1605. Find Valid Matrix Given Row and Column Sums
Medium
You are given two arrays rowSum and colSum of non-negative integers where rowSum[i] is the sum of the elements in the ith row and colSum[j] is the sum of the elements of the jth column of a 2D matrix. In other words, you do not know the elements of the matrix, but you do know the sums of each row and column.
Find any matrix of non-negative integers of size rowSum.length x colSum.length that satisfies the rowSum and colSum requirements.
Return a 2D array representing any matrix that fulfills the requirements. It's guaranteed that at least one matrix that fulfills the requirements exists.
Example 1:
Input: rowSum = [3,8], colSum = [4,7] Output: [[3,0], [1,7]] Explanation: 0th row: 3 + 0 = 0 == rowSum[0] 1st row: 1 + 7 = 8 == rowSum[1] 0th column: 3 + 1 = 4 == colSum[0] 1st column: 0 + 7 = 7 == colSum[1] The row and column sums match, and all matrix elements are non-negative. Another possible matrix is: [[1,2], [3,5]]
Example 2:
Input: rowSum = [5,7,10], colSum = [8,6,8] Output: [[0,5,0], [6,1,0], [2,0,8]]
Example 3:
Input: rowSum = [14,9], colSum = [6,9,8] Output: [[0,9,5], [6,0,3]]
Example 4:
Input: rowSum = [1,0], colSum = [1] Output: [[1], [0]]
Example 5:
Input: rowSum = [0], colSum = [0] Output: [[0]]
Constraints:
1 <= rowSum.length, colSum.length <= 5000 <= rowSum[i], colSum[i] <= 108sum(rows) == sum(columns)
1 2 3 4 5 6 7 8 9 10 11 12 | class Solution { public int[][] restoreMatrix(int[] row, int[] col) { int m = row.length, n = col.length, i = 0, j = 0, a; int[][] A = new int[m][n]; while (i < m && j < n) { a = A[i][j] = Math.min(row[i], col[j]); if ((row[i] -= a) == 0) ++i; if ((col[j] -= a) == 0) ++j; } return A; } } |
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