42 Trapping Rain Water
1. Question
Givennnon-negative integers representing an elevation map where the width of each bar is 1, compute how much water it is able to trap after raining.
For example,
Given[0,1,0,2,1,0,1,3,2,1,2,1], return6.
2. Implementation
(1) Two Pointers
class Solution {
public int trap(int[] height) {
if (height == null || height.length <= 1) {
return 0;
}
int left = 0, right = height.length - 1;
int leftMaxHeight = height[left], rightMaxHeight = height[right];
int res = 0;
while (left < right) {
if (height[left] < height[right]) {
++left;
leftMaxHeight = Math.max(leftMaxHeight, height[left]);
res += leftMaxHeight - height[left];
}
else {
--right;
rightMaxHeight = Math.max(rightMaxHeight, height[right]);
res += rightMaxHeight - height[right];
}
}
return res;
}
}(2) Monotone Stack
思路:(1) 凹陷处可以积水。所以寻找先递减后递增的位置就可以了
(2) 维护一个单调递减的Stack,当heights[stack.peek()] <= heights[i], 找到凹陷处,出栈,计算可蓄水的体积
(3) 计算体积时,以bottomIndex作为中点,向两边找出比它高的bar(corner case: 如果此时stack为空,则无法找到左边的bar)
3. Time & Space Complexity
Two Pointers: 时间复杂度O(n), 空间复杂度O(1)
Monotone Stack: 时间复杂度O(n), 空间复杂度O(n)
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