There are two basic choices here: sieve the range `[a..b]`

by primes below `sqrt(b)`

(the *"offset"* sieve of Eratosthenes), or by *odd numbers*. That's right; just eliminate the multiples of each odd as you would of each prime. Sieve the range in one chunk, or in several "segments" if the range is too wide (but efficiency can deteriorate if the chunks are too narrow).

In Haskell *executable pseudocode*,

```
primesRange_by_Odds a b = foldl (\r x-> r `minus` [q x, q x+2*x..b])
[o,o+2..b]
[3,5..floor(sqrt(fromIntegral b))]
where
o = 1 + 2*div a 2 -- odd start of range
q x = x*x - 2*x*min 0 (div (x*x-o) (2*x)) -- 1st odd multiple of x >= x*x in range
```

Sieving by odds will have the additional *space* complexity of *O(1)* (on top of the output / range). That is because we can enumerate the odds just by iteratively adding *2* — unlike primes of sieve of Eratosthenes, below `sqrt(b)`

, for which we have to reserve additional space of *O(pi(sqrt(b)))* = ~ `2*sqrt(b)/log(b)`

(where `pi()`

is a prime-counting function).

for certain a and b. For numbers large enough for`b`

bytes or bits to be too much space, there are other methods. But despite O(b) sounding scary, it can take you quite far -- one GB of memory should enable`b`

s up to 8.5 billion (more than you can enumerate in 32 bit!) if you use a single bit per number. – user395760 Sep 14 '12 at 19:11