mirror of
https://github.com/chefyuan/algorithm-base.git
synced 2024-12-28 13:26:18 +00:00
306 lines
10 KiB
Java
306 lines
10 KiB
Java
> 如果阅读时,发现错误,或者动画不可以显示的问题可以添加我微信好友 **[tan45du_one](https://raw.githubusercontent.com/tan45du/tan45du.github.io/master/个人微信.15egrcgqd94w.jpg)** ,备注 github + 题目 + 问题 向我反馈
|
||
>
|
||
> 感谢支持,该仓库会一直维护,希望对各位有一丢丢帮助。
|
||
>
|
||
> 另外希望手机阅读的同学可以来我的 <u>[**公众号:袁厨的算法小屋**](https://raw.githubusercontent.com/tan45du/test/master/微信图片_20210320152235.2pthdebvh1c0.png)</u> 两个平台同步,想要和题友一起刷题,互相监督的同学,可以在我的小屋点击<u>[**刷题小队**](https://raw.githubusercontent.com/tan45du/test/master/微信图片_20210320152235.2pthdebvh1c0.png)</u>进入。
|
||
|
||
#### [1438. 绝对差不超过限制的最长连续子数组](https://leetcode-cn.com/problems/longest-continuous-subarray-with-absolute-diff-less-than-or-equal-to-limit/)
|
||
|
||
给你一个整数数组 nums ,和一个表示限制的整数 limit,请你返回最长连续子数组的长度,该子数组中的任意两个元素之间的绝对差必须小于或者等于 limit 。
|
||
|
||
如果不存在满足条件的子数组,则返回 0 。
|
||
|
||
示例
|
||
|
||
> 输入:nums = [10,1,2,4,7,2], limit = 5
|
||
> 输出:4
|
||
> 解释:满足题意的最长子数组是 [2,4,7,2],其最大绝对差 |2-7| = 5 <= 5 。
|
||
|
||
**提示:**
|
||
|
||
- 1 <= nums.length <= 10^5
|
||
|
||
- 1 <= nums[i] <= 10^9
|
||
- 0 <= limit <= 10^9
|
||
|
||
**题目解析**
|
||
|
||
我们结合题目,示例,提示来看,这个题目也可以使用滑动窗口的思想来解决。我们需要判断某个子数组是否满足最大绝对差不超过限制值。
|
||
|
||
那么我们应该怎么解决呢?
|
||
|
||
我们想一下,窗口内的最大绝对差,如果我们知道窗口的最大值和最小值,最大值减去最小值就能得到最大绝对差。
|
||
|
||
所以我们这个问题就变成了获取滑动窗口内的最大值和最小值问题,哦?滑动窗口的最大值,是不是很熟悉,大家可以先看一下[滑动窗口的最大值](https://leetcode-cn.com/problems/hua-dong-chuang-kou-de-zui-da-zhi-lcof/solution/yi-shi-pin-sheng-qian-yan-shuang-duan-du-mbga/)这个题目,那我们完全可以借助刚才题目的思想来解决这个题目。啪的一下我就搞懂了。
|
||
|
||
滑动窗口的最大值,我们当时借助了双端队列,来维护一个单调递减的双端队列,进而得到滑动窗口的最大值
|
||
|
||
那么我们同样可以借助双端队列,来维护一个单调递增的双端队列,来获取滑动窗口的最小值。既然知道了最大值和最小值,我们就可以判断当前窗口是否符合要求,如果符合要求则扩大窗口,不符合要求则缩小窗口,循环结束返回最大的窗口值即可。
|
||
|
||
下面我们来看一下我们的动画模拟,一下就能看懂!
