C# without 'else' keyword ;)
List<int> absolutePermutation(int n, int k) { if (k == 0) return Enumerable.Range(1, n).ToList(); HashSet<int> result = new(); for (int i = 1; i <= n; i++) { var permutationElement = i > k ? i - k : i + k; if (permutationElement > n || result.Contains(permutationElement)) { permutationElement = i < k ? i - k : i + k; if (permutationElement > n || result.Contains(permutationElement)) { return new List<int> { -1 }; } } result.Add(permutationElement); } return result.ToList(); }
vector<int> absolutePermutation(int n, int k) { vector<int>arr,brr; for(int i=1;i<=n;i++) arr.push_back(i); if(k==0) return arr; if(n%(2*k)==0){ for(int i=0;i<n/(2*k);i++){ for(int j=1;j<=k;j++) brr.push_back((2*k*i)+k+j); for(int j=1;j<=k;j++){ brr.push_back(2*k*i+j); } } } if(brr.size()==0) return {-1}; return brr; }
python
# P 1 based indexing # hashMap for 1 to N values (P) # |pos[i]-i|=k # pos[i]-i=-k pos[i]-i=k # pos[i]=-k+i pos[i]=k+i # -1 3 # 0 4 # 1 5 # 2 6 # k=4 iValues={} posValues={} for i in range(1,n+1): iValues[i]=(-k+i,k+i) posValues[i]=False result = [] #iValues for i in range(1,n+1): if(iValues[i][0]>0 and posValues[iValues[i][0]]==False): posValues[iValues[i][0]]=True result.append(iValues[i][0]) elif(iValues[i][1]<=n and posValues[iValues[i][1]]==False): posValues[iValues[i][1]]=True result.append(iValues[i][1]) else: return [-1] return result #spaceComplexity 0(n) #runtimeComplexity 0(n)
Absolute Permutation problem Solution In Hacker Rank Here is the solutionClick Here
JAVA
public static List<Integer> absolutePermutation(int n, int k) { Integer[] result = new Integer[n]; int idx; for (int value = 1; value <= n; value++) { idx = value - k; if (idx <= n && idx > 0 && result[idx - 1] == null) { result[idx - 1] = value; } else { idx = value + k; if (idx <= n && idx > 0 && result[idx - 1] == null) { result[idx - 1] = value; } else { result = new Integer[1]; result[0] = -1; return Arrays.asList(result); } } } return Arrays.asList(result); }
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