What is the difference between memoization and dynamic programming? I think dynamic programming is a subset of memoization. Is it right?

8Here's an article that describes this quite well: Dynamic programming vs memoization vs tabulation. – aioobe Oct 30 '16 at 9:15
Relevant article on Programming.Guide: Dynamic programming vs memoization vs tabulation
What is difference between memoization and dynamic programming?
Memoization is a term describing an optimization technique where you cache previously computed results, and return the cached result when the same computation is needed again.
Dynamic programming is a technique for solving problems of recursive nature, iteratively and is applicable when the computations of the subproblems overlap.
Dynamic programming is typically implemented using tabulation, but can also be implemented using memoization. So as you can see, neither one is a "subset" of the other.
A reasonable followup question is: What is the difference between tabulation (the typical dynamic programming technique) and memoization?
When you solve a dynamic programming problem using tabulation you solve the problem "bottom up", i.e., by solving all related subproblems first, typically by filling up an ndimensional table. Based on the results in the table, the solution to the "top" / original problem is then computed.
If you use memoization to solve the problem you do it by maintaining a map of already solved sub problems. You do it "top down" in the sense that you solve the "top" problem first (which typically recurses down to solve the subproblems).
A good slide from here (link is now dead, slide is still good though):
 If all subproblems must be solved at least once, a bottomup dynamicprogramming algorithm usually outperforms a topdown memoized algorithm by a constant factor
 No overhead for recursion and less overhead for maintaining table
 There are some problems for which the regular pattern of table accesses in the dynamicprogramming algorithm can be exploited to reduce the time or space requirements even further
 If some subproblems in the subproblem space need not be solved at all, the memoized solution has the advantage of solving only those subproblems that are definitely required
Additional resources:
 Wikipedia: Memoization, Dynamic Programming
 Related SO Q/A: Memoization or Tabulation approach for Dynamic programming

1you swapped Dynamic programming and Memoization. Basically Memoization is a recursive dynamic programming. – user1603602 Nov 21 '14 at 23:18

6Naah, I think you're mistaken. For instance, nothing in the wikipedia article on memoization says recursion is necessarily involved when using memoization. – aioobe Nov 22 '14 at 19:25

Having read the answer, if you wish to feel NZT48 effect about the subject, you can glance at the article and the example as well – snr Dec 30 '18 at 8:32
Dynamic Programming is an algorithmic paradigm that solves a given complex problem by breaking it into subproblems and stores the results of subproblems to avoid computing the same results again.
http://www.geeksforgeeks.org/dynamicprogrammingset1/
Memoization is an easy method to track previously solved solutions (often implemented as a hash key value pair, as opposed to tabulation which is often based on arrays) so that they aren't recalculated when they are encountered again. It can be used in both bottom up or top down methods.
See this discussion on memoization vs tabulation.
So Dynamic programming is a method to solve certain classes of problems by solving recurrence relations/recursion and storing previously found solutions via either tabulation or memoization. Memoization is a method to keep track of solutions to previously solved problems and can be used with any function that has unique deterministic solutions for a given set of inputs.
Dynamic Programming is often called Memoization!
Memoization is the topdown technique(start solving the given problem by breaking it down) and dynamic programming is a bottomup technique(start solving from the trivial subproblem, up towards the given problem)
DP finds the solution by starting from the base case(s) and works its way upwards. DP solves all the subproblems, because it does it bottomup
Unlike Memoization, which solves only the needed subproblems
DP has the potential to transform exponentialtime bruteforce solutions into polynomialtime algorithms.
DP may be much more efficient because its iterative
On the contrary, Memoization must pay for the (often significant) overhead due to recursion.
To be more simple, Memoization uses the topdown approach to solve the problem i.e. it begin with core(main) problem then breaks it into subproblems and solve these subproblems similarly. In this approach same subproblem can occur multiple times and consume more CPU cycle, hence increase the time complexity. Whereas in Dynamic programming same subproblem will not be solved multiple times but the prior result will be used to optimize the solution.
(1) Memoization and DP, conceptually, is really the same thing. Because: consider the definition of DP: "overlapping subproblems" "and optimal substructure". Memoization fully possesses these 2.
(2) Memoization is DP with the risk of stack overflow is the recursion is deep. DP bottom up does not have this risk.
(3) Memoization needs a hash table. So additional space, and some lookup time.
So to answer the question:
Conceptually, (1) means they are the same thing.
Taking (2) into account, if you really want, memoization is a subset of DP, in a sense that a problem solvable by memoization will be solvable by DP, but a problem solvable by DP might not be solvable by memoization (because it might stack overflow).
Taking (3) into account, they have minor differences in performance.
From wikipedia:
Memoization
In computing, memoization is an optimization technique used primarily to speed up computer programs by having function calls avoid repeating the calculation of results for previouslyprocessed inputs.
Dynamic Programming
In mathematics and computer science, dynamic programming is a method for solving complex problems by breaking them down into simpler subproblems.
When breaking a problem into smaller/simpler subproblems, we often encounter the same subproblem more then once  so we use Memoization to save results of previous calculations so we don't need to repeat them.
Dynamic programming often encounters situations where it makes sense to use memoization but You can use either technique without necessarily using the other.

