# Strict type checking in binding to routine arguments

With the routine definition below

``````sub bar( Int @stuff ) {
return [+] @stuff;
}
``````

Both the lines below fail:

``````say bar( ^3 );
say bar( [1,2,3] );
``````

with error

``````Type check failed in binding to parameter '@stuff';
expected Positional[Int] but got Array (\$[1, 2, 3])
``````

Assignment to a variable with the same definition, however, works

``````my Int @works = [1,2,3] ;
say bar( @works );
``````

Obviously variable assignment and argument binding does not work in exactly the same way, but is it because type checking is strict?
Or Is there any other mechanism at work?

• tl;dr assignment ≠ binding – raiph Apr 8 at 20:39

Assignment is a copying operation. When we say:

``````my @a = @b;
``````

Then it:

1. Obtains an iterator from `@b`
2. Iterates it, assigning each value into a slot of `@a`

Which is why future assignments into `@b` (or `push`es, or `pop`s, etc.) will not affect `@a`. (As an aside, it also means that `my @a = [1,2,3]` is rather wasteful, because it constructs an anonymous `Array`, only to iterate it and then leave it for GC immediately afterwards.)

When we have:

``````my @a = 1, 2, 3;
my Int @b = @a;
``````

Then the type-checking is performed on each assignment into a slot of `@b`. It's the values that matter. Of course, we have to do O(n) type checks, but the semantics of `=` mean we're doing an O(n) operation anyway.

By contrast, binding is an aliasing operation. It makes a symbol reference a value. It is O(1) operation. If we have:

``````my @a = 1, 2, 3;
my Int @b := @a;
``````

Then it must fail, because `@a` is not appropriately constrained. We can't just go through `@a` and check its values are `Int`; for one, it'd change the complexity of the operation, making the performance of the code hard to reason about, but also, `@a` could later have, for example, `1.5` assigned in to it, rendering the type constraint on `@b` meaningless, since it aliases the same thing.

Parameter passing works through binding, thus the effect observed in the question.