# What is recursion [duplicate]

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Examples of Recursive functions

I have been trying to research recursion in programming as a concept (though I am specifically studying Java) and this is what I got to understand the best:

In real life for example, recursion is when we put two mirrors infront of each other and the images produced between them are recursive.

But I don't get this algorithm in programming? Can someone give me a simplified example to understand recursion ?

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–  CodingBarfield Nov 30 '12 at 13:48
google.com/search?q=recursion –  mauris Nov 30 '12 at 13:48
Recursive programming (whatever it is) probably is pretty much based on recursive programming. –  user381105 Nov 30 '12 at 13:49
Ok, CodingBarfield and Oded. Very funny. But your recursion doesn't terminate so it's formally incorrect. Seriously, let's help the original poster. –  Ollie Jones Nov 30 '12 at 13:50
@OllieJones - Where is your answer then? –  Oded Nov 30 '12 at 13:54
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## marked as duplicate by mauris, mbeckish, BalusC, Ocaso Protal, user714965Nov 30 '12 at 15:37

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

## 6 Answers

Basically, a function is recursive when

1. A function has a simple base case, and when
2. All other cases have rules which reduce to the base case.

As an example, to calculate an factorial:

``````public static long factorial(int i)
{
// This is the base case
if(i == 0)
{
return 1;
}
else
{
// This reduces the problem to something closer to the base case
return i * factorial(i - 1);
}
}
``````
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Recursive functions, strictly speaking, need not have a base case. In lots of languages (Lisp for example) infinite recursion is a common (and sometimes only) technique to implement infinite loops. And infinite loops are of course useful for most real world programs with indeterminate run times (like servers for example) –  slebetman Nov 30 '12 at 14:10
I read the question as something at a basic level of recursion, so I assumed linear recursion. –  ChrisForrence Nov 30 '12 at 14:31
@slebetman I wouldn't agree that busy waiting is "useful for most real world programs with indeterminate run times (like servers for example)" –  Puce Nov 30 '12 at 15:15
@GlaciesofPacis You missed the recursion in your example... –  Puce Nov 30 '12 at 15:17
@Puce - Well drat. Fixed. –  ChrisForrence Nov 30 '12 at 15:40
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Recursion is a programming technique where a method can call itself as part of its calculation (sometimes you can have more than one method - the methods would then normally call each other circularly).

A popular example is calculating Fibonacci numbers:

``````public static long fib(int n) {
if (n <= 1) return n;
else return fib(n-1) + fib(n-2);
}
``````

The two basic components are a base case (`n<=1` in the example) and the recursive case.

When creating a recursive algorithm you need to consider the base case and how, using the recursive case you will get to the base case (otherwise you end up with infinite recursion and blow the stack).

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Short and precise. –  ryadavilli Nov 30 '12 at 13:52
thank you perfect –  user1804697 Nov 30 '12 at 13:54
But a bad practice of it can cause StackOverFlowError :-) –  Luis Alberto Mar 5 at 14:40
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Some computational problems can be described in such a way that the problem can be broken down to smaller subproblems. The smaller subproblems are solved using the same method as the main problem. If the smaller subproblem is just a smaller case of the bigger problem then that itself can be broken down even further.

Eventually, the problem is so small that it can be solved without further breaking down. This is known as the base case. With the solution of the base case you can then build the solution to the bigger problem.

Say you wanted to find ab where a and b are positive integers. You can see that this is the same as a * a(b-1). That is, a(b-1) is a smaller problem than the original, but still requires the same technique to solve as the original problem. To solve a(b-1) you see that it is a * a(b-2).

And so on.

Eventually you end up with a * a * a * ... * a(b-b). And we know that b-b = 0 and a0 = 1. So we do not have to work out that last bit because we already know the answer. Ultimately, ab = a * a * a * ... * 1.

So 24 = 2 * 23 = 2 * 2 * 22 = 2 * 2 * 2 * 21 = 2 * 2 * 2 * 2 * 20 = 2 * 2 * 2 * 2 * 1.

To write this program you first handle the base case then use recursion to handle everything else.

``````   pow(a, b){
if(b == 0){
return 1;
}else{

return a * pow(a, b - 1);
}
}
``````

It is important to note that this is just the basic idea of recursion. These examples that you see in the various answers such a fibonacci numbers problem are very inefficient. You can build more efficient programs using dynamic programming techniques which uses recursion as one of its mechanisms for solving the problem.

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Recursive programming is a technique based on the idea of mathematical induction whereby a a method or function repeatedly calls itself. As such, it's possible to implement a factorial function as follows:

``````int fact(int n) {
if (n < 2) {
return 1;
}

return n * fact(n-1);
}
``````

Note that in order to ensure that the recursion terminates, you should be sure to handle a base case whereby you have a defined constant output for some known simple input, and you should be sure to make the parameters of your function simpler on each iteration (In the above example reducing `n` by 1).

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Very simple 'recursive' code.

Handle top item of a list. Remove it from the list and call the code to handle the top item of a list.

Tree roots have a certain length and split into seperate roots every 2/3 root. The split pieces split into seperate roots every 2/3 root. The split pieces of the split pieces split every.. etc.

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# Recursion

A method can call itself, this is recursion. Recursive implementations of methods are often used, because they lead to compact elegant code, which is easier to understand than a coresponding implementation that does not use recursion.

The recursive programming technic knows three important rules (of thumb):

1. Base case: The recursion has a base case. Always the first statement is conditional and has a 'return'.
2. SubProblem: Recursive calls adress a subproblem that is smaller to solve in some sense, such that it converges to the base case.
3. No Overlapping: Recursive calls shall not handle subproblems that overlapp.

From view of performance non recursive solutions are faster, and usually need less memory. (e.g binary search)
But some tasks are such complex that only a recursive solution leads to a (more or less understandable) code.

Example of recursive binary search:

``````public static int binSearch(int[] a, int key) {
return binSearch0(a, key, 0, a.length - 1);
}

public static int binSearch0(int[] a, int key, int from, int to) {
if (from > to) return -1;
// looks strange but (from + to) / 2 can oveflow
// (java bug which was active more than 10 years)
int mid = from + (to - from) / 2;
if (key < a[mid])
return binSearch0(a, key, from, mid - 1);
else if (key < a[mid])
return binSearch0(a, key, mid + 1, to);
else return mid;
}
``````

In that example you see all three rules (base, sub, non oberlap).
Not that recursive functions often have a start function, 'binSearch' in the example. Where 'binSearch0' is the recursive function.

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