1122. Relative Sort Array
Problem Description
In this problem, we are provided with two integer arrays, arr1
and arr2
. The elements within arr2
are distinct, which means no element repeats itself, and all these elements are present within arr1
. Our goal is to sort arr1
so that the order of elements matches how they appear in arr2
, while any elements that are not found in arr2
should be appended to the end of arr1
in ascending order.
For example, if we have arr1 = [2,3,1,3,2,4,6,7,9,2,19]
and arr2 = [2,1,4,3,9,6]
, the first step is to arrange the elements of arr1
that are also in arr2
in the order they appear in arr2
: [2,2,2,1,4,3,3,9,6]
. After that, we take the remaining elements that are not in arr2
(which are 7, 19, and 7 in this case) and place them at the end in sorted order: [7,19,7]
. The final output array would be the concatenation of these two processes, giving us [2,2,2,1,4,3,3,9,6,7,7,19]
.
The challenge lies in figuring out a strategy that allows us to sort arr1
with these constraints in mind.
Intuition
The key to solving this problem efficiently is to recognize that we can use a custom sorting strategy. The default sort mechanisms most programming languages provide can often be customized with a user-defined key function that determines the sort order.
Given that the elements in arr2
are the first to be sorted and they are in a specific order, we need to have this order play a significant role in our custom sorting strategy. For elements that are in arr2
, we want them to appear first and in the order they are found in arr2
.
To achieve this, we can map each element of arr2
to its position (or index) within arr2
. This can be done using a dictionary or a hash map that takes the element as a key and the position of that element in arr2
as the value.
In Python, this mapping can be created as follows:
pos = {x: i for i, x in enumerate(arr2)}
For the elements of arr1
that are not found in arr2
, we need to ensure they come after any element that is in arr2
. One way to do this is to assign them an index that is larger than any index that would be assigned to the elements that are in arr2
. Since indices in Python are zero-based and arr2
can have, at most, the same number of elements as arr1
, all the elements not in arr2
can be given an index based on a large number (for example, 1000) plus their value, which ensures they will be sorted in ascending order after the elements of arr2
.
Now, using Python's sorted
function, we can sort arr1
with a custom key. This key is defined by a lambda function that takes an element x
and returns its corresponding index from the dictionary pos
if it's in arr2
, or 1000 + x
otherwise.
Here's the implementation in Python, which reflects our approach:
sorted(arr1, key=lambda x: pos.get(x, 1000 + x))
By using this custom sorting key, we align arr1
elements per arr2
's order and then append the remaining elements in ascending order right after. The overall runtime complexity of the solution is O(NlogN), where N is the length of arr1
.
Learn more about Sorting patterns.
Solution Approach
The solution is implemented using a dictionary for direct mapping and the sorting algorithm that Python provides. Here's a step-by-step explanation, referencing the provided code:
-
Create a Mapping of
arr2
: The solution starts by creating a dictionary calledpos
. This dictionary maps each elementx
ofarr2
to its indexi
in the array. This is done using a dictionary comprehension:pos = {x: i for i, x in enumerate(arr2)}
By doing this, we are setting up a quick reference so that we can look up the index of any element from
arr2
instantly. This index acts as a custom priority value for the sorting algorithm. -
Custom Sort with a Lambda Function: We need to sort
arr1
, but not by its elements' natural order. We will use Python'ssorted
function, which allows us to specify a custom key function:sorted(arr1, key=lambda x: pos.get(x, 1000 + x))
The
key
parameter is crucial here. It takes a lambda function which determines how the elements ofarr1
should be compared during sorting:lambda x:
is an anonymous function that takesx
, an element fromarr1
.pos.get(x, 1000 + x)
is the function's body that returns a value for eachx
that will be used to compare during sorting.- If
x
is found inarr2
(and, as a result, thepos
dictionary),pos.get(x)
returns the index ofx
fromarr2
. - If
x
is not found inarr2
, the methodpos.get(x, 1000 + x)
provides a default value which is the sum of 1000 and the elementx
itself. This ensures that:- The elements not in
arr2
are ordered at the end because their sorting key is greater than any index assigned fromarr2
. - They are sorted in ascending order amongst themselves because if two elements are not found in
arr2
, their sorting key is simply their value (1000 + their own value
respects the natural ascending order).
