Given a binary string S of length N. The task is to find the following:
- The minimum number of subsequences, string S can be divided into, such that the subsequence does not contain adjacent zeroes or ones.
- Subsequence number to which each character of string S belongs.
If there are many answers, output any.
Examples:
Input: S = “0011”, N = 4
Output:
2
1 2 2 1
Explanation:
There can be a minimum of 2 subsequences such that they donot have any adjacent zeroes or ones.
Subsequence 1: “01”
Subsequence 2: “01”
Also, the first character of S(‘0’) belongs to subsequence 1(“01”)
Second character of S(‘0’) belongs to subsequence 2(“01”)
Third character of S(‘1’) belongs to subsequence 2(“01”)
Fourth character of S(‘1’) belongs to subsequence 1(“01”)Input: S = “1000110”, N = 7
Output:
3
1 1 2 3 3 2 2
Approach: It is to be noted that a subsequence is a sequence that can be derived from the given sequence by deleting zero or more elements without changing the order of the remaining elements. Now, follow the steps below to solve the problem:
- Create a vector ans to store the subsequences to which each character of string S belongs.
- Also, create two vectors endZero and endOne to store the subsequences ending with ‘0’ and ‘1’ respectively.
- As there can’t be adjacent zeroes or ones in a subsequence. Hence, if a character is ‘0’, the next character to be put in the subsequence must be ‘1’ and vice versa.
- Now, using a loop traverse over each character of S and check if it is ‘0’ or ‘1’. Also, declare a variable newSeq which represents the new subsequence to be formed if consecutive zeroes or ones are encountered.
- If a character is ‘0’, check whether the vector endOne is empty or not:
- If it is empty, then push newSeq into endZero.
- Otherwise, put the last subsequence of endOne into newSeq. Now, this last subsequence of endOne does not end with ‘1’ anymore as ‘0’ has been appended to it. Thus, push it in endZero.
- Similarly, if a character in S is ‘1’, the same steps as above are followed, i.e., check whether vector endZero is empty or not:
- If it is empty, then push newSeq into endOne.
- Otherwise, put the last subsequence of endZero into newSeq. Now, this last subsequence of endZero does not end with ‘0’ anymore as ‘1’ has been appended to it. Thus, push it in endOne.
- Then, push newSeq into vector ans.
- Repeat the above steps for each character of S.
- The minimum number of subsequences will be given by the sum of the sizes of endZero and endOne.
- Finally, output the minimum number of subsequences and the vector ans.
Below is the implementation of the above approach:
// C++ program for the above approach #include <bits/stdc++.h> using namespace std;
// Function to find the minimum number of // subsequences into which S has to divide // and the subsequences to which each character // of S belongs to. void findSeq(string S, int N)
{ // Stores the subsequences to which each
// character of S belongs to.
vector< int > ans(N);
// Store the subsequences ending with zeroes
// and ones respectively.
vector< int > endZero, endOne;
// Loop to traverse each character of S
for ( int i = 0; i < N; ++i) {
// Stores the number of new
// subsequence to be formed
int newSeq = endZero.size()
+ endOne.size();
// If the character is '0'
if (S[i] == '0' ) {
// If there is no string
// which ends with '1'
if (endOne.empty()) {
// Push newSeq into endZero
endZero.push_back(newSeq);
}
else {
// Put the last element
// of endOne into newSeq
newSeq = endOne.back();
// Remove the last
// element of endOne
endOne.pop_back();
// newSeq ends with '0'
endZero.push_back(newSeq);
}
}
else {
// If there is no string
// which ends with '0'
if (endZero.empty()) {
// Push newSeq into endOne
endOne.push_back(newSeq);
}
else {
// Put the last element
// of endZero into newSeq
newSeq = endZero.back();
// Remove the last element of endOne
endZero.pop_back();
// newSeq ends with '1'
endOne.push_back(newSeq);
}
}
// Put newSeq into vector ans
ans[i] = newSeq;
}
// Output the minimum
// number of subsequences
cout << endZero.size()
+ endOne.size()
<< endl;
// Output the subsequences
// to which each character
// of S belongs to
for ( int i = 0; i < N; ++i) {
// Add 1 as the index starts from 0
cout << ans[i] + 1 << " " ;
}
} // Driver Code int main()
{ // Given input
string S = "1000110" ;
int N = 7;
// Function Call
findSeq(S, N);
return 0;
} |
// Java program for the above approach import java.util.ArrayList;
class GFG {
// Function to find the minimum number of
// subsequences into which S has to divide
// and the subsequences to which each character
// of S belongs to.
public static void findSeq(String S, int N)
{
// Stores the subsequences to which each
// character of S belongs to.
int [] ans = new int [N];
// Store the subsequences ending with zeroes
// and ones respectively.
