[未登錄] 回復 更多評論

青青草原综合久久大伊人导航_色综合久久天天综合_日日噜噜夜夜狠狠久久丁香五月_热久久这里只有精品

那誰的技術博客

Btree算法實現代碼

評論

導航

公告

常用鏈接

留言簿(71)

隨筆分類(264)

隨筆檔案(210)

相冊

關于我

開源項目

論壇

朋友

搜索

最新評論

閱讀排行榜

評論排行榜

青青草原综合久久大伊人导航_色综合久久天天综合_日日噜噜夜夜狠狠久久丁香五月_热久久这里只有精品

那誰的技術博客

Btree算法實現代碼

評論

# re: Btree算法實現代碼[未登錄] 回復 更多評論

# re: Btree算法實現代碼 回復 更多評論

# re: Btree算法實現代碼[未登錄] 回復 更多評論

# re: Btree算法實現代碼 回復 更多評論

# re: Btree算法實現代碼 回復 更多評論

# re: Btree算法實現代碼 回復 更多評論

# re: Btree算法實現代碼 回復 更多評論

# re: Btree算法實現代碼[未登錄] 回復 更多評論

導航

公告

常用鏈接

留言簿(71)

隨筆分類(264)

隨筆檔案(210)

相冊

關于我

開源項目

論壇

朋友

搜索

最新評論

閱讀排行榜

評論排行榜

# re: Btree算法實現代碼[未登錄] 回復更多評論

# re: Btree算法實現代碼回復更多評論

# re: Btree算法實現代碼[未登錄] 回復更多評論

# re: Btree算法實現代碼回復更多評論

# re: Btree算法實現代碼回復更多評論

# re: Btree算法實現代碼回復更多評論

# re: Btree算法實現代碼回復更多評論

# re: Btree算法實現代碼[未登錄] 回復更多評論