- The elements not in
By using this sorting strategy, we can maintain the relative ordering based on another array arr2
while also logically appending and sorting elements not found in arr2
.
Thus, using a combination of dictionary for direct access and sorting algorithm with a custom key function, this solution efficiently achieves the required array manipulation adhering to the conditions of the problem statement.
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Start EvaluatorExample Walkthrough
Let's illustrate the solution approach using a smaller example. Suppose arr1
contains [8, 4, 5, 4, 6]
and arr2
contains [4, 6]
. We want to sort arr1
such that the order of arr2
is preserved for common elements, and the rest are sorted in ascending order at the end.
Step 1: Create a Mapping for arr2
Elements:
First, we create a dictionary that maps each element of arr2
to its index:
pos = {x: i for i, x in enumerate(arr2)}
# pos will be {4: 0, 6: 1}
Here, 4
is at index 0
in arr2
and 6
is at index 1
.
Step 2: Sort arr1
with a Custom Sort Key:
We now sort arr1
using Python's sorted
function with the custom key:
sorted(arr1, key=lambda x: pos.get(x, 1000 + x))
Breaking down how the key function works for each element in arr1
:
8
is not found inarr2
, so the key would be1000 + 8 = 1008
.- The first
4
is found inarr2
and its index is0
; hence, the key would be0
. 5
is not found inarr2
, so its key is1000 + 5 = 1005
.- The second
4
is found and its key is again0
. 6
is found and its index is1
, so the key is1
.
The sorted order using these keys would be [4, 4, 6, 5, 8]
.
Step 3: Review the Final Sorted Array:
So, the elements from arr1
that were also in arr2
are now sorted in arr2
order: 4
comes first, followed by 6
. The remaining elements, not in arr2
, follow at the end in ascending order: 5
and then 8
.
In conclusion, after applying the custom key sorting strategy to arr1
, we get the final sorted array: [4, 4, 6, 5, 8]
, successfully matching the required conditions.
Solution Implementation
1class Solution:
2 def relative_sort_array(self, arr1: List[int], arr2: List[int]) -> List[int]:
3 # Create a dictionary to map elements of arr2 to their indices.
4 position_map = {value: index for index, value in enumerate(arr2)}
5
6 # Sort arr1 based on the condition that elements of arr2 should come first
7 # in the order they appear in arr2, followed by the remaining elements in
8 # ascending order.
9 sorted_arr1 = sorted(arr1, key=lambda x: position_map.get(x, 1000 + x))
10
11 # The lambda function inside sorted uses the 'get' method to find the position
12 # of x from position_map if x exists in arr2. Otherwise, it assigns a number
13 # greater than 1000 to ensure that x is positioned after all elements of arr2.
14 # This is based on the assumption that the elements of arr1 do not exceed 1000.
15
16 return sorted_arr1
17
1class Solution {
2 public int[] relativeSortArray(int[] arr1, int[] arr2) {
3 // Create a hashmap to store the positions of each element in arr2
4 Map<Integer, Integer> elementToIndexMap = new HashMap<>(arr2.length);
5 // Fill the map with the positions of the elements
6 for (int index = 0; index < arr2.length; ++index) {
7 elementToIndexMap.put(arr2[index], index);
8 }
9
10 // Create a new 2D array to hold elements and their corresponding positions
11 int[][] elementPositionPairs = new int[arr1.length][0];
12 for (int index = 0; index < elementPositionPairs.length; ++index) {
13 // Use the position from arr2 if present, or else use the value from arr1 plus the length of arr2
14 elementPositionPairs[index] = new int[]{arr1[index], elementToIndexMap.getOrDefault(arr1[index], arr2.length + arr1[index])};
15 }
16
17 // Sort the 2D array based on the positions
18 Arrays.sort(elementPositionPairs, (pair1, pair2) -> pair1[1] - pair2[1]);
19
20 // Place the sorted elements back into arr1
21 for (int index = 0; index < elementPositionPairs.length; ++index) {
22 arr1[index] = elementPositionPairs[index][0];
23 }
24
25 // Return the sorted arr1
26 return arr1;
27 }
28}
29
1#include <vector>
2#include <unordered_map>
3#include <algorithm>
4
5class Solution {
6public:
7 // Function to sort arr1 with respect to the order in arr2
8 std::vector<int> relativeSortArray(std::vector<int>& arr1, std::vector<int>& arr2) {
9 // We will use an unordered_map to store the position (index) of
10 // each element in arr2; this position is used when sorting arr1
11 std::unordered_map<int, int> elementToIndex;
12 for (int i = 0; i < arr2.size(); ++i) {
13 elementToIndex[arr2[i]] = i; // Map the element to its index in arr2
14 }
15
16 // Vector to temporarily store pairs of position and value
17 // from original array arr1. If the element does not exist in arr2,
18 // we assign the index as the size of arr2 which is effectively
19 // putting it at the end of the sorted array.