ArrayList<Integer> endZero = new ArrayList<Integer>();
ArrayList<Integer> endOne = new ArrayList<Integer>();
// Loop to traverse each character of S
for ( int i = 0 ; i < N; ++i) {
// Stores the number of new
// subsequence to be formed
int newSeq = endZero.size() + endOne.size();
// If the character is '0'
if (S.charAt(i) == '0' ) {
// If there is no string
// which ends with '1'
if (endOne.isEmpty()) {
// Push newSeq into endZero
endZero.add(newSeq);
} else {
// Put the last element
// of endOne into newSeq
newSeq = endOne.get(endOne.size() - 1 );
// Remove the last
// element of endOne
endOne.remove(endOne.size() - 1 );
// newSeq ends with '0'
endZero.add(newSeq);
}
} else {
// If there is no string
// which ends with '0'
if (endZero.isEmpty()) {
// Push newSeq into endOne
endOne.add(newSeq);
} else {
// Put the last element
// of endZero into newSeq
newSeq = endZero.get(endZero.size() - 1 );
// Remove the last element of endOne
endZero.remove(endZero.size() - 1 );
// newSeq ends with '1'
endOne.add(newSeq);
}
}
// Put newSeq into vector ans
ans[i] = newSeq;
}
// Output the minimum
// number of subsequences
System.out.println(endZero.size() + endOne.size());
// Output the subsequences
// to which each character
// of S belongs to
for ( int i = 0 ; i < N; ++i) {
// Add 1 as the index starts from 0
System.out.print(ans[i] + 1 + " " );
}
}
// Driver Code
public static void main(String args[]) {
// Given input
String S = "1000110" ;
int N = 7 ;
// Function Call
findSeq(S, N);
}
} // This code is contributed by gfgking. |
# python program for the above approach # Function to find the minimum number of # subsequences into which S has to divide # and the subsequences to which each character # of S belongs to. def findSeq(S, N):
# Stores the subsequences to which each
# character of S belongs to.
ans = [ 0 for _ in range (N)]
# Store the subsequences ending with zeroes
# and ones respectively.
endZero = []
endOne = []
# Loop to traverse each character of S
for i in range ( 0 , N):
# Stores the number of new
# subsequence to be formed
newSeq = len (endZero) + len (endOne)
# If the character is '0'
if (S[i] = = '0' ):
# If there is no string
# which ends with '1'
if ( len (endOne) = = 0 ):
# Push newSeq into endZero
endZero.append(newSeq)
else :
# Put the last element
# of endOne into newSeq
newSeq = endOne[ len (endOne) - 1 ]
# Remove the last
# element of endOne
endOne.pop()
# newSeq ends with '0'
endZero.append(newSeq)
else :
# If there is no string
# which ends with '0'
if ( len (endZero) = = 0 ):
# Push newSeq into endOne
endOne.append(newSeq)
else :
# Put the last element
# of endZero into newSeq
newSeq = endZero[ len (endZero) - 1 ]
# Remove the last element of endOne
endZero.pop()
# newSeq ends with '1'
endOne.append(newSeq)
# Put newSeq into vector ans
ans[i] = newSeq
# Output the minimum
# number of subsequences
print ( len (endZero) + len (endOne))
# Output the subsequences
# to which each character
# of S belongs to
for i in range ( 0 , N):
# Add 1 as the index starts from 0
print (ans[i] + 1 , end = " " )
# Driver Code if __name__ = = "__main__" :
# Given input
S = "1000110"
N = 7
# Function Call
findSeq(S, N)
# This code is contributed by rakeshsahni
|
// C# program for the above approach using System;
using System.Collections.Generic;
class GFG
{ // Function to find the minimum number of
// subsequences into which S has to divide
// and the subsequences to which each character
// of S belongs to.
public static void findSeq(String S, int N)
{
// Stores the subsequences to which each
// character of S belongs to.
int [] ans = new int [N];
// Store the subsequences ending with zeroes
// and ones respectively.
