Recursion
A recursive function is a function that calls itself within its definition. This is often a convenient way to define a function, and sometimes the only way. As an example, consider this definition of factorial:
Function Factorial2(n: Positive Atom)Definition: IF n > 1 THEN N*Factorial2(n - 1) ELSE 1
If its parameter, n, is greater than 1, Factorial2 calls itself with the actual parameter value n - 1. Otherwise, it simply returns 1. Like any normal recursive function, it has a termination condition under which the recursion stops — when n <= 1.
Normally, if you try to use a function in its own definition, it complains about a cyclic dependency loop. To enable recursion, you must display and set the Recursive attribute:
- Select Attributes from the Object menu.
- Select Functions from the Class menu.
- Scroll down the list of attributes and click Recursive twice, so that it shows √, meaning that the recursive attribute is displayed for each function in its Object window and the Attribute panel.
- Check OK to close Attributes dialog.
For each function for which you wish to enable recursion:
- Open the Object Window for the function by double-clicking its node (or selecting the node and clicking the Object button).
- Type
1into its Recursive field.
As another example, consider this recursive function to compute a list of the prime factors of an integer, x, equal to or greater than y:
Function Prime_factors(x, y: Positive Atom)Definition:Var n := Floor(x/y);IF n < y THEN [x]ELSE IF x = n*y THEN Concat([y], Factors(n, y))ELSE Prime_factors(x, y + 1)Factors(60, 2) → [2, 2, 3, 5]
In essence, Prime_factors says to compute n as x divided by y, rounded down. If y is greater than n, then x is the last factor, so return x as a list. If x is an exact factor of y, then concatenate x with any factors of n, equal or greater than n. Otherwise, try y + 1 as a factor.
See also
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