1879. Minimum XOR Sum of Two Arrays
Problem Description
In this problem, you have two integer arrays nums1
and nums2
, each of the same length n
. You need to calculate the XOR sum of these arrays which is obtained by taking the XOR of each corresponding pair of elements from the two arrays and then summing those results up. The XOR operation is a bitwise operation where the result is 1 if the two bits are different and 0 if they are the same.
The XOR sum is computed as follows:
(nums1[0] XOR nums2[0]) + (nums1[1] XOR nums2[1]) + ... + (nums1[n - 1] XOR nums2[n - 1])
The challenge is to rearrange the elements in nums2
in such a way that the resulting XOR sum is as small as possible. In other words, you want to find an optimal permutation of nums2
that when paired with the elements of nums1
, yields the minimum possible XOR sum.
For example, if nums1
is [1,2,3]
and nums2
is [3,2,1]
, the XOR sum of these arrays before any rearrangement is (1 XOR 3) + (2 XOR 2) + (3 XOR 1) = 2 + 0 + 2 = 4
. By rearranging nums2
properly, you might get a smaller XOR sum.
Your task is to determine this minimum XOR sum after rearranging nums2
, and to return it.
Intuition
The solution to this problem is using a dynamic programming approach that involves trying out different combinations of pairings between elements in nums1
and nums2
. Specifically, we use a bitmask to represent the elements from nums2
that have been paired up with elements in nums1
. The bitmask is a binary number where each bit corresponds to an element in nums2
. If a bit is set (i.e., it is 1), it means the corresponding element in nums2
has been used in a pairing.
We start with an array f
to keep track of the minimum XOR sum that can be achieved with each possible bitmask. Initially, f[0]
(representing no elements paired) is set to 0 and all other entries are set to infinity because we haven't computed them yet.
Then, we iterate over all possible bitmasks. For each bitmask, we figure out how many bits are set; this tells us the position (k
) in nums1
that we are considering pairing up. Now, for each bit that is set in the current bitmask, we try unsetting it (which means we're considering that the j
-th element in nums2
could be paired with the k
-th element in nums1
) and calculate the XOR of nums1[k]
and nums2[j]
, and add it to the minimum XOR sum stored in f
for the bitmask without the j
-th bit set.
This is done for each set bit in the bitmask to find the minimum XOR sum possible for that bitmask and store it back in f
. Finally, f[-1]
(which corresponds to all elements in nums2
being paired up) will contain the minimum XOR sum we can achieve, and that's the value we return as the solution.
Learn more about Dynamic Programming and Bitmask patterns.
Solution Approach
The solution approach for minimizing the XOR sum of two integer arrays is a dynamic programming approach that utilizes bit masking to explore the state space of possible pairings. The algorithm uses the following concepts:
-
Dynamic Programming (DP): The idea is to break the problem into overlap subproblems and use DP to remember results of already solved subproblems, such that each subproblem is solved only once. This significantly reduces the computation time as compared to a naive approach that might solve the same subproblems repeatedly.
-
Bitmasking: This technique is used to represent the pairing state of elements from the second array
nums2
. A bitmask is an array that uses each individual bit to represent a binary state (on/off, used/not used). In this case, we are using it to keep track of which elements innums2
have already been paired up with elements innums1
.
Now, let's go through the code:
For every masked state (ranging from 1
to 2^n - 1
, where n
is the size of the arrays), the bit count is retrieved. Here i.bit_count() - 1
calculates the number of set bits in the bitmask and decrements it by one to get the correct index in nums1
since we are zero-indexed.
Next, the algorithm iterates over all possible indices j
in the range of 0
to n-1
to find the index where the bit is set in the current mask (checked by i >> j & 1
) which means that the j
-th element of nums2
is considered for pairing up with the k
-th element of nums1
.
