Given a numeric string S, the task is to find the maximum length of a subsequence having its left rotation equal to its right rotation.
Examples:
Input: S = “100210601”
Output: 4
Explanation:
The subsequence “0000” satisfies the necessary condition.
The subsequence “1010” generates the string “0101” on left rotation and string “0101” on right rotation. Since both the rotations are same. Therefore, “1010” satisfies the condition as well.
Therefore, the maximum length of such subsequence is 4.
Input: S = “252525”
Output: 6
Explanation:
The subsequence “252525” generates the string “525252” on left rotation and string “525252” on right rotation. Since both the rotations are same. Therefore, the “252525” satisfies the required condition.
Naive Approach: The simplest approach to solve the problem is to generate all possible subsequences of the given string, and for each subsequence, check if its left rotation is equal to its right rotation.
Time Complexity: O(2N * N)
Auxiliary Space: O(N)
Efficient Approach: To optimize the above approach, the main observation is that the subsequence should either consist of a single character or should be of even length consisting of two characters alternatively.
Illustration:
str = “2424”
Left rotation of the string = “4242”
Right rotation of the string = “4242”
As we can see, since the number is of even length having two characters appearing alternately, therefore, the left and right rotation of the given number is equal.
str = “24242”
Left rotation of the string = “42422”
Right rotation of the string = “22424”
As we can see, since the number is of odd length having two characters appearing alternately, therefore, the left and right rotation of the given number is not equal.
Follow the steps below to solve the problem:
- Generate all possible two-digit numbers.
- For each two-digit number generated, check for the alternating occurrence of both the digits in the string. Keep incrementing count to store the length of alternating subsequence for the particular combination.
- After the entire traversal of the string, check if both the digits are equal or not. If found to be true, update count to the required answer. If both the digits are equal, then update count or count – 1 to the answer if the count is even or odd respectively.
- Repeat the above steps for all the possible combinations and print the maximum count obtained.
Below is the implementation of the above approach:
// C++ Program to implement// the above approach#include <bits/stdc++.h>using namespace std;
// Function to find the longest subsequence// having equal left and right rotationint findAltSubSeq(string s)
{ // Length of the string
int n = s.size(), ans = INT_MIN;
// Iterate for all possible combinations
// of a two-digit numbers
for (int i = 0; i < 10; i++) {
for (int j = 0; j < 10; j++) {
int cur = 0, f = 0;
// Check for alternate occurrence
// of current combination
for (int k = 0; k < n; k++) {
if (f == 0 and s[k] - '0' == i) {
f = 1;
// Increment the current value
cur++;
}
else if (f == 1 and s[k] - '0' == j) {
f = 0;
// Increment the current value
cur++;
}
}
// If alternating sequence is
// obtained of odd length
if (i != j and cur % 2 == 1)
// Reduce to even length
cur--;
// Update answer to store
// the maximum
ans = max(cur, ans);
}
}
// Return the answer
return ans;
}// Driver Codeint main()
{ string s = "100210601";
cout << findAltSubSeq(s);
return 0;
} |
// Java Program to implement// the above approachimport java.util.*;
class GFG{
// Function to find the longest subsequence// having equal left and right rotationstatic int findAltSubSeq(String s)
{ // Length of the String
int n = s.length(), ans = Integer.MIN_VALUE;
// Iterate for all possible combinations
// of a two-digit numbers
for (int i = 0; i < 10; i++)
{
for (int j = 0; j < 10; j++)
{
int cur = 0, f = 0;
// Check for alternate occurrence
// of current combination
for (int k = 0; k < n; k++)
{
if (f == 0 && s.charAt(k) - '0' == i)
{
f = 1;
// Increment the current value
cur++;
}
else if (f == 1 &&
s.charAt(k) - '0' == j)
{
f = 0;
// Increment the current value
cur++;
}
}
// If alternating sequence is
// obtained of odd length
if (i != j && cur % 2 == 1)
// Reduce to even length
cur--;
// Update answer to store
// the maximum
ans = Math.max(cur, ans);
}
}
// Return the answer
return ans;
}// Driver Codepublic static void main(String[] args)
{ String s = "100210601";
System.out.print(findAltSubSeq(s));
}}// This code is contributed by PrinciRaj1992 |
# Python3 program to implement # the above approach import sys
# Function to find the longest subsequence # having equal left and right rotation def findAltSubSeq(s):
# Length of the string
n = len(s)
ans = -sys.maxsize - 1
# Iterate for all possible combinations
# of a two-digit numbers
for i in range(10):
for j in range(10):
cur, f = 0, 0
# Check for alternate occurrence
# of current combination
for k in range(n):
if (f == 0 and ord(s[k]) -
ord('0') == i):
f = 1
# Increment the current value
cur += 1
elif (f == 1 and ord(s[k]) -
ord('0') == j):
f = 0
# Increment the current value
cur += 1
# If alternating sequence is
# obtained of odd length
if i != j and cur % 2 == 1:
# Reduce to even length
cur -= 1
# Update answer to store
# the maximum
ans = max(cur, ans)
# Return the answer
return ans
# Driver codes = "100210601"
print(findAltSubSeq(s))
# This code is contributed by Stuti Pathak |
// C# Program to implement// the above approachusing System;
class GFG{
// Function to find the longest subsequence// having equal left and right rotationstatic int findAltSubSeq(String s)
{ // Length of the String
int n = s.Length, ans = int.MinValue;
// Iterate for all possible combinations
// of a two-digit numbers
for (int i = 0; i < 10; i++)
{
for (int j = 0; j < 10; j++)
{
int cur = 0, f = 0;
// Check for alternate occurrence
// of current combination
for (int k = 0; k < n; k++)
{
if (f == 0 && s[k] - '0' == i)
{
f = 1;
// Increment the current value
cur++;
}
else if (f == 1 &&
s[k] - '0' == j)
{
f = 0;
// Increment the current value
cur++;
}
}
// If alternating sequence is
// obtained of odd length
if (i != j && cur % 2 == 1)
// Reduce to even length
cur--;
// Update answer to store
// the maximum
ans = Math.Max(cur, ans);
}
}
// Return the answer
return ans;
}// Driver Codepublic static void Main(String[] args)
{ String s = "100210601";
Console.Write(findAltSubSeq(s));
}}// This code is contributed by PrinciRaj1992 |
<script>// Javascript Program to implement// the above approach// Function to find the longest subsequence// having equal left and right rotationfunction findAltSubSeq(s)
{ // Length of the string
var n = s.length, ans = -1000000000;
// Iterate for all possible combinations
// of a two-digit numbers
for (var i = 0; i < 10; i++) {
for (var j = 0; j < 10; j++) {
var cur = 0, f = 0;
// Check for alternate occurrence
// of current combination
for (var k = 0; k < n; k++) {
if (f == 0 && s[k] - '0' == i) {
f = 1;
// Increment the current value
cur++;
}
else if (f == 1 && s[k] - '0' == j) {
f = 0;
// Increment the current value
cur++;
}
}
// If alternating sequence is
// obtained of odd length
if (i != j && cur % 2 == 1)
// Reduce to even length
cur--;
// Update answer to store
// the maximum
ans = Math.max(cur, ans);
}
}
// Return the answer
return ans;
}// Driver Codevar s = "100210601";
document.write( findAltSubSeq(s));</script> |
4
Time Complexity: O(N), as we are using a loop to traverse N times so it will cost us O(N) time
Auxiliary Space: O(1), as we are not using any extra space.