# Why is Sieve of Eratosthenes more efficient than the simple “dumb” algorithm?

If you need to generate primes from 1 to N, the "dumb" way to do it would be to iterate through all the numbers from 2 to N and check if the numbers are divisable by any prime number found so far which is less than the square root of the number in question.

As I see it, sieve of Eratosthenes does the same, except other way round - when it finds a prime N, it marks off all the numbers that are multiples of N.

But whether you mark off X when you find N, or you check if X is divisable by N, the fundamental complexity, the big-O stays the same. You still do one constant-time operation per a number-prime pair. In fact, the dumb algorithm breaks off as soon as it finds a prime, but sieve of Eratosthenes marks each number several times - once for every prime it is divisable by. That's a minimum of twice as many operations for every number except primes.

Am I misunderstanding something here?

-

In the trial division algorithm, the most work that may be needed to determine whether a number `n` is prime, is testing divisibility by the primes up to about `sqrt(n)`.

That worst case is met when `n` is a prime or the product of two primes of nearly the same size (including squares of primes). If `n` has more than two prime factors, or two prime factors of very different size, at least one of them is much smaller than `sqrt(n)`, so even the accumulated work needed for all these numbers (which form the vast majority of all numbers up to `N`, for sufficiently large `N`) is relatively insignificant, I shall ignore that and work with the fiction that composite numbers are determined without doing any work (the products of two approximately equal primes are few in number, so although individually they cost as much as a prime of similar size, altogether that's a negligible amount of work).

So, how much work does the testing of the primes up to `N` take?

By the prime number theorem, the number of primes `<= n` is (for `n` sufficiently large), about `n/log n` (it's `n/log n + lower order terms`). Conversely, that means the k-th prime is (for k not too small) about `k*log k` (+ lower order terms).

Hence, testing the k-th prime requires trial division by `pi(sqrt(p_k))`, approximately `2*sqrt(k/log k)`, primes. Summing that for `k <= pi(N) ~ N/log N` yields roughly `4/3*N^(3/2)/(log N)^2` divisions in total. So by ignoring the composites, we found that finding the primes up to `N` by trial division (using only primes), is `Omega(N^1.5 / (log N)^2)`. Closer analysis of the composites reveals that it's `Theta(N^1.5 / (log N)^2)`. Using a wheel reduces the constant factors, but doesn't change the complexity.

In the sieve, on the other hand, each composite is crossed off as a multiple of at least one prime. Depending on whether you start crossing off at `2*p` or at `p*p`, a composite is crossed off as many times as it has distinct prime factors or distinct prime factors `<= sqrt(n)`. Since any number has at most one prime factor exceeding `sqrt(n)`, the difference isn't so large, it has no influence on complexity, but there are a lot of numbers with only two prime factors (or three with one larger than `sqrt(n)`), thus it makes a noticeable difference in running time. Anyhow, a number `n > 0` has only few distinct prime factors, a trivial estimate shows that the number of distinct prime factors is bounded by `lg n` (base-2 logarithm), so an upper bound for the number of crossings-off the sieve does is `N*lg N`.

By counting not how often each composite gets crossed off, but how many multiples of each prime are crossed off, as IVlad already did, one easily finds that the number of crossings-off is in fact `Theta(N*log log N)`. Again, using a wheel doesn't change the complexity but reduces the constant factors. However, here it has a larger influence than for the trial division, so at least skipping the evens should be done (apart from reducing the work, it also reduces storage size, so improves cache locality).

So, even disregarding that division is more expensive than addition and multiplication, we see that the number of operations the sieve requires is much smaller than the number of operations required by trial division (if the limit is not too small).

Summarising:
Trial division does futile work by dividing primes, the sieve does futile work by repeatedly crossing off composites. There are relatively few primes, but many composites, so one might be tempted to think trial division wastes less work.
But: Composites have only few distinct prime factors, while there are many primes below `sqrt(p)`.

-
Just for that summary you get the Accepted Answer! –  Vilx- Dec 1 '11 at 8:49
also by multiplying you can get rid of the slow division away –  Lưu Vĩnh Phúc Mar 4 at 8:01

http://en.wikipedia.org/wiki/Prime_number#Number_of_prime_numbers_below_a_given_number

• the "dumb" algorithm does `i/log(i) ~= N/log(N)` work for each prime number
• the real algorithm does `N/i ~= 1` work for each prime number

Multiply by roughly `N/log(N)` prime numbers.

-
I doubt it. If, say, 640000000 is divisible by 2, there's no need to check the rest, to i/log(i) must be a loose bound here. –  Ziyao Wei Jul 14 '11 at 4:26
@Ziyao: hmm, very insightful! I now have a gut feeling that the brunt of the work in the "dumb" algorithm must come from confirming that a prime is a prime. I have rewritten my answer based on this insight. Yes I am using quite terrible bounds, if you have better ones please suggest. –  ninjagecko Jul 14 '11 at 4:56

Because with the sieve method, you stop marking mutiples of the running primes when the running prime reaches the square root of N.

Say, you want to find all primes less than a million.

First you set an array

``````for i = 2 to 1000000
primetest[i] = true
``````

Then you iterate

``````for j=2 to 1000         <--- 1000 is the square root of 10000000
if primetest[j]                                    <--- if j is prime
---mark all multiples of j (except j itself) as "not a prime"
for k = j^2 to 1000000 step j
primetest[k] = false
``````

You don't have to check j after 1000, because j*j will be more than a million. And you start from j*j (you don't have to mark multiples of j less than j^2 because they are already marked as multiples of previously found, smaller primes)

So, in the end you have done the loop 1000 times and the if part only for those j's that are primes.

Second reason is that with the sieve, you only do multiplication, not division. If you do it cleverly, you only do addition, not even multiplication.

And division has larger complexity than addition. The usual way to do division has `O(n^2)` complexity, while addition has `O(n)`.

-
Eh? That's usable when testing N for primality, not when generating all primes smaller than N. The Sieve of Eratosthenes is primarily a prime generator, not a prime tester. –  Vatine Apr 13 '11 at 12:26
@Vatine - no, it works for the sieve too. You only need to mark multiples of primes `<= sqrt (n)` –  IVlad Apr 13 '11 at 12:30

In the naive method, you do `O(sqrt(num))` operations for each number `num` you check for primality. Ths is `O(n*sqrt(n))` total.

In the sieve method, for each unmarked number from 1 to `n` you do `n / 2` operations when marking multiples of `2`, `n / 3` when marking those of `3`, `n / 5` when marking those of `5` etc. This is `n*(1/2 + 1/3 + 1/5 + 1/7 + ...)`, which is `O(n log log n)`. See here for that result.

So the asymptotic complexity is not the same, like you said. Even a naive sieve will beat the naive prime-generation method pretty fast. Optimized versions of the sieve can get much faster, but the big-oh remains unchanged.

The two are not equivalent like you say. For each number, you will check divisibility by the same primes `2, 3, 5, 7, ...` in the naive prime-generation algorithm. As you progress, you check divisibility by the same series of numbers (and you keep checking against more and more as you approach your `n`). For the sieve, you keep checking less and less as you approach `n`. First you check in increments of `2`, then of `3`, then `5` and so on. This will hit `n` and stop much faster.

-
No, it's not `O(sqrt(num))`, because I don't check every number - just the primes that have been found so far. Read carefully. –  Vilx- Apr 13 '11 at 12:43
@Vilx - for each number `num`, you must check if it's divisible by any of your current primes that are `<= sqrt(num)`. There are roughly `x / log(x) = O(x)` primes `<= x`. That means you do `sqrt(num) / log(sqrt(num)) = O(sqrt(num))` operations for each number. Think about it. You might have a favorable constant (`< 1`) behind that big-oh, but it's still bad as `n` grows. –  IVlad Apr 13 '11 at 12:45
If, as you say, you only check the primes found so far (ALL of them), then your algorithm is actually `O(n^2)` :). You need to check all the primes found so far that are `<= sqrt(num)`. Then it's `O(n sqrt(n))` like I said. –  IVlad Apr 13 '11 at 12:49
I'm pretty sure that `O(x/log x) < O(x)`. –  Gabe Apr 13 '11 at 13:05
@IVlad when comparing algorithms, it's not fair to round one of their time complexities up to a convenient upper-bound, while keeping the other one's bound tight. The naive method takes O(n*sqrt(n)/log(n)). Your overall point is correct, since O(n log log n) is better than O(n*sqrt(n)/log n), which is easy to see by plotting (sqrt(n)/log n) / log log n. –  Daniel Stutzbach May 24 '11 at 13:27

Explained in this paper: http://www.cs.hmc.edu/~oneill/papers/Sieve-JFP.pdf

-

A "naive" Sieve of Eratosthenes will mark non-prime numbers multiple times. But, if you have your numbers on a linked list and remove numbers taht are multiples (you will still need to walk the remainder of the list), the work left to do after finding a prime is always smaller than it was before finding the prime.

-
Having the numbers in a linked list is a horrible idea. Linked lists don't allow random access, which is crucial for the sieve's performance. –  IVlad Apr 13 '11 at 12:27
You take the head of the linked list, this is your next prime, you then traverse the whole remaining linked list, deleting all values that are a multiple of your prime (you can simply add the prime to an accumulator, if you want to skip trial division and you probably want to do that). Then, as long as you have a linked list, you take the head of the list as your prime, ... Quick trial implementation and some benchmarking seems to indicate it is no worse than using an array being marked off. –  Vatine Apr 13 '11 at 12:58
You're comparing it with the naive sieve implementation. Why use an int (you have to store the actual number) and a pointer when all you need is a single bit to tell you if the number corresponding to that bit is prime or not? If you use arrays, you only need a single bit for each number. How does your solution scale if I want to add a wheel (described in @Landei's link. Basically, if I want to start from 7 and ignore multiples of 2, 3 and 5). Not to mention the overhead of using lists. Besides, your answer implies that using linked lists is better than the "naive" sieve, which isn't true. –  IVlad Apr 13 '11 at 13:05
@IVlad another way to say this, is that the proper S. of E. is like no-duplicates pigeonhole sort: we are able to directly place a number into an array right into its proper place, using the number as an address. If numbers are actually removed on each step, direct addressing is no longer possible. –  Will Ness Aug 7 '12 at 19:43
@IVlad: Actually, random access is not crucial for a sieve's performance. In fact, random access KILLS a sieve's performance. Random access to RAM kills performance in general, as it kills cache coherency. Sequential access to an array is orders of magnitude faster than random access. –  Todd Lehman Dec 20 '12 at 3:28

the first difference is that division is much more expensive than addition. Even if each number is 'marked' several times, it's trivial when compared with the huge number of divisions needed for the 'dumb' algorithm.

-
Still, as we know from the teachings of the Big O - with large enough N this difference will become unimportant. –  Vilx- Apr 13 '11 at 12:46
This has nothing to do with it, both division and addition are done in constant time (assuming fixed-width ints). –  IVlad Apr 13 '11 at 13:53
@ypercube - I said assuming fixed-width ints. There's nothing stopping us from putting constant upper bounds on things while doing big O analysis. So yes, it is constant under these circumstances. –  IVlad Apr 13 '11 at 14:58
If you're doing a Sieve on numbers larger than 2^64, well, good luck. –  Nick Johnson Apr 14 '11 at 0:24
Integer division and addition are same speed on modern CPUs. Regarding larger than 64 bits: Sure, division will be slower than addition THEN, but you would never have enough RAM or even disk space to house a sieve anyway with numbers that large, for comparison. It turns out that in practice, brute-force division in a tight loop is faster than sieve creation (as long as you only test-divide by primes up to the square root), even for an extremely optimized sieve using packed bitmasks. What kills you on speed with the sieve is memory latency. –  Todd Lehman Dec 20 '12 at 3:24