# Recursive function dies with Memory Error

Say we have a function that translates the morse symbols:

• `.` -> `-.`
• `-` -> `...-`

If we apply this function twice, we get e.g:

`.` -> `-.` -> `...--.`

Given an input string and a number of repetitions, want to know the length of the final string. (Problem 1 from the Flemish Programming Contest VPW, taken from these slides which provide a solution in Haskell).

For the given inputfile

``````4
. 4
.- 2
-- 2
--... 50
``````

We expect the solution

``````44
16
20
34028664377246354505728
``````

Since I don't know Haskell, this is my recursive solution in Python that I came up with:

``````def encode(msg, repetition, morse={'.': '-.', '-': '...-'}):
if isinstance(repetition, str):
repetition = eval(repetition)
while repetition > 0:
newmsg = ''.join(morse[c] for c in msg)
return encode(newmsg, repetition-1)
return len(msg)

def problem1(fn):
with open(fn) as f:
f.next()
for line in f:
print encode(*line.split())
``````

which works for the first three inputs but dies with a memory error for the last input.

How would you rewrite this in a more efficient way?

Edit

Rewrite based on the comments given:

``````def encode(p, s, repetition):
while repetition > 0:
p,s = p + 3*s, p + s
return encode(p, s, repetition-1)
return p + s

def problem1(fn):
with open(fn) as f:
f.next()
for line in f:
msg, repetition = line.split()
print encode(msg.count('.'), msg.count('-'), int(repetition))
``````

Comments on style and further improvements still welcome

-
Convert it to a while loop. You are hitting recursion limits, basically, so if you remove the recursion, your problem should go away. –  Silas Ray May 9 '12 at 17:39
@ThomasK is exactly right- you have to solve the problem without actually creating this string. It would take up a total of 34 trillion gigabytes. Even without any recursive overhead this would break. –  David Robinson May 9 '12 at 17:43
do not ever use eval anywhere. Use int for decoding the repetition! –  Antti Haapala May 9 '12 at 18:16
By the way, the solutions outlined so far all have linear complexity in the number of repetitions. There is a more efficient solution using matrix exponentiation by squaring which will allow you to solve this efficiently for very large numbers of repetitions. It's a good exercise for when you've gotten this to work :) –  hammar May 9 '12 at 18:26
@BioGeek: You can write the update `p, s = p + 3*s, p + s` as the product of the 2x2 matrix `A = [[1, 3], [1, 1]]` by the column vector `[p, s]`. Now, instead of multiplying the matrix by the vector `n` times (O(n) matrix-vector multiplications), you can compute the matrix `A^n` efficiently using exponentiation by squaring (O(log n) matrix-matrix multiplications), and then multiply that by `[p, s]` to get the counts after `n` steps. –  hammar May 9 '12 at 19:07

Consider that you don't actually have to output the resulting string, only the length of it. Also consider that the order of '.' and '-' in the string do not affect the final length (e.g. ".- 3" and "-. 3" produce the same final length).

Thus, I would give up on storing the entire string and instead store the number of '.' and the number of '-' as integers.

-
Also consider that a string of 34028664377246354505728 characters is 21 Zettabytes. –  Thomas K May 9 '12 at 17:45
If you read the slides, this is exactly what the Haskell solution does. –  hammar May 9 '12 at 17:46
@ThomasK- why 21 rather than 34 (or 30 if you're using a binary prefix)? –  David Robinson May 9 '12 at 17:50
@DavidRobinson: I was using a binary prefix, but I made a typo. It's 29. (Technically then they're Zebibytes, but I've never heard anyone use *bibytes in real discussion) –  Thomas K May 9 '12 at 17:53

In your starting string, count the number of dots and dashes. Then apply this:

``````repetitions = 4
dots = 1
dashes = 0
for i in range(repetitions):
dots, dashes = dots + 3 * dashes, dashes + dots
``````

Think about it why this works.

-

Per @Hammar (I had the same idea, but he explained it better than I could have ;-):

``````from sympy import Matrix

t = Matrix([[1,3],[1,1]])

def encode(dots, dashes, reps):
res = matrix([dashes, dots]) * t**reps
return res[0,0] + res[0,1]
``````
-

you put the count of dots to dashes, and count of dashes to dots in each iteration...

``````def encode(dots, dashes, repetitions):
while repetitions > 0:
dots, dashes = dots + 3 * dashes, dots + dashes
repetitions -= 1

return dots + dashes

def problem1(fn):
with open(fn) as f:
count = int(next(f))
for i in xrange(count):
line = next(f)
msg, repetition = line.strip().split()
print encode(msg.count('.'), msg.count('-'), int(repetition))
``````
-