A gene string can be represented by an 8-character long string, with choices from "A", "C", "G", "T".
Suppose we need to investigate about a mutation (mutation from "start" to "end"), where ONE mutation is defined as ONE single character changed in the gene string.
For example, "AACCGGTT" -> "AACCGGTA" is 1 mutation.
Also, there is a given gene "bank", which records all the valid gene mutations. A gene must be in the bank to make it a valid gene string.
Now, given 3 things - start, end, bank, your task is to determine what is the minimum number of mutations needed to mutate from "start" to "end". If there is no such a mutation, return -1.
Note:
- Starting point is assumed to be valid, so it might not be included in the bank.
- If multiple mutations are needed, all mutations during in the sequence must be valid.
- You may assume start and end string is not the same.
Example 1:
start: "AACCGGTT" end: "AACCGGTA" bank: ["AACCGGTA"] return: 1
Example 2:
start: "AACCGGTT" end: "AAACGGTA" bank: ["AACCGGTA", "AACCGCTA", "AAACGGTA"] return: 2
Example 3:
start: "AAAAACCC" end: "AACCCCCC" bank: ["AAAACCCC", "AAACCCCC", "AACCCCCC"] return: 3
本题和LeetCode 127. Word Ladder —— 单词接龙完全一样,没有任何区别,利用广度优先搜索查找最短路径。欣慰自己写代码一遍过,直接AC。
Java
class Solution {
public int minMutation(String start, String end, String[] bank) {
if (bank == null || bank.length == 0) return -1;
char[] gen = {‘A‘,‘C‘,‘G‘,‘T‘};
HashSet<String> bankSet = new HashSet<>();
for (String s : bank)
bankSet.add(s);
Queue<String> q = new LinkedList<>();
HashMap<String, Integer> res = new HashMap<>();
res.put(start, 0);
q.add(start);
while (!q.isEmpty()) {
String s = q.poll();
bankSet.remove(s);
for (int i = 0; i < s.length(); i++) {
char[] next = s.toCharArray();
for (char c : gen) {
next[i] = c;
String nextS = new String(next);
if (bankSet.contains(nextS)) {
res.put(nextS, res.get(s) + 1);
if (nextS.equals(end)) return res.get(nextS);
q.add(nextS);
}
}
}
}
return -1;
}
}
原文地址:https://www.cnblogs.com/tengdai/p/9303045.html
时间: 2024-10-06 06:09:47