Then, the XOR of nums1[k]
and nums2[j]
is computed and added to the previously computed value of f[i ^ (1 << j)]
(which represents the minimum XOR sum for the state where j
-th bit is not included in the mask). The algorithm selects the minimum of these sums and updates the DP table at f[i]
.
The DP table f
is a one-dimensional array with 2^n
elements (since this is the number of possible states for n
bits), initialized with infinity (inf
) to represent that those XOR sums have not been computed yet, except for the base case f[0]
which is set to 0 because no elements are paired and thus the XOR sum is 0.
Finally, after the algorithm iterates through all subproblems, f[-1]
will hold the minimum XOR sum which is returned as the solution. Note that f[-1]
is Python's way of accessing the last element of the list, which corresponds to the mask where all bits are set and all elements in nums2
have been paired with elements in nums1
.
Here is a simplified outline of the algorithm applied in the code:
- Initialize the DP table
f
withinf
and setf[0]
to0
. - Iterate over all possible bit masks from
1
to2^n - 1
. - Calculate the current position
k
innums1
based on the bitmask using bit count. - For each set bit
j
in the current bitmask, calculate the new XOR sum and updatef[i]
with the minimum value obtained. - Return
f[-1]
as the minimum XOR sum after considering all pairings.
This dynamic programming solution ensures that the minimum XOR sum for any possible pairing is calculated efficiently and accurately by considering all possible combinations without redundant computations.
Ready to land your dream job?
Unlock your dream job with a 2-minute evaluator for a personalized learning plan!
Start EvaluatorExample Walkthrough
Let's take nums1 = [1, 3]
and nums2 = [2, 4]
as an example to illustrate the solution approach.
-
Initialization
First, we initialize our DP tablef
with values set to infinity andf[0]
to 0 because at the start, no elements are paired, so the XOR sum is 0.- So
f = [0, inf, inf, inf]
, corresponding to the 2-bit masks from00
to11
.
- So
-
Iterating Over Bit Masks
We iterate over all possible bit masks from1
to2^n - 1
to calculate the minimum XOR sum for all pairings, wheren
is the size of the input arrays. Since our arrays have 2 elements, we iterate over masks '01' and '10', representing the different pairings.f[1]
will track the results for mask01
(where the second element ofnums2
is used, but not the first).f[2]
will track results for mask10
(where the first element ofnums2
is used, but not the second).
-
Updating DP Table
f
with Subproblem solutions-
Consider the bit mask
01
(binary for 1):
The bit count minus one is0
(1.bit_count() - 1
) which means we are looking to pair the first element ofnums1
with elements ofnums2
.- Pair
nums1[0]
withnums2[1]
(bit set at position 1 in mask01
)
XOR sum is1 XOR 4 = 5
. With the base casef[0] = 0
, the result is0 + 5 = 5
.
So we updatef[1]
tomin(inf, 5)
which is5
.
- Pair
-
Consider the bit mask
10
(binary for 2):
The bit count minus one is0
(1.bit_count() - 1
) which means we're again pairing the first element ofnums1
.- Pair
nums1[0]
withnums2[0]
(bit set at position 0 in mask10
)
XOR sum is1 XOR 2 = 3
. With the base casef[0] = 0
, the result is0 + 3 = 3
.
So we updatef[2]
tomin(inf, 3)
which is3
.
- Pair
-
-
Finding the Minimum XOR Sum
Now, we consider all elements as paired (mask11
represents all bits set), which in this simplified example means we've already made our optimal pairings. We'd usef[1]
andf[2]
to calculate the XOR sum for mask11
, but as it's beyond the size of input arrays, we stick to the subproblem results.Since we compared all possible combinations, we already have our answer and do not need this step for input arrays of size 2.
-
Returning the Result
The minimum XOR sum after rearrangingnums2
is the minimum off[1]
andf[2]
. In this case, it ismin(f[1], f[2])
which equates tomin(5, 3) = 3
.So, the answer for
nums1 = [1, 3]
andnums2 = [2, 4]
after rearrangingnums2
for the minimum XOR sum is3
.
