8

I had a task where I wanted to find the closest string to a target (so, edit distance) without generating them all at the same time. I figured I'd use the high water mark technique (low, I guess) while initializing the closest edit distance to Inf so that any edit distance is closer:

use Text::Levenshtein;

my @strings = < Amelia Fred Barney Gilligan >;

for @strings {
    put "$_ is closest so far: { longest( 'Camelia', $_ ) }";
    }

sub longest ( Str:D $target, Str:D $string ) {
    state Int $closest-so-far = Inf;
    state Str:D $closest-string = '';

    if distance( $target, $string ) < $closest-so-far {
        $closest-so-far = $string.chars;
        $closest-string = $string;
        return True;
        }

    return False;
    }

However, Inf is a Num so I can't do that:

Type check failed in assignment to $closest-so-far; expected Int but got Num (Inf)

I could make the constraint a Num and coerce to that:

    state Num $closest-so-far = Inf;
    ...
        $closest-so-far = $string.chars.Num;

However, this seems quite unnatural. And, since Num and Int aren't related, I can't have a constraint like Int(Num). I only really care about this for the first value. It's easy to set that to something sufficiently high (such as the length of the longest string), but I wanted something more pure.

Is there something I'm missing? I would have thought that any numbery thing could have a special value that was greater (or less than) all the other values. Polymorphism and all that.

  • what about Real, a role done by both Int and Num? – Christoph Jul 22 '17 at 21:20
  • But a Real isn't an Int, and that's what I want to put into something that should only a whole number. – brian d foy Jul 23 '17 at 4:36
8

{new intro that's hopefully better than the unhelpful/misleading original one}

@CarlMäsak, in a comment he wrote below this answer after my first version of it:

Last time I talked to Larry about this {in 2014}, his rationale seemed to be that ... Inf should work for all of Int, Num and Str

(The first version of my answer began with a "recollection" that I've concluded was at least unhelpful and plausibly an entirely false memory.)

In my research in response to Carl's comment, I did find one related gem in #perl6-dev in 2016 when Larry wrote:

then our policy could be, if you want an Int that supports ±Inf and NaN, use Rat instead

in other words, don't make Rat consistent with Int, make it consistent with Num

Larry wrote this post 6.c. I don't recall seeing anything like it discussed for 6.d.

{and now back to the rest of my first answer}


Num in P6 implements the IEEE 754 floating point number type. Per the IEEE spec this type must support several concrete values that are reserved to stand in for abstract concepts, including the concept of positive infinity. P6 binds the corresponding concrete value to the term Inf.

Given that this concrete value denoting infinity already existed, it became a language wide general purpose concrete value denoting infinity for cases that don't involve floating point numbers such as conveying infinity in string and list functions.


The solution to your problem that I propose below is to use a where clause via a subset.

A where clause allows one to specify run-time assignment/binding "typechecks". I quote "typecheck" because it's the most powerful form of check possible -- it's computationally universal and literally checks the actual run-time value (rather than a statically typed view of what that value can be). This means they're slower and run-time, not compile-time, but it also makes them way more powerful (not to mention way easier to express) than even dependent types which are a relatively cutting edge feature that those who are into advanced statically type-checked languages tend to claim as only available in their own world1 and which are intended to "prevent bugs by allowing extremely expressive types" (but good luck with figuring out how to express them... ;)).

A subset declaration can include a where clause. This allows you to name the check and use it as a named type constraint.

So, you can use these two features to get what you want:

subset Int-or-Inf where Int:D | Inf;

Now just use that subset as a type:

my Int-or-Inf $foo; # ($foo contains `Int-or-Inf` type object) 
$foo = 99999999999; # works
$foo = Inf;         # works
$foo = Int-or-Inf;  # works
$foo = Int;         # typecheck failure
$foo = 'a';         # typecheck failure

1. See Does Perl 6 support dependent types? and it seems the rough consensus is no.

  • Although that might be Larry's rationale, Infinity is an abstract concept, so it's not quite a Num either. But, a junction of types seems very interesting. – brian d foy Jul 23 '17 at 5:59
  • 1
    Last time I talked to Larry about this, his rationale seemed to be that Inf should be that Inf should work for all of Int, Num and Str, and that how to do that is a secondary concern. @raiph, do you have a link to back up a newer stance than that? – Carl Mäsak Jan 9 '18 at 13:22
  • brian-d-foy @CarlMäsak I've searched high and low and pondered the exchange Carl has linked and some others I found. I haven't asked Larry directly but I now suspect my recollection of his rationale was false. I've edited my answer accordingly. – raiph Jan 11 '18 at 14:11

Your Answer

By clicking "Post Your Answer", you acknowledge that you have read our updated terms of service, privacy policy and cookie policy, and that your continued use of the website is subject to these policies.

Not the answer you're looking for? Browse other questions tagged or ask your own question.