Ackermann's Function is a recursive function that is not 'primitive recursive.'
The first argument drives the value extremely fast.
A(m, n) =
- n + 1 if m = 0
- A(m − 1, 1) if m > 0 and n = 0
- A(m − 1,A(m, n − 1)) if m > 0 and n > 0
A(2,4)=A(1,A(2,3)) = ... = 11.
% Range of cases % m=0 n=0:1024 % m=1 n=0:1024 % m=2 n=0:128 % m=3 n=0:6 % m=4 n=0:1
There is some deep recusion.
Input: m,n
Out: Ackerman value
Ackermann(2,4) = 11
Practical application of Ackermann's function is determining compiler recursion performance.
Solution Stats
Problem Comments
2 Comments
Solution Comments
Show comments
Loading...
Problem Recent Solvers81
Suggested Problems
-
All your base are belong to us
579 Solvers
-
Project Euler: Problem 8, Find largest product in a large string of numbers
1327 Solvers
-
11223 Solvers
-
348 Solvers
-
383 Solvers
More from this Author306
Problem Tags
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Solution 15 is, to me, a novel cell array index implementation.
Efficiently to crash my Matlab.