|
||
|
||
<img src="https://img-blog.csdnimg.cn/20210320092423565.gif" style="zoom:150%;" />
|
||
|
||
其实,我们只要把握两个重点即可,我们的 maxdeque 维护的是一个单调递减的双端队列,头部为当前窗口的最大值, mindeque 维护的是一个单调递增的双端队列,头部为窗口的最小值,即可。好啦我们一起看代码吧。
|
||
|
||
Java Code:
|
||
|
||
```java
|
||
class Solution {
|
||
public int longestSubarray(int[] nums, int limit) {
|
||
|
||
Deque<Integer> maxdeque = new LinkedList<>();
|
||
Deque<Integer> mindeque = new LinkedList<>();
|
||
int len = nums.length;
|
||
int right = 0, left = 0, maxwin = 0;
|
||
|
||
while (right < len) {
|
||
while (!maxdeque.isEmpty() && maxdeque.peekLast() < nums[right]) {
|
||
maxdeque.removeLast();
|
||
}
|
||
while (!mindeque.isEmpty() && mindeque.peekLast() > nums[right]) {
|
||
mindeque.removeLast();
|
||
}
|
||
//需要更多视频解算法,可以来我的公众号:袁厨的算法小屋
|
||
maxdeque.addLast(nums[right]);
|
||
mindeque.addLast(nums[right]);
|
||
while (maxdeque.peekFirst() - mindeque.peekFirst() > limit) {
|
||
if (maxdeque.peekFirst() == nums[left]) maxdeque.removeFirst();
|
||
if (mindeque.peekFirst() == nums[left]) mindeque.removeFirst();
|
||
left++;
|
||
}
|
||
//保留最大窗口
|
||
maxwin = Math.max(maxwin,right-left+1);
|
||
right++;
|
||
}
|
||
return maxwin;
|
||
}
|
||
}
|
||
```
|
||
|
||
Python Code:
|
||
|
||
```python
|
||
from typing import List
|
||
import collections
|
||
class Solution:
|
||
def longestSubarray(self, nums: List[int], limit: int)->int:
|
||
maxdeque = collections.deque()
|
||
mindeque = collections.deque()
|
||
leng = len(nums)
|
||
right = 0
|
||
left = 0
|
||
maxwin = 0
|
||
while right < leng:
|
||
while len(maxdeque) != 0 and maxdeque[-1] < nums[right]:
|
||
maxdeque.pop()
|
||
while len(mindeque) != 0 and mindeque[-1] > nums[right]:
|
||
mindeque.pop()
|
||
|
||
maxdeque.append(nums[right])
|
||
mindeque.append(nums[right])
|
||
while (maxdeque[0] - mindeque[0]) > limit:
|
||
if maxdeque[0] == nums[left]:
|
||
maxdeque.popleft()
|
||
if mindeque[0] == nums[left]:
|
||
mindeque.popleft()
|
||
left += 1
|
||
# 保留最大窗口
|
||
maxwin = max(maxwin, right - left + 1)
|
||
right += 1
|
||
return maxwin
|
||
```
|
||
|
||
Swift Code
|
||
|
||
Swift:数组模拟,超时(58 / 61 个通过测试用例)
|
||
|
||
```swift
|
||
class Solution {
|
||
func longestSubarray(_ nums: [Int], _ limit: Int) -> Int {
|
||
var maxQueue:[Int] = []
|
||
var minQueue:[Int] = []
|
||
let len = nums.count
|
||
var right = 0, left = 0, maxWin = 0
|
||
while right < len {
|
||
while !maxQueue.isEmpty && (maxQueue.last! < nums[right]) {
|
||
maxQueue.removeLast()
|
||
}
|
||
while !minQueue.isEmpty && (minQueue.last! > nums[right]) {
|
||
minQueue.removeLast()
|
||
}
|
||
maxQueue.append(nums[right])
|
||
minQueue.append(nums[right])
|
||
while (maxQueue.first! - minQueue.first!) > limit {
|
||
if maxQueue.first! == nums[left] {
|
||
maxQueue.removeFirst()
|
||
}
|
||
if minQueue.first! == nums[left] {
|
||
minQueue.removeFirst()
|
||
}
|
||
left += 1
|
||
}
|
||
maxWin = max(maxWin, right - left + 1)
|
||
right += 1
|
||
}
|
||
return maxWin
|
||
}
|
||
}
|
||
```
|
||
|
||
Swift:使用双端队列(击败了 100.00%)
|
||
|
||
```swift
|
||
class Solution {
|
||
func longestSubarray(_ nums: [Int], _ limit: Int) -> Int {
|
||
var maxQueue = Deque<Int>.init()
|
||
var minQueue = Deque<Int>.init()
|
||
let len = nums.count
|
||
var right = 0, left = 0, maxWin = 0
|
||
while right < len {
|
||
while !maxQueue.isEmpty && (maxQueue.peekBack()! < nums[right]) {
|
||
maxQueue.dequeueBack()
|
||
}
|
||
while !minQueue.isEmpty && (minQueue.peekBack()! > nums[right]) {
|
||
minQueue.dequeueBack()
|
||
}
|
||
maxQueue.enqueue(nums[right])
|
||
minQueue.enqueue(nums[right])
|
||
while (maxQueue.peekFront()! - minQueue.peekFront()!) > limit {
|
||
if maxQueue.peekFront()! == nums[left] {
|
||
maxQueue.dequeue()
|
||
}
|
||
if minQueue.peekFront()! == nums[left] {
|
||
minQueue.dequeue()
|
||
}
|
||
left += 1
|
||
}
|
||
maxWin = max(maxWin, right - left + 1)
|
||
right += 1
|
||
}
|
||
return maxWin
|
||
}
|
||
|
||
// 双端队列数据结构
|
||
public struct Deque<T> {
|
||
private var array: [T?]
