# Why is my implementation of the Sieve of Atkin overlooking numbers close to the specified limit?

My implementation of Sieve of Atkin either overlooks primes near the limit or composites near the limit. while some limits work and others don't. I'm am completely confused as to what is wrong.

``````def AtkinSieve (limit):
results = [2,3,5]
sieve = [False]*limit
factor = int(math.sqrt(lim))
for i in range(1,factor):
for j in range(1, factor):
n = 4*i**2+j**2
if (n <= lim) and (n % 12 == 1 or n % 12 == 5):
sieve[n] = not sieve[n]
n = 3*i**2+j**2
if (n <= lim) and (n % 12 == 7):
sieve[n] = not sieve[n]
if i>j:
n = 3*i**2-j**2
if (n <= lim) and (n % 12 == 11):
sieve[n] = not sieve[n]
for index in range(5,factor):
if sieve[index]:
for jndex in range(index**2, limit, index**2):
sieve[jndex] = False
for index in range(7,limit):
if sieve[index]:
results.append(index)
return results
``````

For example, when I generate a primes to the limit of 1000, the Atkin sieve misses the prime 997, but includes the composite 965. But if I generate up the limit of 5000, the list it returns is completely correct.

• Change `lim` to `limit`. Of course you must have known that.
• Since `sieve = [False]*limit`, the largest index allowed is `limit-1`.

However, on this line

``````if (n <= limit) and (n % 12 == 1 or n % 12 == 5):
``````

you are checking if `n<=limit`. If `n==limit` then `sieve[n]` raises an IndexError. Try your algorithm with a small value of `limit` (e.g. n=50). You'll see this error come up. An easy fix is to use

``````sieve = [False]*(limit+1)
``````

The easy fix is a bit wasteful since sieve[0] is never used. So you might think a better fix is to keep `sieve = [False]*limit`, but fix all your other code by stepping the index on `sieve` down by one. (E.g., change `sieve[n]` to `sieve[n-1]` everywhere, etc.) However, this will force you to do a number of extra subtractions which will not be good for speed. So the easy/wasteful solution is actually probably the better option.

• According to http://en.wikipedia.org/wiki/Sieve_of_Atkin, x should be an integer in [1,sqrt(limit)], inclusive of the endpoints.

``````factor = int(math.sqrt(limit))
``````

and `int` takes the floor of `math.sqrt(limit)`. Furthermore,

`range(1,factor)` goes from 1 to factor-1. So you are off by 1.

So you need to change this to

``````factor = int(math.sqrt(limit))+1
``````

• See Fastest way to list all primes below N for an alternative (and faster) implementation of the Sieve of Atkin, due to Steve Krenzel.

``````def AtkinSieve (limit):
results = [2,3,5]
sieve = [False]*(limit+1)
factor = int(math.sqrt(limit))+1
for i in range(1,factor):
for j in range(1, factor):
n = 4*i**2+j**2
if (n <= limit) and (n % 12 == 1 or n % 12 == 5):
sieve[n] = not sieve[n]
n = 3*i**2+j**2
if (n <= limit) and (n % 12 == 7):
sieve[n] = not sieve[n]
if i>j:
n = 3*i**2-j**2
if (n <= limit) and (n % 12 == 11):
sieve[n] = not sieve[n]
for index in range(5,factor):
if sieve[index]:
for jndex in range(index**2, limit, index**2):
sieve[jndex] = False
for index in range(7,limit):
if sieve[index]:
results.append(index)
return results
``````
• Yeah after programming in Java i noticed all these mistakes... I will definitely check out that faster implementation though. Mar 9, 2010 at 2:57