1403. Minimum Subsequence in Non-Increasing Order
Problem Description
The task is to find a subsequence from a given array nums
such that the sum of this subsequence's elements is strictly greater than the sum of the elements that are not included in the subsequence. A subsequence is defined as a sequence that can be derived from the array by removing some or no elements without changing the order of the remaining elements.
The constraints for the solution are:
- If there are multiple subsequences that satisfy the condition, the one with the smallest number of elements should be returned.
- If there is still more than one subsequence with the minimum number of elements, the subsequence among them with the maximum total sum should be returned.
- The returned subsequence should be sorted in non-increasing order (from the largest to the smallest element).
- It is guaranteed that a unique solution exists for the given constraints.
Intuition
To arrive at the solution, we should understand the following points:
- A subsequence with the largest possible elements will contribute more towards making its sum greater than the rest of the elements.
- Sorting the array in non-increasing order helps in picking out the subsequence with the maximum possible sum in the smallest size.
- Accumulating the items from the sorted array until the running total sum (
t
) of these items is greater than the sum of the remaining items (s - t
) gives a subsequence that fulfills the condition.
Now, considering these points, the algorithm follows these steps:
- Sort the array in non-increasing order.
- Iterate over the sorted array, adding each element to a running total (
t
) and storing the element in a subsequence result (ans
). - After each addition, check if the sum of elements in this subsequence result (
t
) is strictly greater than the sum of the remaining elements in the original array (s - t
). - Continue accumulating elements until the condition is met.
Once the condition is met, the current subsequence result (ans
) contains the minimum number of elements with the maximum sum, sorted in non-increasing order. This is the desired subsequence to be returned.
Solution Approach
The solution approach takes advantage of the sorting algorithm and a greedy strategy to create the desired subsequence. Here's a walkthrough of the implementation based on the reference solution provided:
-
First, we need to know the sum of all elements in the given array
nums
. This is calculated with the expressionsum(nums)
and stored in the variables
. -
We then define a variable
t
to keep track of the total sum of the selected subsequence as we build it. Initially,t
is set to 0 since we haven't selected any elements yet. -
The input array
nums
is then sorted in non-increasing order usingsorted(nums, reverse=True)
. Sorting the array allows us to consider larger elements first, aligning with the greedy approach of maximizing the sum of the subsequence. -
We initialize an empty list
ans
to store the elements of the subsequence. -
Next, we iterate over the sorted array. For each element
x
in the array:- We add the element
x
to the totalt
and also appendx
to our answer listans
. - After each addition, we check if the sum
t
is strictly greater than the sum of the remaining elements in the original array (s - t
). - If this condition is true, it means the selected elements in
ans
now have a sum greater than that of the remaining elements ofnums
, fulfilling our requirement.
- We add the element
-
The iteration is terminated immediately once our condition is met (i.e., when
t > s - t
). Since we are iterating over the array in non-increasing order, the first time this condition is met, we have the smallest subsequence with the greatest total sum. -
Lastly, the subsequence stored in
ans
is returned. This is the subsequence with the minimum size and maximum total sum, sorted in non-increasing order – as dictated by our sorting ofnums
.
By utilizing a greedy algorithmic approach along with elementary data structures like lists and performing array sorting, we have an efficient implementation that ensures the strict constraints of the problem are met and a unique solution is returned.
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Start EvaluatorExample Walkthrough
Let's use a small example to illustrate the solution approach. Consider the array nums = [4, 3, 1, 2]
. We need to find a subsequence such that its sum is greater than the sum of the elements not included in it.
-
Calculate the sum of all elements in
nums
:s = 4 + 3 + 1 + 2 = 10
. -
Initialize
t
to 0, which will represent the total sum of our subsequence. -
Sort the array in non-increasing order:
sorted_nums = [4, 3, 2, 1]
. -
Initialize an empty list
ans
to store our subsequence. -
Start iterating over the sorted array. We pick elements one by one and add to both
t
andans
.- First element
x = 4
:t = 0 + 4 = 4
,ans = [4]
, and remaining sums - t = 6
. The sum ofans
is not yet greater than the remaining sum. - Second element
x = 3
:t = 4 + 3 = 7
,ans = [4, 3]
, and remaining sums - t = 3
. Now, the sum ofans
is greater than the remaining sum (7 > 3
).
- First element
-
The condition
t > s - t
is met, so we stop iterating. -
The resulting subsequence
ans = [4, 3]
is already sorted in non-increasing order, which is also the subsequence with the smallest number of elements and the maximum total sum out of all valid subsequences.
We return ans = [4, 3]
as our final answer. This subsequence has a sum of 7
, which is greater than the sum of the non-included elements (2 + 1 = 3)
. It's the smallest such subsequence with the largest sum, fulfilling all the problem's requirements.
