Grokking Dynamic Programming Patterns for Coding Interviews
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Solution: Longest Palindromic Subsequence

Problem Statement

Given a sequence, find the length of its Longest Palindromic Subsequence (LPS). In a palindromic subsequence, elements read the same backward and forward.

A subsequence is a sequence that can be derived from another sequence by deleting some or no elements without changing the order of the remaining elements.

Example 1:

Input: "abdbca"
Output: 5
Explanation: LPS is "abdba".

Example 2:

Input: = "cddpd"
Output: 3
Explanation: LPS is "ddd".

Example 3:

Input: = "pqr"
Output: 1
Explanation: LPS could be "p", "q" or "r".

Constraints:

  • 1 <= st.length <= 1000
  • sy consists only of lowercase English letters.

Basic Solution

A basic brute-force solution could be to try all the subsequences of the given sequence. We can start processing from the beginning and the end of the sequence. So at any step, we have two options:

  1. If the element at the beginning and the end are the same, we increment our count by two and make a recursive call for the remaining sequence.
  2. We will skip the element either from the beginning or the end to make two recursive calls for the remaining subsequence.

If option one applies then it will give us the length of LPS; otherwise, the length of LPS will be the maximum number returned by the two recurse calls from the second option.

Code

Here is the code:

Python3
Python3

. . . .

In each function call, we are either having one recursive call or two recursive calls (we will never have three recursive calls); hence, the time complexity of the above algorithm is exponential O(2^n), where 'n' is the length of the input sequence. The space complexity is O(n), which is used to store the recursion stack.

Top-down Dynamic Programming with Memoization

We can use an array to store the already solved subproblems.

The two changing values to our recursive function are the two indexes, startIndex and endIndex. Therefore, we can store the results of all the subproblems in a two-dimensional array. (Another alternative could be to use a hash-table whose key would be a string (startIndex + "|" + endIndex))

Code

Here is the code for this:

Python3
Python3

. . . .

What is the time and space complexity of the above solution? Since our memoization array dp[st.length()][st.length()] stores the results for all the subproblems, we can conclude that we will not have more than N*N subproblems (where 'N' is the length of the input sequence). This means that our time complexity will be O(N^2).

The above algorithm will be using O(N^2) space for the memoization array. Other than that we will use O(N) space for the recursion call-stack. So the total space complexity will be O(N^2 + N), which is asymptotically equivalent to O(N^2).

Bottom-up Dynamic Programming

Since we want to try all the subsequences of the given sequence, we can use a two-dimensional array to store our results. We can start from the beginning of the sequence and keep adding one element at a time. At every step, we will try all of its subsequences. So for every startIndex and endIndex in the given string, we will choose one of the following two options:

  1. If the element at the startIndex matches the element at the endIndex, the length of LPS would be two plus the length of LPS till startIndex+1 and endIndex-1.
  2. If the element at the startIndex does not match the element at the endIndex, we will take the maximum LPS created by either skipping element at the startIndex or the endIndex.

So our recursive formula would be:

if st[endIndex] == st[startIndex] dp[startIndex][endIndex] = 2 + dp[startIndex + 1][endIndex - 1] else dp[startIndex][endIndex] = Math.max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])

Let's draw this visually for "cddpd", starting with a subsequence of length '1'. As we know, every sequence with one element is a palindrome of length 1:

Every sequence with one element is a palindrome of length 1
Every sequence with one element is a palindrome of length 1
startIndex:3, endIndex:4 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:3, endIndex:4 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:2, endIndex:3 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:2, endIndex:3 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:2, endIndex:4 => st[startIndex] ==st[endIndex], so dp[startIndex][endIndex] = 2 + dp[startIndex + 1][endIndex - 1]
startIndex:2, endIndex:4 => st[startIndex] ==st[endIndex], so dp[startIndex][endIndex] = 2 + dp[startIndex + 1][endIndex - 1]
startIndex:1, endIndex:2 => st[startIndex] ==st[endIndex], so dp[startIndex][endIndex] = 2 + dp[startIndex + 1][endIndex - 1]
startIndex:1, endIndex:2 => st[startIndex] ==st[endIndex], so dp[startIndex][endIndex] = 2 + dp[startIndex + 1][endIndex - 1]
startIndex:1, endIndex:3 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:1, endIndex:3 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:1, endIndex:4 => st[startIndex] ==st[endIndex], so dp[startIndex][endIndex] = 2 + dp[startIndex + 1][endIndex - 1]
startIndex:1, endIndex:4 => st[startIndex] ==st[endIndex], so dp[startIndex][endIndex] = 2 + dp[startIndex + 1][endIndex - 1]
startIndex:0, endIndex:1 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:0, endIndex:1 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:0, endIndex:4 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])
startIndex:0, endIndex:4 => st[startIndex] !=st[endIndex], so dp[startIndex][endIndex] = max(dp[startIndex + 1][endIndex], dp[startIndex][endIndex - 1])

From the above visualization, we can clearly see that the length of LPS is '3' as shown by dp[0][4].

Here is the code for our bottom-up dynamic programming approach:

Python3
Python3

. . . .

The time and space complexity of the above algorithm is O(n^2), where 'n' is the length of the input sequence.

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