链接:https://leetcode-cn.com/problems/implement-trie-prefix-tree/
Trie(发音类似 "try")或者说 前缀树 是一种树形数据结构,用于高效地存储和检索字符串数据集中的键。这一数据结构有相当多的应用情景,例如自动补完和拼写检查。
请你实现 Trie 类:
Trie() 初始化前缀树对象。 void insert(String word) 向前缀树中插入字符串 word 。 boolean search(String word) 如果字符串 word 在前缀树中,返回 true(即,在检索之前已经插入);否则,返回 false 。 boolean startsWith(String prefix) 如果之前已经插入的字符串 word 的前缀之一为 prefix ,返回 true ;否则,返回 false 。
示例:
输入 ["Trie", "insert", "search", "search", "startsWith", "insert", "search"] [[], ["apple"], ["apple"], ["app"], ["app"], ["app"], ["app"]] 输出 [null, null, true, false, true, null, true]
解释 Trie trie = new Trie(); trie.insert("apple"); trie.search("apple"); // 返回 True trie.search("app"); // 返回 False trie.startsWith("app"); // 返回 True trie.insert("app"); trie.search("app"); // 返回 True
一道典型的字典树题目,用26长度的一维数组代表每一个字母,同时有一个标识来标识当前节点是不是叶子节点,是不是完整字符串
public class Trie {
private boolean is_string=false;
private Trie next[]=new Trie[26];
public Trie(){}
public void insert(String word){
Trie root=this;
char w[]=word.toCharArray();
for(int i=0;i<w.length;++i){
if(root.next[w[i]-'a']==null)root.next[w[i]-'a']=new Trie();
root=root.next[w[i]-'a'];
}
root.is_string=true;
}
public boolean search(String word){
Trie root=this;
char w[]=word.toCharArray();
for(int i=0;i<w.length;++i){
if(root.next[w[i]-'a']==null)return false;
root=root.next[w[i]-'a'];
}
return root.is_string;
}
public boolean startsWith(String prefix){
Trie root=this;
char p[]=prefix.toCharArray();
for(int i=0;i<p.length;++i){
if(root.next[p[i]-'a']==null)return false;
root=root.next[p[i]-'a'];
}
return true;
}
}链接:https://leetcode-cn.com/problems/number-of-islands/
给你一个由 '1'(陆地)和 '0'(水)组成的的二维网格,请你计算网格中岛屿的数量。
岛屿总是被水包围,并且每座岛屿只能由水平方向和/或竖直方向上相邻的陆地连接形成。
此外,你可以假设该网格的四条边均被水包围。
示例 1:
输入:grid = [ ["1","1","1","1","0"], ["1","1","0","1","0"], ["1","1","0","0","0"], ["0","0","0","0","0"] ] 输出:1
岛屿数量的话我会更喜欢用dfs的方式来解题,并查集解法代码还是有点多,主要是java没有提供并查集类,但是本周学了并查集,就学一下并查集的解法
class Solution {
void dfs(char[][] grid, int r, int c) {
int nr = grid.length;
int nc = grid[0].length;
if (r < 0 || c < 0 || r >= nr || c >= nc || grid[r][c] == '0') {
return;
}
grid[r][c] = '0';
dfs(grid, r - 1, c);
dfs(grid, r + 1, c);
dfs(grid, r, c - 1);
dfs(grid, r, c + 1);
}
public int numIslands(char[][] grid) {
if (grid == null || grid.length == 0) {
return 0;
}
int nr = grid.length;
int nc = grid[0].length;
int num_islands = 0;
for (int r = 0; r < nr; ++r) {
for (int c = 0; c < nc; ++c) {
if (grid[r][c] == '1') {
++num_islands;
dfs(grid, r, c);
}
}
}
return num_islands;
}
}class Solution {
//定义并查集类
class UnionFind {
int count;
int[] parent;
int[] rank;
public UnionFind(char[][] grid) {
count = 0;
int m = grid.length;
int n = grid[0].length;
parent = new int[m * n];
rank = new int[m * n];
for (int i = 0; i < m; ++i) {
for (int j = 0; j < n; ++j) {
if (grid[i][j] == '1') {
parent[i * n + j] = i * n + j;
++count;
}
rank[i * n + j] = 0;
}
}
}
public int find(int i) {
if (parent[i] != i) parent[i] = find(parent[i]);
return parent[i];
}
public void union(int x, int y) {
int rootx = find(x);
int rooty = find(y);
if (rootx != rooty) {
if (rank[rootx] > rank[rooty]) {
parent[rooty] = rootx;
} else if (rank[rootx] < rank[rooty]) {
parent[rootx] = rooty;
} else {
parent[rooty] = rootx;
rank[rootx] += 1;
}
--count;
}
}
public int getCount() {
return count;
}
}
public int numIslands(char[][] grid) {
if (grid == null || grid.length == 0) {
return 0;
}
int nr = grid.length;
int nc = grid[0].length;
int num_islands = 0;
UnionFind uf = new UnionFind(grid);
for (int r = 0; r < nr; ++r) {
for (int c = 0; c < nc; ++c) {
if (grid[r][c] == '1') {
grid[r][c] = '0';
if (r - 1 >= 0 && grid[r-1][c] == '1') {
uf.union(r * nc + c, (r-1) * nc + c);
}
if (r + 1 < nr && grid[r+1][c] == '1') {
uf.union(r * nc + c, (r+1) * nc + c);
}
if (c - 1 >= 0 && grid[r][c-1] == '1') {
uf.union(r * nc + c, r * nc + c - 1);
}
if (c + 1 < nc && grid[r][c+1] == '1') {
uf.union(r * nc + c, r * nc + c + 1);
}
}
}
}
return uf.getCount();
}
}