OP edited the question after i posted the answer. Original question asked whats the difference between the two. – yurib May 31 '11 at 8:52
Both Memoization and Dynamic Programming solves individual subproblem only once.
Memoization uses recursion and works topdown, whereas Dynamic programming moves in opposite direction solving the problem bottomup.
Below is an interesting analogy 
Topdown  First you say I will take over the world. How will you do that? You say I will take over Asia first. How will you do that? I will take over India first. I will become the Chief Minister of Delhi, etc. etc.
Bottomup  You say I will become the CM of Delhi. Then will take over India, then all other countries in Asia and finally I will take over the world.
I would like to go with an example;
Problem:
You are climbing a stair case. It takes n steps to reach to the top.
Each time you can either climb 1 or 2 steps. In how many distinct ways can you climb to the top?
Recursion with Memoization
In this way we are pruning (a removal of excess material from a tree or shrub) recursion tree with the help of memo array and reducing the size of recursion tree upto nn.
public class Solution {
public int climbStairs(int n) {
int memo[] = new int[n + 1];
return climb_Stairs(0, n, memo);
}
public int climb_Stairs(int i, int n, int memo[]) {
if (i > n) {
return 0;
}
if (i == n) {
return 1;
}
if (memo[i] > 0) {
return memo[i];
}
memo[i] = climb_Stairs(i + 1, n, memo) + climb_Stairs(i + 2, n, memo);
return memo[i];
}
}
Dynamic Programming
As we can see this problem can be broken into subproblems, and it contains the optimal substructure property i.e. its optimal solution can be constructed efficiently from optimal solutions of its subproblems, we can use dynamic programming to solve this problem.
public class Solution {
public int climbStairs(int n) {
if (n == 1) {
return 1;
}
int[] dp = new int[n + 1];
dp[1] = 1;
dp[2] = 2;
for (int i = 3; i <= n; i++) {
dp[i] = dp[i  1] + dp[i  2];
}
return dp[n];
}
}
Examples take from https://leetcode.com/problems/climbingstairs/
Just think of two ways,
 We break down the bigger problem into smaller sub problems  Top down approach.
 We start from smallest sub problem and reach the bigger problem  Bottom up approach.
In Memoization we go with (1.) where we save each function call in a cache and call back from there. Its a bit expensive as it involves recursive calls.
In Dynamic Programming we go with (2.) where we maintain a table, bottom up by solving subproblems using the data saved in the table, commonly referred as the dptable.
Note:
Both are applicable to problems with Overlapping subproblems.
Memoization performs comparatively poor to DP due to the overheads involved during recursive function calls.
 The asymptotic timecomplexity remains the same.
In Dynamic Programming ,
 No overhead for recursion, less overhead for maintaining the table.
 The regular pattern of the table accesses may be used to reduce time or space requirements.
In Memorization,
 Some subproblems do not need to be solved.