Recursion termination
Encyclopedia
In computing, Recursion termination is when certain conditions are met and the recursive algorithm ceases calling itself and begins to return values. This happens only if with every recursive call the recursive algorithm changes its state and moves towards the base case. Cases that satisfy the definition without being defined in terms of the definition itself are called base cases. They are small enough to solve directly.
1. if n is 0, returns 0.
2. if n is 1, returns 1.
3. otherwise, return [fibonacci(n-1) + fibonacci(n-2)]
This recursive function terminates if either conditions 1 or 2 are satisfied. We see that the function's recursive call reduces the value of n(by passing n-1 or n-2 in the function) ensuring that n reaches either condition 1 or 2.
Here we see that in the recursive call, the number passed in the recursive step is reduced by 1. This again ensures that the number will at some point reduce to 0 which in turn terminates the recursive algorithm.
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Fibonacci function
The Fibonacci function(fibonacci(n)), which takes integer n(n >= 0) as input, has three conditions1. if n is 0, returns 0.
2. if n is 1, returns 1.
3. otherwise, return [fibonacci(n-1) + fibonacci(n-2)]
This recursive function terminates if either conditions 1 or 2 are satisfied. We see that the function's recursive call reduces the value of n(by passing n-1 or n-2 in the function) ensuring that n reaches either condition 1 or 2.
C++
C++ Example:
int factorial(int number)
{
else if (number0)
return 1;
else
return (number * factorial(number - 1));
}
Here we see that in the recursive call, the number passed in the recursive step is reduced by 1. This again ensures that the number will at some point reduce to 0 which in turn terminates the recursive algorithm.
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