请定义一个队列并实现函数 max_value 得到队列里的最大值,要求函数max_value、push_back 和 pop_front 的均摊时间复杂度都是O(1)。

若队列为空,pop_front 和 max_value 需要返回 -1

示例 1:

输入:
["MaxQueue","push_back","push_back","max_value","pop_front","max_value"]
[[],[1],[2],[],[],[]]
输出: [null,null,null,2,1,2]
示例 2:

输入:
["MaxQueue","pop_front","max_value"]
[[],[],[]]
输出: [null,-1,-1]
 

限制:

1 <= push_back,pop_front,max_value的总操作数 <= 10000
1 <= value <= 10^5

来源:力扣(LeetCode)
链接:https://leetcode-cn.com/problems/dui-lie-de-zui-da-zhi-lcof
著作权归领扣网络所有。商业转载请联系官方授权,非商业转载请注明出处。

 

 

代码:

class MaxQueue {
public:
    queue<int> q;
    deque<int> p;
    MaxQueue() {

    }
    
    int max_value() {
        if(p.empty()) return -1;
        return p.front();
    }
    
    void push_back(int value) {
        q.push(value);
        while(!p.empty() && p.back() < value) p.pop_back();
        p.push_back(value);
    }
    
    int pop_front() {
        if(q.empty()) return -1;
        if(p.front() == q.front()) p.pop_front();
        int d = q.front();
        q.pop();
        return d;
    }
};

/**
 * Your MaxQueue object will be instantiated and called as such:
 * MaxQueue* obj = new MaxQueue();
 * int param_1 = obj->max_value();
 * obj->push_back(value);
 * int param_3 = obj->pop_front();
 */