Solution Implementation
1from typing import List
2
3class Solution:
4 def minSubsequence(self, nums: List[int]) -> List[int]:
5 # Initialize the variable to store the resulting subsequence
6 result_subsequence = []
7
8 # Calculate the total sum of the elements in nums
9 total_sum = sum(nums)
10
11 # Initialize the variable to track the running total of the subsequence
12 subsequence_sum = 0
13
14 # Sort the nums array in decreasing order
15 for num in sorted(nums, reverse=True):
16 # Add the current number to the running total
17 subsequence_sum += num
18
19 # Append the current number to the result subsequence
20 result_subsequence.append(num)
21
22 # Check if the sum of the subsequence is greater than the remaining elements
23 if subsequence_sum > total_sum - subsequence_sum:
24 # If true, break out of the loop
25 break
26
27 # Return the result subsequence
28 return result_subsequence
29
1import java.util.Arrays; // Import Arrays utility for sorting and streaming
2import java.util.List; // Import List interface
3import java.util.ArrayList; // Import ArrayList class for dynamic arrays
4
5class Solution {
6 public List<Integer> minSubsequence(int[] nums) {
7 // Sort the array in non-decreasing order
8 Arrays.sort(nums);
9
10 // Prepare a list to store the result
11 List<Integer> result = new ArrayList<>();
12
13 // Calculate the sum of all elements in the array
14 int totalSum = Arrays.stream(nums).sum();
15
16 // Initialize a variable to keep track of the running sum of the subsequence
17 int subsequenceSum = 0;
18
19 // Iterate over the array from the last element to the first
20 for (int i = nums.length - 1; i >= 0; i--) {
21 // Add the current element to the subsequence sum
22 subsequenceSum += nums[i];
23 // Add the current element to the result list
24 result.add(nums[i]);
25 // Check if the subsequence sum is greater than the remaining elements' sum
26 if (subsequenceSum > totalSum - subsequenceSum) {
27 // Break the loop if the subsequence sum is greater as we have the minimum subsequence
28 break;
29 }
30 }
31
32 // Return the result list which now contains the minimum subsequence
33 return result;
34 }
35}
36
1#include <vector>
2#include <numeric> // For accumulate
3#include <algorithm> // For sort
4
5class Solution {
6public:
7 // Function to find the smallest subsequence with a sum greater than the sum of the remaining elements.
8 vector<int> minSubsequence(vector<int>& nums) {
9 // Sort the input vector in non-increasing order.
10 sort(nums.rbegin(), nums.rend());
11
12 // Calculate the total sum of all elements in the vector.
13 int totalSum = accumulate(nums.begin(), nums.end(), 0);
14 // This will keep track of the sum of the current subsequence.
15 int subsequenceSum = 0;
16 // This vector will store the elements of the smallest subsequence.
17 vector<int> answer;
18
19 // Iterate over the sorted array to accumulate a sum greater than the half of total sum.
20 for (int num : nums) { // Using num instead of x for clarity.
21 subsequenceSum += num; // Add the current element to the subsequence sum.
22 answer.push_back(num); // Add the current element to the subsequence.
23 // Check if the current subsequence sum is greater than the sum of the remaining elements.
24 if (subsequenceSum > totalSum - subsequenceSum) {
25 break; // Terminate the loop if the condition is true.
26 }
27 }
28
29 // Return the resulting subsequence.
30 return answer;
31 }
32};
33
1function minSubsequence(nums: number[]): number[] {
2 // Sort the array in non-increasing order (largest to smallest)
3 nums.sort((a, b) => b - a);
4
5 // Calculate the sum of all elements in the array
6 const totalSum = nums.reduce((sum, current) => sum + current, 0);
7
8 let subsequenceSum = 0;
9
10 // Iterate through the sorted array
11 for (let i = 0; i < nums.length; i++) {
12 // Add the current element to the subsequence sum
13 subsequenceSum += nums[i];
14
15 // Check if the sum of the elements of the subsequence is greater than
16 // the sum of the remaining elements in the array
17 if (subsequenceSum > totalSum - subsequenceSum) {
18 // If the condition is met, return the subsequence from the start
19 // up to the current element
20 return nums.slice(0, i + 1);
21 }
22 }
23
24 // In case no subsequence is found that satisfies the condition
25 // Though this case won't occur as per the problem's constraints,
26 // we need to return something to satisfy TypeScript's return type.
27 // An empty subsequence signifies failure to find the desired subset.
28 return [];
29}
30
Time and Space Complexity
Time Complexity
The time complexity of the given code is primarily determined by the sorting operation. Here, sorted(nums, reverse=True)
sorts the input list nums
in descending order. The sorting algorithm used in Python's sorted
function is Timsort, which has a time complexity of O(n log n)
for the average and worst case, where n
is the number of elements in the input list.
After sorting, the code iterates through the sorted list once. This single pass through the list has a time complexity of O(n)
.
Therefore, the overall time complexity of the code is dominated by the sorting operation and is O(n log n)
.
Space Complexity
The space complexity of the code involves the space needed for the output list ans
and the temporary space used by the sorting operation.
The output list ans
grows proportionally with the number of elements it includes, which in the worst case, can be all the elements of the input list nums
. Hence, the space complexity for ans
is O(n)
.
The sorting operation may require additional space for its internal workings (temp arrays for mergesort or hybrid sorts like Timsort). In Python, the sorted
function does not sort in-place; instead, it returns a new sorted list. However, since this sorted list is not stored in an additional variable and is used in the same loop for iteration, the dominant additional space is the same as for ans
, which has already been accounted for as O(n)
.
Therefore, the overall space complexity of the code is O(n)
.
Learn more about how to find time and space complexity quickly using problem constraints.
In a binary min heap, the minimum element can be found in:
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