|
||
private var head: Int
|
||
private var capacity: Int
|
||
private let originalCapacity: Int
|
||
|
||
public init(_ capacity: Int = 10) {
|
||
self.capacity = max(capacity, 1)
|
||
originalCapacity = self.capacity
|
||
array = [T?](repeating: nil, count: capacity)
|
||
head = capacity
|
||
}
|
||
|
||
public var isEmpty: Bool {
|
||
return count == 0
|
||
}
|
||
|
||
public var count: Int {
|
||
return array.count - head
|
||
}
|
||
|
||
public mutating func enqueue(_ element: T) {
|
||
array.append(element)
|
||
}
|
||
|
||
public mutating func enqueueFront(_ element: T) {
|
||
if head == 0 {
|
||
capacity *= 2
|
||
let emptySpace = [T?](repeating: nil, count: capacity)
|
||
array.insert(contentsOf: emptySpace, at: 0)
|
||
head = capacity
|
||
}
|
||
|
||
head -= 1
|
||
array[head] = element
|
||
}
|
||
|
||
public mutating func dequeue() -> T? {
|
||
guard head < array.count, let element = array[head] else { return nil }
|
||
|
||
array[head] = nil
|
||
head += 1
|
||
|
||
if capacity >= originalCapacity && head >= capacity*2 {
|
||
let amountToRemove = capacity + capacity/2
|
||
array.removeFirst(amountToRemove)
|
||
head -= amountToRemove
|
||
capacity /= 2
|
||
}
|
||
return element
|
||
}
|
||
|
||
public mutating func dequeueBack() -> T? {
|
||
if isEmpty {
|
||
return nil
|
||
} else {
|
||
return array.removeLast()
|
||
}
|
||
}
|
||
|
||
public func peekFront() -> T? {
|
||
if isEmpty {
|
||
return nil
|
||
} else {
|
||
return array[head]
|
||
}
|
||
}
|
||
|
||
public func peekBack() -> T? {
|
||
if isEmpty {
|
||
return nil
|
||
} else {
|
||
return array.last!
|
||
}
|
||
}
|
||
}
|
||
}
|
||
```
|
||
|
||
Go Code:
|
||
|
||
```go
|
||
func longestSubarray(nums []int, limit int) int {
|
||
maxdeq := []int{} // 递减队列
|
||
mindeq := []int{} // 递增队列
|
||
|
||
length := len(nums)
|
||
left, right, maxwin := 0, 0, 0
|
||
for right < length {
|
||
for len(maxdeq) != 0 && maxdeq[len(maxdeq) - 1] < nums[right] {
|
||
maxdeq = maxdeq[: len(maxdeq) - 1]
|
||
}
|
||
maxdeq = append(maxdeq, nums[right])
|
||
|
||
for len(mindeq) != 0 && mindeq[len(mindeq) - 1] > nums[right] {
|
||
mindeq = mindeq[: len(mindeq) - 1]
|
||
}
|
||
mindeq = append(mindeq, nums[right])
|
||
|
||
for maxdeq[0] - mindeq[0] > limit {
|
||
if maxdeq[0] == nums[left] {
|
||
maxdeq = maxdeq[1:]
|
||
}
|
||
if mindeq[0] == nums[left] {
|
||
mindeq = mindeq[1:]
|
||
}
|
||
left++
|
||
}
|
||
maxwin = max(maxwin, right - left + 1)
|
||
right++
|
||
}
|
||
return maxwin
|
||
}
|
||
|
||
func max(a, b int) int {
|
||
if a > b {
|
||
return a
|
||
}
|
||
return b
|
||
}
|
||
```
|