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ConstructTheLexicographicallyLargestValidSequence.cpp
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ConstructTheLexicographicallyLargestValidSequence.cpp
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// Source : https://leetcode.com/problems/construct-the-lexicographically-largest-valid-sequence/
// Author : Hao Chen
// Date : 2021-04-24
/*****************************************************************************************************
*
* Given an integer n, find a sequence that satisfies all of the following:
*
* The integer 1 occurs once in the sequence.
* Each integer between 2 and n occurs twice in the sequence.
* For every integer i between 2 and n, the distance between the two occurrences of i is
* exactly i.
*
* The distance between two numbers on the sequence, a[i] and a[j], is the absolute difference of
* their indices, |j - i|.
*
* Return the lexicographically largest sequence. It is guaranteed that under the given constraints,
* there is always a solution.
*
* A sequence a is lexicographically larger than a sequence b (of the same length) if in the first
* position where a and b differ, sequence a has a number greater than the corresponding number in b.
* For example, [0,1,9,0] is lexicographically larger than [0,1,5,6] because the first position they
* differ is at the third number, and 9 is greater than 5.
*
* Example 1:
*
* Input: n = 3
* Output: [3,1,2,3,2]
* Explanation: [2,3,2,1,3] is also a valid sequence, but [3,1,2,3,2] is the lexicographically largest
* valid sequence.
*
* Example 2:
*
* Input: n = 5
* Output: [5,3,1,4,3,5,2,4,2]
*
* Constraints:
*
* 1 <= n <= 20
******************************************************************************************************/
class Solution {
private:
void print(vector<int>& v) {
cout << "[" ;
for(int i=0; i<v.size()-1; i++){
cout << v[i] << ",";
}
cout << v[v.size()-1] << "]" << endl;
}
public:
vector<int> constructDistancedSequence(int n) {
vector<int> result(2*n-1, 0);
vector<bool> available(n+1, true); // an array remember which num hasn't been chosen.
available[0] = false;
dfs(available, result, 0, n);
return result;
}
bool dfs(vector<bool>& available, vector<int>& result, int pos, int cnt){
//the `cnt` means how many number has been processed.
if (cnt == 0) return true;
//start from the bigger number.
int n = 0;
for(int i = available.size()-1; i > 0; i--){
// if the number has already been chosen, skip to next one.
if (!available[i]) continue;
//if the number cannot be put into the array, skip to next one
if ( i > 1 && pos + i >= result.size()) continue;
if ( i > 1 && (result[pos] != 0 || result[pos+i] != 0)) continue;
// choose the current number `i`
available[i] = false;
result[pos] = i;
if (i > 1) result[pos+i] = i;
int next_pos = pos;
while( next_pos < result.size() && result[next_pos]!=0) next_pos++;
//print(result);
if (dfs(available, result, next_pos, cnt-1)) return true;
// if failed to find the answer. roll back.
available[i] = true;
result[pos] = 0;
if (i > 1) result[pos+i] = 0;
}
return false;
}
};