Discussion on Absolute Permutation Challenge

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4 weeks ago+ 0 comments

A simple python solution that passes all the test cases consists of doing +k -k operations then give privilege to - k operation if applicable else + k operation if applicable to get the smallest P. If - k and + k can not be possible return -1. NOTE that using a set to test if the element has been already used is mandatory, otherwise test cases from 9 to 12 will exceed allowed time:

def absolutePermutation(n, k):
    res = []
    used = set()
    for index in range(1, n + 1):
        lower_option = index - k
        upper_option = index + k
        if lower_option > 0 and lower_option not in used:
            res.append(lower_option)
            used.add(lower_option)
        elif upper_option <= n and upper_option not in used:
            res.append(upper_option)
            used.add(upper_option)
        else:
            return [-1]
    return res

1 month ago+ 0 comments

Easy python

def absolutePermutation(n, k):
    if k == 0: return list(range(1,n+1))
    if (n/k)%2 != 0: return [-1]
    res = []
    up = True
    for i in range(n//k):
        for j in range(k):
            res.append(i*k+1+j + (k if up else -k))
        up = not up
        
        
    return  res

1 month ago+ 0 comments

Simple approach in python:

    P = [0]*(n+1)
    # Try to create P that fulfills |P[i] - i| = k
    for i in range(1,n+1):
        if P[i] == 0:
            # P[i] can be either i+k or i-k.
            # Greedy approach, try to fit the lexicographically smallest first
            if i-k > 0 and P[i-k] == 0:
                P[i], P[i-k] = i-k, i
            elif i+k <= n and P[i+k] == 0:
                P[i], P[i+k] = i+k, i
            else:
                # Not possible
                return [-1]
    # Skips the first element, added just for better code readability
    return P[1:]

2 months ago+ 0 comments

#include <iostream>
#include <vector>
using namespace std;

vector<int> absolutePermutation(int n, int k) {
    vector<int> result;

    // If k is 0, the permutation is just the natural numbers from 1 to n.
    if (k == 0) {
        for (int i = 1; i <= n; ++i) {
            result.push_back(i);
        }
        return result;
    }

    // If n is not divisible by 2 * k, a valid permutation is not possible.
    if (n % (2 * k) != 0) {
        return {-1};
    }

    // Construct the permutation in groups of 2 * k.
    for (int i = 1; i <= n; i += 2 * k) {
        // Add the first k numbers in the group shifted by +k.
        for (int j = 0; j < k; ++j) {
            result.push_back(i + j + k);
        }
        // Add the next k numbers in the group shifted by -k.
        for (int j = 0; j < k; ++j) {
            result.push_back(i + j);
        }
    }

    return result;
}

int main() {
    int t;
    cin >> t; // Number of queries

    while (t--) {
        int n, k;
        cin >> n >> k;

        vector<int> result = absolutePermutation(n, k);

        if (result.size() == 1 && result[0] == -1) {
            cout << "-1\n";
        } else {
            for (int num : result) {
                cout << num << " ";
            }
            cout << "\n";
        }
    }

    return 0;
}

2 months ago+ 0 comments

The task can only be solved under the condition that the array is divided into blocks of size multiples of 2*k, where in each block, result[i] = input[i] + k for "k" times and result[i] = input[i] - k for "k" times. For example, for k=2, (k+1, k+2, 3-k, 4-k) (k+5, k+6, 7-k, 8-k) ... result=[3,4,1,2, 7,8,5,6, ...]

If you're looking for Can Am X3 accessories, they could be used to enhance the performance of the blocks in your task, providing better modularity and adjustability. Sorry if I didn't explain it very clearly.

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