My question comes from a variant of Hanoi, which has four towers.

I know this article which says In c++ you can convert any recursive function to a loop, but I am only familiar with Python. I tried to read the ten rules but what do the keywords `struct`

and `stack`

means to python?

So, any article or discuss for python which is similar to the C++ one above is also very appreciated. Thanks.

The raw recursive function is `fmove`

(holds another recursive function `tmove`

), receives an integer, returns a tuple of pairs. It is elegant but useless (try `tmove(100)`

and be careful of your memory).

I want to convert it to a pure yield loop version so even the n becomes big like 100 or 1000, I can still know what the first 10 or 100 pairs of the tuple is.

```
def memory(function):
"""
This is a decorator to help raw recursion
functions to avoid repetitive calculation.
"""
cache = {}
def memofunc(*nkw,**kw):
key=str(nkw)+str(kw)
if key not in cache:
cache[key] = function(*nkw,**kw)
return cache[key]
return memofunc
@memory
def tmove(n, a=0, b=1, c=2):
"int n -> a tuple of pairs"
if n==1:
return ((a,c),)
return tmove(n-1,a,c,b)+\
((a,c),)+\
tmove(n-1,b,a,c)
@memory
def fmove(n,a=0,b=1,c=2,d=3):
"int n -> a tuple of pairs"
if n==1:
return ((a,d),)
return min(
(
fmove(n-i,a,d,b,c) +
tmove(i,a,b,d) +
fmove(n-i,c,b,a,d)
for i in range(1,n)
),
key=len,)
```

With the help of user2357112 in this question, I know how to convert recursive functions like `tmove`

-- return recur(...)+ CONS or another call +recur(...), but when situations getting more complicated like `fmove`

, I don't know how to design the structure, -- the `i`

is relevant to `n`

which is different in a different stack, and you finally have to use `min`

to get the minimum size tuple as the correct output for the current stack.

This is my try (the core algorithm `best(n)`

is still recursive function):

```
@memory
def _best(n):
if n==1:
return 1,1
return min(
(
(i, 2*(_best(n-i)[1])+2**i-1)
for i in range(1,n)
),
key=lambda x:x[1],
)
def best(n):
return _best(n)[0]
def xtmove(n,a=0,b=1,c=2):
stack = [(True,n,a,b,c)]
while stack:
tag,n,a,b,c = stack.pop()
if n==1:
yield a,c
elif tag:
stack.append((False,n,a,b,c))
stack.append((True,n-1,a,c,b))
else:
yield a,c
stack.append((True,n-1,b,a,c))
def xfmove(n,a=0,b=1,c=2,d=3):
stack = [(True,n,a,b,c,d)]
while stack:
is_four,n,a,b,c,d = stack.pop()
if n==1 and is_four:
yield a,d
elif is_four:
# here I use a none-tail-recursion function 'best'
# to get the best i, so the core is still not explicit stack.
i = best(n)
stack.append((True,n-i,c,b,a,d))
stack.append((False,i,a,b,d,None))
stack.append((True,n-i,a,d,b,c))
else:
for t in xtmove(n,a,b,c):
yield t
```

This is the test code. Make sure you can pass it.

```
if __name__=='__main__':
MAX_TEST_NUM = 20
is_passed = all((
fmove(test_num) == tuple(xfmove(test_num))
for test_num in range(1,MAX_TEST_NUM)
))
assert is_passed, "Doesn't pass the test."
print("Pass the test!")
```

cando it? If so, I'd do it in a language you know, first, or by porting the recursive version to C++. – David Ehrmann Feb 24 '14 at 5:18