100-days-of-rust/Week-12/Day-84-Vestigium/README.md
2023-03-23 21:38:35 -04:00

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Vestigium

Vestigium means "trace" in Latin. In this problem we work with Latin squares and matrix traces.

The trace of a square matrix is the sum of the values on the main diagonal (which runs from the upper left to the lower right).

An N-by-N square matrix is a Latin square if each cell contains one of N different values, and no value is repeated within a row or a column. In this problem, we will deal only with "natural Latin squares" in which the N values are the integers between 1 and N.

Given a matrix that contains only integers between 1 and N, we want to compute its trace and check whether it is a natural Latin square. To give some additional information, instead of simply telling us whether the matrix is a natural Latin square or not, please compute the number of rows and the number of columns that contain repeated values.

Input

The first line of the input gives the number of test cases, T. T test cases follow. Each starts with a line containing a single integer N: the size of the matrix to explore. Then, N lines follow. The i-th of these lines contains N integers Mi,1, Mi,2 ..., Mi,N. Mi,j is the integer in the i-th row and j-th column of the matrix.

Output

For each test case, output one line containing Case #x: k r c, where x is the test case number (starting from 1), k is the trace of the matrix, r is the number of rows of the matrix that contain repeated elements, and c is the number of columns of the matrix that contain repeated elements.

Limits

Test set 1 (Visible Verdict) Time limit: 20 seconds per test set. Memory limit: 1GB. 1 ≤ T ≤ 100. 2 ≤ N ≤ 100. 1 ≤ Mi,j ≤ N, for all i, j.

Sample

Input              Output

3
4
1 2 3 4
2 1 4 3
3 4 1 2
4 3 2 1
4               Case #1: 4 0 0
2 2 2 2         Case #2: 9 4 4
2 3 2 3         Case #3: 8 0 2
2 2 2 3
2 2 2 2
3
2 1 3
1 3 2
1 2 3

In Sample Case #1, the input is a natural Latin square, which means no row or column has repeated elements. All four values in the main diagonal are 1, and so the trace (their sum) is 4.

In Sample Case #2, all rows and columns have repeated elements. Notice that each row or column with repeated elements is counted only once regardless of the number of elements that are repeated or how often they are repeated within the row or column. In addition, notice that some integers in the range 1 through N may be absent from the input.

In Sample Case #3, the leftmost and rightmost columns have repeated elements.

#Analysis

One simple way to check whether the values in a row or column are a permutation of the values from 1 to N is to sort them and then step through them, checking whether the sorted list starts at 1 and increases by 1 each time. Another option, which avoids the sort and takes time linear in N, is to look at the values one by one and store each one in a hash table-based data structure. If we ever find that a value is already in the set, then that row or column contains a repeated value. Because there are N values and the problem guarantees that they are integers between 1 and N, inclusive, the absence of duplicates implies that we have a permutation as desired.

Finding the trace is also straightforward — iterate through the rows taking the i-th value from the i-th row, and add the values together.