20 std::vector<std::pair<int, int>> tempArray;
21 for (int value : arr1) {
22 // Find the index if value exists in arr2; for elements not in arr2, set index to arr2's size
23 int index = elementToIndex.count(value) ? elementToIndex[value] : arr2.size();
24 // Create a pair of (index, value) for each element in arr1
25 tempArray.emplace_back(index, value);
26 }
27
28 // Sort the tempArray based on the previously stored positions (indices)
29 // If two elements have the same position, they're compared by their values
30 std::sort(tempArray.begin(), tempArray.end());
31
32 // Reassign sorted values back to arr1
33 for (int i = 0; i < arr1.size(); ++i) {
34 arr1[i] = tempArray[i].second; // Set arr1[i] with the value from the sorted pair
35 }
36
37 // Return the sorted arr1
38 return arr1;
39 }
40};
41
1// Given two arrays arr1 and arr2, the function sorts elements of arr1
2// such that the relative ordering of items in arr1 are the same as in arr2.
3// Elements not present in arr2 will be placed at the end of arr1 in ascending order.
4function relativeSortArray(arr1: number[], arr2: number[]): number[] {
5 // Create a mapping of element to its position for quick access
6 const elementToIndex: Map<number, number> = new Map();
7 // Fill the map with elements of arr2 and their corresponding indices
8 for (let index = 0; index < arr2.length; ++index) {
9 elementToIndex.set(arr2[index], index);
10 }
11
12 // Initialize an array to hold pairs of position in arr2 and the value
13 const sortedPairs: [number, number][] = [];
14
15 // Map each element of arr1 to its corresponding index in arr2, with a fallback index
16 for (const element of arr1) {
17 // Get the index position of the element from the map or use default if not present
18 const indexInArr2 = elementToIndex.get(element) ?? arr2.length;
19 sortedPairs.push([indexInArr2, element]);
20 }
21
22 // Sort the array: first by the index position and then by the element values
23 sortedPairs.sort((a, b) => a[0] - b[0] || a[1] - b[1]);
24
25 // Map the sorted array back to a single array of values
26 return sortedPairs.map(pair => pair[1]);
27}
28
Time and Space Complexity
Time Complexity
The time complexity of the given code primarily depends on the sorting algorithm used by the sorted
function in Python.
- Creating the
pos
dictionary has a time complexity ofO(M)
whereM
is the length ofarr2
, since we iterate over each element ofarr2
once. - The
sorted
function has a time complexity ofO(N log N)
whereN
is the length ofarr1
. This is because Python uses the TimSort algorithm for sorting, which is a hybrid sorting algorithm derived from merge sort and insertion sort.
However, since the key function in the sorted algorithm uses a lookup in the pos
dictionary, which is O(1)
time complexity for each element, together with the condition to handle elements not in pos
, the overall time complexity of the sorting with these operations is still O(N log N)
.
Therefore, the total time complexity of the algorithm is O(M + N log N)
.
Space Complexity
The space complexity of the algorithm consists of the space needed for the pos
dictionary and any additional space used by the sorting algorithm:
- The
pos
dictionary has a space complexity ofO(M)
because it contains as many entries as there are elements inarr2
. - The
sorted
function returns a new list and internally uses additional space which depends on the specifics of the implementation. In the worst case, this could beO(N)
space.
The total space complexity is therefore O(M + N)
.
Learn more about how to find time and space complexity quickly using problem constraints.
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