[抄题]:
Design a max stack that supports push, pop, top, peekMax and popMax.
- push(x) -- Push element x onto stack.
- pop() -- Remove the element on top of the stack and return it.
- top() -- Get the element on the top.
- peekMax() -- Retrieve the maximum element in the stack.
- popMax() -- Retrieve the maximum element in the stack, and remove it. If you find more than one maximum elements, only remove the top-most one.
Example 1:
MaxStack stack = new MaxStack();
stack.push(5);
stack.push(1);
stack.push(5);
stack.top(); -> 5
stack.popMax(); -> 5
stack.top(); -> 1
stack.peekMax(); -> 5
stack.pop(); -> 1
stack.top(); -> 5
[暴力解法]:
时间分析:
空间分析:
[优化后]:
时间分析:
空间分析:
[奇葩输出条件]:
[奇葩corner case]:
[思维问题]:
知道是用maxstack,但是写不出来
[英文数据结构或算法,为什么不用别的数据结构或算法]:
[一句话思路]:
popmax的暂存值,还要再放回去,不能调用自己,所以再写一个pushHelper函数
[输入量]:空: 正常情况:特大:特小:程序里处理到的特殊情况:异常情况(不合法不合理的输入):
[画图]:
[一刷]:
stack maxstack必须要保持相同的长度,功能就是维持最大值而已
[二刷]:
[三刷]:
[四刷]:
[五刷]:
[五分钟肉眼debug的结果]:
[总结]:
[复杂度]:Time complexity: O() Space complexity: O()
[算法思想:迭代/递归/分治/贪心]:
[关键模板化代码]:
[其他解法]:
[Follow Up]:
[LC给出的题目变变变]:
[代码风格] :
[是否头一次写此类driver funcion的代码] :
[潜台词] :