This walk-through covers the dynamic programming solution approach involving bit masks to optimize the XOR sum between two arrays by finding the best possible rearrangement of elements in nums2
.
Solution Implementation
1class Solution:
2 def minimum_xor_sum(self, nums1: List[int], nums2: List[int]) -> int:
3 # Determine the length of the second list
4 length = len(nums2)
5
6 # Initialize a memoization table with infinity values,
7 # representing the minimum XOR sum for each subset
8 memo = [float('inf')] * (1 << length)
9
10 # Base case: the minimum XOR sum for an empty subset is 0
11 memo[0] = 0
12
13 # Iterate over all possible subsets of nums2
14 for bitmask in range(1, 1 << length):
15 # Count the number of bits set in bitmask to determine
16 # the index k in nums1 that is being considered
17 k = bin(bitmask).count('1') - 1
18
19 # Check all elements of nums2 by iterating over bits of bitmask
20 for j in range(length):
21 # If the j-th bit of bitmask is set, calculate the potential XOR sum
22 # and update the memo table accordingly
23 if bitmask & (1 << j):
24 # Clear the j-th bit to find the XOR sum of the previous subset
25 previous_bitmask = bitmask ^ (1 << j)
26
27 # Update the memo table entry for the current bitmask with the minimum
28 # XOR sum obtained by either taking the current element from nums2 or not
29 memo[bitmask] = min(memo[bitmask],
30 memo[previous_bitmask] + (nums1[k] ^ nums2[j]))
31
32 # The last element of memo contains the minimum XOR sum for the full set
33 return memo[-1]
34
1class Solution {
2 public int minimumXORSum(int[] nums1, int[] nums2) {
3 // Get the length of the array.
4 int n = nums1.length;
5 // Initialize the `dp` array with the max possible values (using shift to get 2^30).
6 int[] dp = new int[1 << n];
7 Arrays.fill(dp, 1 << 30);
8 // The starting state has a minimum XOR sum of 0.
9 dp[0] = 0;
10
11 // Iterate over all possible combinations of pairs.
12 for (int i = 0; i < (1 << n); ++i) {
13 // Find the current number of bits set to 1 in the bitmask `i`.
14 int bitCount = Integer.bitCount(i) - 1;
15 for (int j = 0; j < n; ++j) {
16 // Check if the j-th bit in the mask `i` is set to 1.
17 if ((i & (1 << j)) != 0) {
18 // Calculate the new state by unsetting the j-th bit from the bitmask `i`.
19 int prevState = i ^ (1 << j);
20 // Calculate the minimum XOR sum by comparing the previous state with the new masked value.
21 dp[i] = Math.min(dp[i], dp[prevState] + (nums1[bitCount] ^ nums2[j]));
22 }
23 }
24 }
25 // Return the minimum XOR sum for all pairs by examining the last element in `dp` array.
