Version 0: Non-Recursion (Recommend)/** * Definition for binary tree * public class TreeNode { *     int val; *     TreeNode left; *     TreeNode right; *     TreeNode(int x) { val = x; } * } */public class Solution {    public List<Integer> preorderTraversal(TreeNode root) {        Stack<TreeNode> stack = new Stack<TreeNode>();        List<Integer> preorder = new ArrayList<Integer>();                if (root == null) {            return preorder;        }                stack.push(root);        while (!stack.empty()) {            TreeNode node = stack.pop();            preorder.add(node.val);            if (node.right != null) {                stack.push(node.right);            }            if (node.left != null) {                stack.push(node.left);            }        }                return preorder;    }}//Version 1: Traversepublic class Solution {    public ArrayList<Integer> preorderTraversal(TreeNode root) {        ArrayList<Integer> result = new ArrayList<Integer>();        traverse(root, result);        return result;    }    // 把root为跟的preorder加入result里面    private void traverse(TreeNode root, ArrayList<Integer> result) {        if (root == null) {            return;        }        result.add(root.val);        traverse(root.left, result);        traverse(root.right, result);    }}//Version 2: Divide & Conquerpublic class Solution {    public ArrayList<Integer> preorderTraversal(TreeNode root) {        ArrayList<Integer> result = new ArrayList<Integer>();        // null or leaf        if (root == null) {            return result;        }        // Divide        ArrayList<Integer> left = preorderTraversal(root.left);        ArrayList<Integer> right = preorderTraversal(root.right);        // Conquer        result.add(root.val);        result.addAll(left);        result.addAll(right);        return result;    }}

class ResultType {    public boolean isBalanced;    public int maxDepth;    public ResultType(boolean isBalanced, int maxDepth) {        this.isBalanced = isBalanced;        this.maxDepth = maxDepth;    }}

public class Solution {    /**     * @param root: The root of binary tree.     * @return: True if this Binary tree is Balanced, or false.     */    public boolean isBalanced(TreeNode root) {        return helper(root).isBalanced;    }        private ResultType helper(TreeNode root) {        if (root == null) {            return new ResultType(true, 0);        }                ResultType left = helper(root.left);        ResultType right = helper(root.right);                // subtree not balance        if (!left.isBalanced || !right.isBalanced) {            return new ResultType(false, -1);        }                // root not balance        if (Math.abs(left.maxDepth - right.maxDepth) > 1) {            return new ResultType(false, -1);        }                return new ResultType(true, Math.max(left.maxDepth, right.maxDepth) + 1);    }}

// 在root为根的二叉树中找A,B的LCA:    // 如果找到了就返回这个LCA    // 如果只碰到A，就返回A    // 如果只碰到B，就返回B    // 如果都没有，就返回null    /**     * 这里有个假设, node1和node2都必须存在. 假如不存在下面的方法是有问题的.     *     * @param root  以root为搜索基础节点     * @param node1 要寻找的node1     * @param node2 要寻找的node2     * @return 二者的最近公共祖先     */    public TreeNode lowestCommonAncestor(TreeNode root, TreeNode node1, TreeNode node2) {        if (root == null) {            return null;        }        if (root == node1) {            return node1;        }        if (root == node2) {            return node2;        }        TreeNode leftResult = lowestCommonAncestor(root.left, node1, node2);        TreeNode rightResult = lowestCommonAncestor(root.left, node1, node2);        if (leftResult == null && rightResult == null) {            return null;        } else if (leftResult != null & rightResult != null) {            return root;        } else if (leftResult == null && rightResult != null) {            return rightResult;        } else {            return leftResult;        }    }

public class Solution {    public void traverse(TreeNode root) {        if (root == null) {            return;        }        // do something with root        traverse(root.left);        // do something with root        traverse(root.right);        // do something with root    }}Tempate 2: Divide & Conquerpublic class Solution {    public ResultType traversal(TreeNode root) {        // null or leaf        if (root == null) {            // do something and return;        }                // Divide        ResultType left = traversal(root.left);        ResultType right = traversal(root.right);                // Conquer        ResultType result = Merge from left and right.        return result;    }}

 public class Solution {    /**     * @param root: The root of binary tree.     * @return: buttom-up level order a list of lists of integer     */    public ArrayList<ArrayList<Integer>> levelOrderBottom(TreeNode root) {        ArrayList<ArrayList<Integer>> result = new ArrayList<>();        if (root == null) {            return result;        }        Queue<TreeNode> queue = new LinkedList<TreeNode>();        queue.offer(root);                while (!queue.isEmpty()) {            int size = queue.size();            ArrayList<Integer> level = new ArrayList<>();            for (int i = 0; i < size; i++) {                TreeNode head = queue.poll();                level.add(head.val);                if (head.left != null) {                    queue.offer(head.left);                }                if (head.right != null) {                    queue.offer(head.right);                }            }            result.add(level);        }                Collections.reverse(result);        return result;    }}