List< int > endZero = new List< int >();
List< int > endOne = new List< int >();
// Loop to traverse each character of S
for ( int i = 0; i < N; ++i)
{
// Stores the number of new
// subsequence to be formed
int newSeq = endZero.Count + endOne.Count;
// If the character is '0'
if (S[i] == '0' )
{
// If there is no string
// which ends with '1'
if (endOne.Count == 0)
{
// Push newSeq into endZero
endZero.Add(newSeq);
}
else
{
// Put the last element
// of endOne into newSeq
newSeq = endOne[endOne.Count - 1];
// Remove the last
// element of endOne
endOne.Remove(endOne.Count - 1);
// newSeq ends with '0'
endZero.Add(newSeq);
}
}
else
{
// If there is no string
// which ends with '0'
if (endZero.Count == 0)
{
// Push newSeq into endOne
endOne.Add(newSeq);
}
else
{
// Put the last element
// of endZero into newSeq
newSeq = endZero[endZero.Count - 1];
// Remove the last element of endOne
endZero.Remove(endZero.Count - 1);
// newSeq ends with '1'
endOne.Add(newSeq);
}
}
// Put newSeq into vector ans
ans[i] = newSeq;
}
// Output the minimum
// number of subsequences
Console.WriteLine(endZero.Count + endOne.Count);
// Output the subsequences
// to which each character
// of S belongs to
for ( int i = 0; i < N; ++i)
{
// Add 1 as the index starts from 0
Console.Write(ans[i] + 1 + " " );
}
}
// Driver Code
public static void Main()
{
// Given input
String S = "1000110" ;
int N = 7;
// Function Call
findSeq(S, N);
}
} // This code is contributed by gfgking. |
<script> // JavaScript Program to implement
// the above approach
// Function to find the minimum number of
// subsequences into which S has to divide
// and the subsequences to which each character
// of S belongs to.
function findSeq(S, N)
{
// Stores the subsequences to which each
// character of S belongs to.
let ans = new Array(N);
// Store the subsequences ending with zeroes
// and ones respectively.
let endZero = [], endOne = [];
// Loop to traverse each character of S
for (let i = 0; i < N; ++i) {
// Stores the number of new
// subsequence to be formed
let newSeq = endZero.length
+ endOne.length;
// If the character is '0'
if (S[i] == '0' ) {
// If there is no string
// which ends with '1'
if (endOne.length == 0) {
// Push newSeq into endZero
endZero.push(newSeq);
}
else {
// Put the last element
// of endOne into newSeq
newSeq = endOne[endOne.length - 1];
// Remove the last
// element of endOne
endOne.pop();
// newSeq ends with '0'
endZero.push(newSeq);
}
}
else {
// If there is no string
// which ends with '0'
if (endZero.length == 0) {
// Push newSeq into endOne
endOne.push(newSeq);
}
else {
// Put the last element
// of endZero into newSeq
newSeq = endZero[endZero.length - 1];
// Remove the last element of endOne
endZero.pop();
// newSeq ends with '1'
endOne.push(newSeq);
}
}
// Put newSeq into vector ans
ans[i] = newSeq;
}
// Output the minimum
// number of subsequences
document.write(endZero.length
+ endOne.length
+ '<br>' );
// Output the subsequences
// to which each character
// of S belongs to
for (let i = 0; i < N; ++i) {
// Add 1 as the index starts from 0
document.write(ans[i] + 1 + " " );
}
}
// Driver Code
// Given input
let S = "1000110" ;
let N = 7;
// Function Call
findSeq(S, N);
// This code is contributed by Potta Lokesh
</script>
|
3 1 1 2 3 3 2 2
Time Complexity: O(N)
Auxiliary Space: O(N)