26 return dp[(1 << n) - 1];
27 }
28}
29
1class Solution {
2public:
3 int minimumXORSum(vector<int>& nums1, vector<int>& nums2) {
4 int n = nums1.size(); // Size of the input vectors
5 vector<int> dp(1 << n, INT_MAX); // Initialize the dp array with maximum integer values
6
7 dp[0] = 0; // Initial state: no numbers are paired, so the XOR sum is 0
8
9 // Iterate over all possible states
10 for (int i = 0; i < (1 << n); ++i) {
11 // k represents the number of elements already included from nums1
12 int k = __builtin_popcount(i) - 1;
13 // Iterate over all elements in nums2
14 for (int j = 0; j < n; ++j) {
15 // Check if the j-th element in nums2 has already been paired
16 if (i & (1 << j)) {
17 // If paired, calculate the new value for the dp state
18 // This is done by removing the j-th element from the current state (using XOR)
19 // Then, add the XOR of nums1[k] and nums2[j] to the dp value of the previous state
20 // Update the dp value with the minimum result between its current value and the new calculated value
21 dp[i] = min(dp[i], dp[i ^ (1 << j)] + (nums1[k] ^ nums2[j]));
22 }
23 }
24 }
25 // Return the result for the state where all elements are included
26 return dp[(1 << n) - 1];
27 }
28};
29
1function minimumXORSum(nums1: number[], nums2: number[]): number {
2 const n = nums1.length; // length of the arrays
3 const dp: number[] = Array(1 << n).fill(1 << 30); // dynamic programming array initialized with high values
4 dp[0] = 0; // base case: XOR sum is 0 when there are no numbers to pair
5
6 // Iterate over all possible subsets of pairs created from nums2
7 for (let i = 0; i < (1 << n); ++i) {
8 const bitsSet = bitCount(i) - 1; // calculate how many bits are set in i
9
10 // Try matching each element in nums2 with nums1 based on bits set
11 for (let j = 0; j < n; ++j) {
12 if (((i >> j) & 1) === 1) { // if the j-th bit is set
13 // Calculate new minimum XOR for the new subset by toggling j-th bit
14 dp[i] = Math.min(dp[i], dp[i ^ (1 << j)] + (nums1[bitsSet] ^ nums2[j]));
15 }
16 }
17 }
18
19 // dp[(1 << n) - 1] contains the answer for the full set
20 return dp[(1 << n) - 1];
21}
22
23// Helper function that returns the count of set bits in the binary representation of i
24function bitCount(i: number): number {
25 // Binary magic to count number of 1s
26 i = i - ((i >>> 1) & 0x55555555);
27 i = (i & 0x33333333) + ((i >>> 2) & 0x33333333);
28 i = (i + (i >>> 4)) & 0x0f0f0f0f;
29 i = i + (i >>> 8);
30 i = i + (i >>> 16);
31 return i & 0x3f;
32}
33
Time and Space Complexity
The code provided is a solution to the Minimum XOR Sum problem using dynamic programming with bit masking to represent different combinations of pairings between elements in nums1
and nums2
.
Time Complexity
The time complexity can be analyzed by looking at the two nested loops in which the outer loop iterates over all subsets of nums2
and the inner loop iterates over every individual element in nums2
.
- The outer loop runs for
2^n
iterations because it loops over all possible subsets of a set withn
elements, which are represented as bit masks. - The inner loop runs for
n
iterations because it checks each position in the bit mask to see if it is set (which corresponds tonums2[j]
being selected).
Since the inner loop operates within the outer loop, the total time complexity is O(n * 2^n)
.
Space Complexity
The space complexity is primarily determined by the storage of the array f
, which has a length of 2^n
to represent all possible combinations of matching nums2
elements with elements in nums1
.
So, the space complexity is O(2^n)
as that is the size of the array f
.
Learn more about how to find time and space complexity quickly using problem constraints.
You are given an array of intervals where intervals[i] = [start_i, end_i]
represent the start and end of the ith
interval. You need to merge all overlapping intervals and return an array of the non-overlapping intervals that cover all the intervals in the input.
Recommended Readings
What is Dynamic Programming Prerequisite DFS problems dfs_intro Backtracking problems backtracking Memoization problems memoization_intro Pruning problems backtracking_pruning Dynamic programming is an algorithmic optimization technique that breaks down a complicated problem into smaller overlapping sub problems in a recursive manner and uses solutions to the sub problems to construct a solution
Bitmask and Dynamic Programming Bit manipulation is a crucial aspect of computer programming and one of the most powerful tools for bit manipulation is bitmasks Let's first understand what a bit is A bit is a binary digit It's the smallest piece of data in a computer and can be
LeetCode Patterns Your Personal Dijkstra's Algorithm to Landing Your Dream Job The goal of AlgoMonster is to help you get a job in the shortest amount of time possible in a data driven way We compiled datasets of tech interview problems and broke them down by patterns This way we
Want a Structured Path to Master System Design Too? Don’t Miss This!