Marcin 'Qrczak' Kowalczyk
6 Oct 2001 09:31:54 GMT
Fri, 5 Oct 2001 19:02:50 -0700, Juan Carlos Arévalo Baeza <firstname.lastname@example.org> pisze:
>>"If a declaration group"
> Meaning something like "let g = isNil" up there?
Yes, a group of mutually recursive bindings or a single non-recursive
binding (equations inside let or where or at module toplevel).
>>"contains a pattern binding with a nonvariable pattern"
> Meaning... what exactly?
A pattern which is something other than an identifier.
>>"or one [pattern binding] where there is no type signature for
> Meaning "g = isNil" above, without type signature for "g"?
>>"then the context parts of the type schemes derived for the bound
>>variables must be empty"
> Meaning that in "let g = ...", "g" cannot be
> "g :: <context> => <type>" unless the context is explicitly given?
> Hmmm... This still sounds like nonsensical (as in counterintuitive
> and artificial) to me. In a definition like "let g = isNil"
> there cannot be any compelling reason to give "g" any type
> different than the type of "isNil".
There are two reasons for the monomorphism restriction:
- isNil (or any value with a non-empty context in its type) doesn't
really behave like a constant, but as a function taking a dictionary
of 'IsNil a' as an implicit argument, so it's recomputed each time
it it used...
This point is silly in this case, because it is already a function
with an explicit argument! It makes more sense however when the type
is not of the form a->b. For example in 'n = 7*11*13' letting n have
the type 'Num a => a' implies that it is recomputed each time it
is used. Unless the compiler manages to optimize this, but it can't
in all cases (n can be used with different types in various places).
- When a pattern binds several variables, it can happen that their
types need different sets of class constraints. Using such a variable
doesn't fully determine the type to perform the computation in.
It's thus ambiguous and an error.
It's not ambiguous with monomorphic restriction, where all uses of
all variables contribute to finding the single type to perform the
Even with a single variable it can happen that some uses will
constrain the type enough to determine the instance, and some will
not. Without monomorphic restrictions some uses are OK, but others
will stop the compilation. With monomorphic restriction all uses
contribute to a single type and typing might succeed.
The general trouble with monomorphic restriction is that let bindings
can mean two similar things:
1. Create a single lazily evaluated object with the given definition
and make it or its components available through variables (pattern
2. Define a possibly polymorphic function and perform the given
computation when it is applied (function binding).
Degenerate forms of these cases look the same in Haskell: a single
identifier is on the left. It's not clear which one the programmer
meant. Often it doesn't matter. It really matters only when classes
are involved: either to determine where to apply implicit arguments
of class dictionaries or to disambiguate instances by making some
types more concrete.
Clean uses three forms of equal sign: => defined a function, := binds
a single lazily evaluated object, and = means => on the toplevel and
:= locally (if I remember the syntax). ML doesn't have this problem
because it doesn't have classes.
>>but two legal possibilities are
>>- forall b . [b] -> Bool, and
> Choosing an explicit instance of IsNil. But this sounds
> nonsensical to me, too. No instance should be choosing unless the
> specific instance type is forced by the definition. Otherwise,
> if there are two insances, which one would it choose?
Type inference defined in the traditional way is non-deterministic
A good property of a type system is that it should not matter when
various choices are made: as long as we succeed in deriving a type
of the whole program, the overall meaning should be unambiguous.
This property has a name - sorry, I forgot which.
When we choose an instance too early, we might not succeed at all (if
another instance happens to be needed). Unfortunately in this case we
may fail in either case: no choice is sure to be better than the other.
It might happen that by choosing this instance now it will be OK when
f is used. The other possibility of the type for f would take away
some freedom: we can't use this instance later with different choices
for types of list elements, because both uses of g must make the same
choices for type variables with class constraints. It's not visible yet
(before choosing the instance) that the single type 'IsNil a => a'
will expand into something containing quantified type variables without
class constraints which can be instantiated independently!
Of course it may also happen that completely different instances will
be needed when f is used, so choosing the instance now is bad. That's
the point: there is no universal choice. The property of principal
types would allow us to derive some most general type of f, such that
any other type is its instance. Unfortunately it doesn't hold. This
case was not expected.
>>- a -> Bool (without quantification and with "IsNil a" among the
> This is something I didn't understand either. Which predicates?
I think "isNil a" goes to the context of the whole expression
containing the "let g = ..." (I'm not sure if Karl meant that).
Generally for an expression the compiler determines a type and a
set of collected class constraints, resulting from using identifiers
having polymorphic types with constraints. A polymorphic type of an
identifier which is used is instantiated using fresh type variables and
constraints apply to these type variables.
A let binding usually "eats" all constraints and puts them in the
declaration. The constraints will reappear outside when the declared
identifier is used, but they can appear in different configurations
when the identifier is used polymorphically: instantiated to various
But in a monomorphic let binding the same type variables can be used
for both the body of the declaration and its usages: the variable is
not polymorphic, all usages have the same type. So it makes sense to
float the context out to the expression containing the whole let.
It will be determined once for the whole body of f.
__("< Marcin Kowalczyk * email@example.com http://qrczak.ids.net.pl/
^^ SYGNATURA ZASTĘPCZA