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## Class Families

Our translation of data families in combination with the desugaring of classes into data types suggest the idea of **indexed class families**, which turns out to be rather useful for generalising class APIs for commonly used data structures.

### An example

As a motivating example take the following problem from John Hughes' *Restricted Data Types*. Suppose we want to implement a set API as a type class. Then, we find that the signature

insert :: Set s => a -> s a -> s a

is too general. We need additional type constraints whose exact form *depends on the type constructor* we use to construct the sets; i.e., it varies on an instance by instance basis. For lists, we just need `Eq`, but for sets as finite maps, we need `Ord`.

With indexed class families, we can define a set class as follows:

class Set s where class C s a empty :: s a insert :: C s a => a -> s a -> s a

Here, the **associated class** `C` of `Set` is indexed by the class parameter `s`.

In instances for sets as lists

instance Set [] where class Eq a => C [] a empty = [] insert x s | x `elem` s = s | otherwise = x:s instance Eq a => C [] a -- Tiresome instance

and sets as finite maps

newtype MapSet a = MapSet (Data.Map.Map a ()) instance Set MapSet where class Ord a => C MapSet a empty = Data.Map.empty insert x s = Data.Map.insert x () s instance Ord a => C MapSet a -- Tiresome instance

we instantiate `C` differently for different type indexes.

The class-family instances have no members in this case, but use existing classes as a superclass to supply `insert` with the equality and ordering methods, respectively. As we want to use these superclasses for sets of any element type of which we have an instance of the superclasses, we need a catch-all instance for each class instance (the "tiresome instances" avove). That is somewhat ugly especially, as it requires the use of `-fallow-undecidable-instances`. Furthermore, if the class has no signatures, there is no other useful instance we could possibly give.

**SLPJ note**: I wonder whether it is ever useful to have a class instance with signatures? Suppose we only allowed the signature-free form? That would simplify the explanation in many ways (e.g. no need to say whether class instances can themselves have assoicated types!), and loses no expressive power. I don't think it loses much convenience either.

### The language extension

We define class families as

class family C a1 .. an

and class-family instances as

class instance ctxt => C t1 .. tn where { sigs }

where I'd propose to not allow functional dependencies to keep matters simpler.

Class instances of class-family instances take the normal form. The only additional constraint is that the class parameters are type instances of the class-family instance types. That is, if we have

instance ctxt' => C s1 .. sn where { .. }

then we need to have that each `si` is a type instance of `ti` for this to be a class instance of the class-family instance `C t1 .. tn`.

As with data families, the class families can be associated with a class by declaring them in the class. In this case, we omit the keywords `family` and `instance` in the family and instance declarations, respectively. Moreover, all type indexes of an associated class need to be class parameters of the parent class.

**OPEN QUESTIONs:**

- Should an associated class be a (kind of) superclass of its parent. At least, we may want to add it implicitly to the signature of each method. Not sure about this, but Roman suggested it, too.
- Do we allow associated types and classes(?!?) in class-family instances?

### Further Examples

Indexed classes appear to be highly useful to achieve modularity for type-class based generic programming approaches. Here's a sketch of a "modular" extension of Hinze's "Generics for the masses" (GM) approach and Laemmel's and Peyton Jones' "Scrap your boilerplate" (SYB3) approach using indexed classes. We first explain why in the original GM approach we cannot override generic with specific (ad-hoc) behavior in a modular fashion. Then, we show how indexed classes come to the rescue. Finally, we consider the SYB3 approach.

#### Generics for the masses

The main idea behind the GM approach is to provide a uniform representation of data types in terms of unit, sum and product types. Generic functions are defined in terms of this uniform rather than the concrete structural representation of a data type. The programmer only needs to maintain a type isomorphism between the uniform and concrete representation. Thus, there is no need to extend the (now generic) definition of functions in case we include new data types.

Here is a (over-simplified) presentation of the GM approach We only consider the uniform representations "literals" and "plus".

data Lit = Lit Int data Plus a b = Plus a b class Generic g where lit :: g Lit plus :: g a -> g b -> g (Plus a b)

Below is a generic definition of some evaluation function.

newtype Ev a = Ev{eval' :: a -> Int} instance Generic Ev where lit = Ev (\x -> case x of Lit i -> i) plus a b = Ev (\p -> case p of (Plus x y) -> eval' a x + eval' b y)

In order to use the evaluator on its familiar type,
we need a `dispatcher`* function to select the appropriate case of
a generic function.
The most straightforward approach is to use an ad-hoc polymorphic
(therefore extensible) function.
*

class Rep a where rep :: Generic g => g a instance Rep Lit where rep = lit instance (Rep a,Rep b) => Rep (Plus a b) where rep = plus rep rep eval :: Rep t => t -> Int eval = eval' rep

The dispatcher function rep will select the appropriate generic case depending on the concrete type context. We can straightforwardly introduce new generic functions (omitted here).

Suppose we introduce a new ad-hoc case "minus" which has the same structural representation as "plus".

data Minus a b = Minus a b class Generic g => GMinus g where minus :: g a -> g b -> g (Minus a b) instance GMinus Ev where minus a b = Ev (\p -> case p of (Minus x y) -> eval' a x - eval' b y) instance (Rep a,Rep b) => Rep (Minus a b) where rep = minus rep rep

The problem is that we cannot access this new case, unless we update the type of the dispatcher function rep. We must change rep's declaration as follows.

class Rep a where rep :: GMinus g => g a -- original code: rep :: Generic g => g a

But changing rep's class declaration requires to recompile the entire program. Hence, extending generic definitions with ad-hoc cases cannot be modularly.

Such problems go away if we use indexed classes. More precisely, we use a type indexed class in rep's class declaration.

