# Is this idiomatic F# for a fairly quick infinite recursive sequence?

Whilst solving the 12th project euler problem I set about making an infinite sequence to get successive triangular numbers. My first attempt was:

``````let slowTriangularNumbers =

let rec triangularNumbersFrom n =
seq {
yield seq { 0 .. n } |> Seq.sum
yield! triangularNumbersFrom (n + 1)
}

triangularNumbersFrom 1
``````

This turned out to be very slow - each time getting the next item it had to compute all of the additions leading up to `n`.

My next attempt was:

``````let fasterTriangularNumbers =

let cache = System.Collections.Generic.Dictionary<int, int>()
cache.[0] <- 0

let rec triangularNumbersFrom n =
seq {
cache.[n] <- cache.[n - 1] + n
yield cache.[n]
yield! triangularNumbersFrom (n + 1)
}

triangularNumbersFrom 1
``````

Introducing the mutable dictionary has speeded it up considerably, but is this normal to have a mutable collection, or is there another way I could have represented state?

-

I think this is more idiomatic:

``````Seq.unfold (fun (i, n) -> Some(n, (i+1, n+i))) (2, 1)
``````

You might prefer this alternative:

``````seq { 2 .. System.Int32.MaxValue }
|> Seq.scan (+) 1
``````
-
I guess this is equivalent to: let rec loop(n, diff) = seq { yield n yield! loop(n + diff, diff + 1) } loop(1, 2) which was provided by Tomas Petricek in another answer. Would you mind explaining what "Some" is doing here? –  NickL Dec 27 '13 at 20:04
@NickL `Seq.unfold` calls the specified function iteratively (but lazily!) until it returns `None`. By always returning `Some`, Jon's implementation produces an infinite sequence. –  Jack P. Dec 27 '13 at 20:58
@NickL: The main advantage over writing a sequence expression by hand (other than brevity) is the assurance that there are no tail call issues. You can easily write sequence expressions that leak stack space resulting in a stack overflow. That problem does not exist if you use `Seq.unfold`. –  Jon Harrop Dec 27 '13 at 22:03