1、Lowest Common Ancestor of a Binary Search Tree
Given a binary search tree (BST), find the lowest common ancestor (LCA) of two given nodes in the BST.
According to the definition of LCA on Wikipedia: “The lowest common ancestor is defined between two nodes v and w as the lowest node in T that has both v and w as descendants (where we allow a node to be a descendant of itself).”
_______6______
/
___2__ ___8__
/ /
0 _4 7 9
/
3 5
For example, the lowest common ancestor (LCA) of nodes 2 and 8 is 6. Another example is LCA of nodes 2 and 4 is 2, since a node can be a descendant of itself according to the LCA definition.
/**
* Definition for a binary tree node.
* struct TreeNode {
* int val;
* TreeNode *left;
* TreeNode *right;
* TreeNode(int x) : val(x), left(NULL), right(NULL) {}
* };
*/
class Solution {
public:
TreeNode* lowestCommonAncestor(TreeNode* root, TreeNode* p, TreeNode* q) {
if(root->val >= min(p->val,q->val) && root->val <= max(p->val,q->val)) return root;
if(root->val >=max(p->val,q->val)) return lowestCommonAncestor(root->left,p,q) ;
else return lowestCommonAncestor(root->right,p,q);
}
};
2、Lowest Common Ancestor of a Binary Tree
Given a binary tree, find the lowest common ancestor (LCA) of two given nodes in the tree.
According to the definition of LCA on Wikipedia: “The lowest common ancestor is defined between two nodes v and w as the lowest node in T that has both v and w as descendants (where we allow a node to be a descendant of itself).”
_______3______
/
___5__ ___1__
/ /
6 _2 0 8
/
7 4
For example, the lowest common ancestor (LCA) of nodes 5 and 1 is 3. Another example is LCA of nodes 5 and 4 is 5, since a node can be a descendant of itself according to the LCA definition.
方法1.
/** * Definition for a binary tree node. * struct TreeNode { * int val; * TreeNode *left; * TreeNode *right; * TreeNode(int x) : val(x), left(NULL), right(NULL) {} * }; */ class Solution { public: TreeNode* lowestCommonAncestor(TreeNode* root, TreeNode* p, TreeNode* q) { if(root == p || root == q || root == NULL) { return root; } TreeNode* left = lowestCommonAncestor(root->left ,p,q); TreeNode* right = lowestCommonAncestor(root->right,p,q); if(left==NULL && right==NULL){ return NULL; } if(left!=NULL && right==NULL){ return left; } if(right!=NULL && left == NULL){ return right; } return root; } };
方法2.
/** * Definition for a binary tree node. * struct TreeNode { * int val; * TreeNode *left; * TreeNode *right; * TreeNode(int x) : val(x), left(NULL), right(NULL) {} * }; */ class Solution { private: bool getPath(TreeNode* root,TreeNode* node,list<TreeNode*>& list_path){ if(root==NULL){ return false; } list_path.push_back(root); if(root == node) { return true; } bool in_left = getPath(root->left,node,list_path); if(in_left){ return true; } bool in_right = getPath(root->right,node,list_path); if(!in_right){ list_path.pop_back(); } return in_right; } public: TreeNode* lowestCommonAncestor(TreeNode* root, TreeNode* p, TreeNode* q) { list<TreeNode*> list_path_p,list_path_q; bool list_path_p_exist = getPath(root,p,list_path_p); bool list_path_q_exist = getPath(root,q,list_path_q); if(!list_path_p_exist && !list_path_q_exist){ return NULL; } TreeNode* res = NULL; while(list_path_p.front() == list_path_q.front()){ res = list_path_p.front(); list_path_p.pop_front(); list_path_q.pop_front(); } return res; } };