I looked up the algorithm on Wikipedia and this works for me:

```
#from math import ceil
def isqrt(n):
x = n
y = (x + n // x) // 2
while y < x:
x = y
y = (x + n // x) // 2
return x
def fermat(n, verbose=True):
a = isqrt(n) # int(ceil(n**0.5))
b2 = a*a - n
b = isqrt(n) # int(b2**0.5)
count = 0
while b*b != b2:
if verbose:
print('Trying: a=%s b2=%s b=%s' % (a, b2, b))
a = a + 1
b2 = a*a - n
b = isqrt(b2) # int(b2**0.5)
count += 1
p=a+b
q=a-b
assert n == p * q
print('a=',a)
print('b=',b)
print('p=',p)
print('q=',q)
print('pq=',p*q)
return p, q
n=103591*104729
fermat(n)
```

I tried a couple test cases. This one is from the wikipedia page:

```
>>> fermat(5959)
Trying: a=78 b2=125 b=11
Trying: a=79 b2=282 b=16
a= 80
b= 21
p= 101
q= 59
pq= 5959
(101, 59)
```

This one is your sample case:

```
>>> fermat(103591*104729)
Trying: a=104159 b2=115442 b=339
a= 104160
b= 569
p= 104729
q= 103591
pq= 10848981839
(104729, 103591)
```

Looking at the lines labeled "Trying" shows that, in both cases, it converges quite quickly.

UPDATE: Your very long integer from the comments factors as follows:

```
n_long=316033277426326097045474758505704980910037958719395560565571239100878192955228495343184968305477308460190076404967552110644822298179716669689426595435572597197633507818204621591917460417859294285475630901332588545477552125047019022149746524843545923758425353103063134585375275638257720039414711534847429265419
fermat(n_long, verbose=False)
a= 17777324810733646969488445787976391269105128850805128551409042425916175469326288448917184096591563031034494377135896478412527365012246902424894591094668262
b= 157517855001095328119226302991766503492827415095855495279739107269808590287074235
p= 17777324810733646969488445787976391269105128850805128551409042425916175469483806303918279424710789334026260880628723893508382860291986009694703181381742497
q= 17777324810733646969488445787976391269105128850805128551409042425916175469168770593916088768472336728042727873643069063316671869732507795155086000807594027
pq= 316033277426326097045474758505704980910037958719395560565571239100878192955228495343184968305477308460190076404967552110644822298179716669689426595435572597197633507818204621591917460417859294285475630901332588545477552125047019022149746524843545923758425353103063134585375275638257720039414711534847429265419
```