Link: https://leetcode.com/problems/merge-sorted-array/
You are given two integer arrays nums1 and nums2, sorted in non-decreasing order, and two integers m and n, representing the number of elements in nums1 and nums2 respectively.
Merge nums1 and nums2 into a single array sorted in non-decreasing order.
The final sorted array should not be returned by the function, but instead be stored inside the array nums1. To accommodate this, nums1 has a length of m + n, where the first m elements denote the elements that should be merged, and the last n elements are set to 0 and should be ignored. nums2 has a length of n.
Example 1:
Input: nums1 = [1,2,3,0,0,0], m = 3, nums2 = [2,5,6], n = 3
Output: [1,2,2,3,5,6]
Explanation: The arrays we are merging are [1,2,3] and [2,5,6]. The result of the merge is [1,2,2,3,5,6] with the underlined elements coming from nums1.
Example 2:
Input: nums1 = [1], m = 1, nums2 = [], n = 0
Output: [1]
Explanation: The arrays we are merging are [1] and []. The result of the merge is [1].
Example 3:
Input: nums1 = [0], m = 0, nums2 = [1], n = 1
Output: [1]
Explanation: The arrays we are merging are [] and [1]. The result of the merge is [1]. Note that because m = 0, there are no elements in nums1. The 0 is only there to ensure the merge result can fit in nums1.
Use three ptrs i, j for nums1, nums2, k ptr for nums1's end. We accessing the two nums backward, if nums1[i] <= nums2[j], we set nums1[k] = nums1[j], then decrement j, k ptrs.
By the end, we check if two ptrs i, j and at index 0 or not. If not, we modify the rest with nums1[k] with either nums1 or nums2.
class Solution:
def merge(self, nums1: List[int], m: int, nums2: List[int], n: int) -> None:
"""
Do not return anything, modify nums1 in-place instead.
"""
# Modify nums1 to be merged with nums1 and nums2
# Use three pointers, i,j for nums1, nums2, k for the end of nums1
# Comparing nums1, nums2 backward, copy larger pointer to k, decrement that pointer and k pointer
# TC: O(m+n), SC: O(1)
i, j = m-1, n-1 # pointers for nums1, nums2
k = m + n - 1 # pointers to the end of nums1
while i >= 0 and j >= 0:
# Left >= right, decrement i, k
if nums1[i] >= nums2[j]:
nums1[k] = nums1[i]
i -= 1
else:
nums1[k] = nums2[j]
j -= 1
k -= 1
# Add the rest from nums1 or nums2 into nums1
while i >= 0:
nums1[k] = nums1[i]
i -= 1
k -= 1
while j >= 0:
nums1[k] = nums2[j]
j -= 1
k -= 1Time Complexity: m is the length of nums1, n is the length of nums2.
Space Complexity:
