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Oct
16
comment Interview question : What is the fastest way to generate prime number recursively?
@IVlad (almost 4 years later but still...) actually, n / log(n) ~ o(n), with the little o. O(n/log(n)) is a complexity class on its own. When approximated as n^a(n), the a(n) will always be smaller than 2.0, converging to 2.0 from below.
Oct
16
comment How to find prime numbers between 0 - 100?
@OmShankar why n^2? according to this answer (and this comment there) it should be the usual n*log log n (not O(n) btw).
Oct
16
comment How to find prime numbers between 0 - 100?
@OmShankar no, if you test for n % 3, then you test it. the point is to not have to test it, if you avoid it by construction. For mults of 3, you could use for(i=5, k=4; i*i <= num; i+= (k=6-k)) { ...use i... } or for(i=5, j=7; j*j<= num; i+=6, j+=6) { ...use i... ; ...use j... }.
Oct
16
comment How to find prime numbers between 0 - 100?
@OmShankar yes, but -- to 10k you need primes below 100. there are 25 of them. using 25 variables explicitly isn't good. Either have a bona fide priority queue, or just use the regular sieve of E. with arrays then. Normally you'd go by segments - smaller arrays that fit in the memory cache, - and sieve them one after another. 10K is really a very small number and can be done in one segment.
Oct
16
comment How to find prime numbers between 0 - 100?
@OmShankar starting from 3, incrementing by 2 will enumerate all odd numbers - no need to test any even above 2, as by definition they are all non-prime.
Oct
16
comment Fast Algorithm to find number of primes between two numbers
"use Euclidean algorithm" to calculate the GCD of a given number with what? All numbers below sqrt(1000!) (== 79.26*367.88**500 = 5.6469*10^1284 or something) ?
Oct
16
comment How to find prime numbers between 0 - 100?
@OmShankar IOW, this is an incremental sieve of Eratosthenes and m3, m5, m7 form an implicit priority queue of multiples of the primes 3, 5, and 7.
Oct
16
comment How to find prime numbers between 0 - 100?
we generate up to 100, aren't we? it's the sieve of Eratosthenes, were we skip over the composites - and that's what this code is doing. The timing of generation of composites and of skipping over them (by checking for equality) is mixed into one timeline. The usual sieve first generates composites and marks them in an array, then sweeps the array. Here the two stages are mashed into one, to avoid having to use any array at all (this only works because we know the top limit's square root - 10 - in advance and use only primes below it, viz. 3,5,7 - with 2 implicitly skipped in advance).
Oct
16
comment Predicate logic in Scheme
are you familiar with logic programming, SLD resolution, Horne clauses, Prolog, "infinite" streams ?
Oct
16
comment Sieve of Eratosthenes - Primes between X and N
you suggested "to build the array in sections, then drop each section that's entirely < x as you go" but you don't need to "drop each" if you just don't make all of the intermediate segments in the first place, and only work with two. Then at the very end of the answer you propose using "different prime-finding algorithms that don't require enumerating all the primes up to x" but the sieve of Eratosthenes requires no such thing so there's no need to replace it with anything else, in that regard.
Oct
15
comment Sieve of Eratosthenes - Primes between X and N
this particular implementation of this particular algorithm is perfectly amenable to the change described in the answer linked in my comment. It already works up to the sqrt of n, all that's needed is to split the sieve array in two. No need to use anything but the sieve of Eratosthenes for this. It absolutely does not require enumerating all the primes up to x to start producing the primes after x.
Oct
15
revised How to improve this algorithm by 1)use arrays, 2)avoid list concatenation (lazy lists?)?
unindent some code to fit to screen
Oct
15
revised st-monad wiki description
fix (important) typos, formatting
Oct
15
revised st-monad wiki excerpt
fix (important) typos, formatting
Oct
15
comment Sieve of Eratosthenes - Primes between X and N
no, no, what you need is the offset sieve of Eratosthenes - sieve up to the sqrt of n, while sieving an offset segment from x to n too. A lot less work than what you're proposing, when sqrt(n) << x.
Oct
15
comment Point-free equivalent
@Bergi also, it's known as "boobs operator".
Oct
15
comment Point-free equivalent
me personally, I'm quickly lost in this forest of names. The point to point-free, for me, is not having to name what's not important. Not only arguments, but interim functions too - mostly the interim functions.
Oct
15
comment Point-free equivalent
ah, nice. this completes the follow-the-data line of thought (re: the double-<*>). This way, there's no messing with the curry/uncurry.
Oct
15
comment Point-free equivalent
@Bergi I'm not sure. You can try Hoogle for its type. There's a dot-operator, or something, on SO, too.
Oct
14
revised Point-free equivalent
added 69 characters in body