The generic cases.

class Rep a where class Generic' g a -- or class Generic' g :: * -> Class using Tom's suggestion rep :: Generic' g a => g a instance Rep Lit where class Generic g => Generic' g Lit -- better written as? Generic' g Lit = Generic g rep = lit instance (Rep a,Rep b) => Rep (Plus a b) where class Generic g => Generic' g (Plus a b) rep = plus rep rep eval :: Rep t => t -> Int eval = eval' rep

The ad-hoc case.

class GMinus g where minus :: g a -> g b -> g (Minus a b) instance GMinus Ev where minus a b = Ev (\p -> case p of (Minus x y) -> eval' a x - eval' b y) instance (Rep a,Rep b) => Rep (Minus a b) where class GMinus g => Generic' g (Minus a b) rep = minus rep rep

Notice the use of indexed classes to select appropriate classes for each instance.

General insight: It seems that via indexed classes we can encode a type-passing type-class translation scheme.

#### SYB3

The SYB3 approach faces similar challenges when it comes to modularity.

The generic cases.

class Typable a => Data a where gmapQ :: (forall b. Data b => b -> r) -> a -> [r] instance Data Char where gmapQ f c = [] instance Data a => Data [a] where gmapQ f (x:xs) = [f x, f xs]

A new generic "size" function.

class Size a where gsize :: a -> Int -- specific instance instance Size Name where ... -- generic instance, -- we use overlapping instances to cover all remaining cases instance Data t => Size t where -- (S) gsize t = 1 + sum (gmapQ gsize t)

The problem is that the instance (S) will not type check. The program text gmapQ size is the trouble maker. In this specific context, the combinator gmapQ expects as its first argument a function of type

forall a. Data a => a -> Int

and the actual argument gsize has type

forall a. Size a => a -> Int

But the second type is not a subtype of the second because we cannot derive 'Size a' from 'Data a' for any 'a'. For this subtype relation to hold, if we can satisfy This condition is satisfied if we make 'Sizes' a superclass of 'Data'. But this will break modularity (we have to change 'Data's class declaration for each new generic function).

We fix the problem by by introducing an indexed class in gmapQ's context. Thus, we can 'enable' the 'Size' class when needed.

-- type family class family Context ctxt :: * -> class class Typeable t => Data ctxt t where gmapQ :: (forall e . Data e ctxt, Context ctxt e => e -> r) -> t -> [r] instance Data Char ctxt where gmapQ f c = [] instance Data e ctxt => Data [e] ctxt where gmapQ f (x:xs) = [f x,f xs] class Size t where gsize :: t -> Int instance Size t where gsize = 42 ... instance Data t SizeCtxt => Size t where gsize x = 1 + sum (gmapQ gsize x) data SizeCtxt -- uninhabited class instance (Size e) => Context SizeCtxt e

### Type checking

Like with data families, there is little impact on type checking. Methods of class-family instances have signatures whose class constraints are not just variables. For example,

class instance C Int a where foo :: a -> a

gives us

foo :: C Int a => a -> a

Otherwise, superclasses and class instance introduce the usual given constraints.

However, to implement superclass constraints, we need to have a `ClassInstEnv` (similar to the `InstEnv` and `FamInstEnv` right now). For a vanilla class, if we have `C t1 .. tn` in the constraint pool, we just can add all superclasses of `C` at the appropriate instance types. However, if `C` is a class family, we need to check whether there is a class-family instance `C r1 .. rn` and a substitution `theta`, such that `theta (C r1 .. rn) == C t1 .. tn`; if so, we can add the superclasses of `C r1 .. rn` at the instance types suggested by `theta`. This check for a class-family instance requires a function `lookupClassInstEnv` (similar to the current `lookupInstEnv` and `loookupFamInstEnv`).

Finally, we need to exclude overlap of class-family instances in the same way as for data-family instances.

### Desugaring

A class family declaration corresponds to a data family:

class family C a1 .. an || vv data family C a1 .. an

A class-family instance corresponds to a data-family instance, which is the classes dictionary type.

class instance forall b1..bn. ctxt => C t1 .. tn where { sigs } || vv data :R42C b1 .. bn = R42C { super :: ctxt, sigs } coe $Co:R42C b1 .. bn :: C t1 .. tn ~ :R42C b1 .. bn $WR42C :: ctxt -> sigs -> C t1 .. tn -- the datacon wrapper and the field selectors -- use the coercion $Co:R42C to move between the -- indexed dictionary type and the representation -- dictionary type (the current code in MkId for -- data families should do all this already)

Moreover, the class-family instance will have a representation as a `Class.Class` in GHC, where the `classTyCon` is `:R42C` (i.e., the instance tycon of the dictionary). We might also want `Class.Class` to have a `classParent` field as we have this at them moment for instance `TyCon`s.

Finally, a class instance of a class-family instance is translated as usual:

instance forall c1..cm. ctxt' => C s1 .. sn where { methods } || vv $dCs1sm :: ctxt' -> C s1 .. sn $dCs1sm dicts = $WR42C <superdict> methods

Moreover, we will have a `InstEnv.Instance` representation of the instance where `is_class` is the name of the class family and `is_tys` is `s1` to `sn`. This is as lookup in an `InstEnv.InstEnv` does not need to make a distinction between vanilla classes and class-family instances.

### Related work

Compare to **composite class signatures** and **submodules** of the *Modular Type Classes* paper.

### Comments

Roman objects that he really would like collection interfaces to use synonym families (rather than class families) - for example,

class Collection c where type Element c instance Eq a => Collection (Set a) where type Element (Set a) = a instance Ord a => Collection (OrdSet a) where type Element (OrdSet a) = a instance Collection [a] where type Element [a] = a

**SLPJ note**: I don't understand the question here.