@hackage expresso0.1.2.2

A simple expressions language based on row types

☕ Expresso

A simple expressions language with polymorphic extensible row types.

Introduction

Expresso is a minimal statically-typed functional programming language, designed with embedding and/or extensibility in mind. Possible use cases for such a minimal language include configuration (à la Nix), data exchange (à la JSON) or even a starting point for a custom external DSL.

Expresso has the following features:

  • A small and simple implementation
  • Statically typed with type inference
  • Structural typing with extensible records and variants
  • Lazy evaluation
  • Convenient use from Haskell (a type class for marshalling values)
  • Whitespace insensitive syntax
  • Type annotations to support first-class modules and schema validation use cases
  • Built-in support for ints, double, bools, chars and lists
  • Support for fixed-points (useful for dynamic binding), but without recursive records.

Installation

Expresso the library and executable (the REPL) is currently built and tested using cabal.

Functions

Expresso is a functional language and so we use lambda terms as our basic means of abstraction. To create a named function, we simply bind a lambda using let. I toyed with the idea of using Nix-style lambda syntax, e.g. x: x for the identity function, but many mainstream languages, not just Haskell, use an arrow to denote a lambda term. An arrow is also consistent with the notation we use for types. Expresso therefore uses the arrow -> to denote lambdas, with the parameters to bind on the left and the expression body on the right, for example x -> x for identity.

Note that multiple juxtaposed arguments is sugar for currying. For example:

f x -> f x

is the same as:

f -> x -> f x

The function composition operators are >> and << for forwards and backwards composition respectively.

Records

Expresso records are built upon row-types with row extension as the fundamental primitive. This gives a very simple and easy-to-use type system when compared to more advanced systems built upon concatenation as a primitive. However, even in this simple system, concatenation can be encoded quite easily using difference records.

Records can of course contain arbitrary types and be arbitrarily nested. They can also be compared for equality. The dot operator (select) is used to project out values.

Expresso REPL
Type :help or :h for a list of commands
Loaded Prelude from /home/tim/Expresso/Prelude.x
λ> {x = 1}.x
1
λ> {x = {y = "foo"}, z = [1,2,3]}.x.y
"foo"
λ> {x = 1, y = True} == {y = True, x = 1}
True

Note that records cannot refer to themselves, as Expresso does not support type-level recursion.

Record extension

Records are eliminated using selection . and introduced using extension |. For example, the record literal:

{x = 1, y = True}

is really sugar for:

{x = 1 | { y = True | {}}}

The row types use lacks constraints to prohibit overlapping field names. For example, the following is ill-typed:

{x = 1, x = 2} -- DOES NOT TYPE CHECK!

let r = {x = "foo"} in {x = "bar" | r} -- DOES NOT TYPE CHECK!

The lacks constraints are shown when printing out inferred row types via the REPL, for example:

λ> :type r -> {x = 1 | r}
forall r. (r\x) => {r} -> {x : Int | r}

In the above output, the REPL reports that this lambda can take a record with underlying row-type r, providing r satisfies the constraint that it does not have a field x.

The type of a literal record is closed, in that the set of fields is fully known:

λ> :type {x = 1}
{x : Int}

However, we permit records with redundant fields as arguments to functions, by inferring open record types:

λ> let sqmag = {x, y} -> x*x + y*y
λ> :type sqmag
forall a r. (Num a, r\x\y) => {x : a, y : a | r} -> a

An open record type is indicated by a row-type in the tail of the record.

Note that the function definition for sqmag above makes use of field punning. We could have alternatively written:

λ> let sqmag = r -> r.x*r.x + r.y*r.y

When matching on record arguments, sometimes it can be necessary to supply a new name to bind the values of a field to, for example:

λ> let add = {x=r, y=s} {x=u, y=v} -> {x = r + u, y = s + v}

Record restriction

We can remove a field by using the restriction primitive \. For example, the following will type-check:

{x = 1 | {x = 2}\x}

We can also use the following syntactic sugar, for such an override:

{x := 1 | {x = 1}}

First-class modules

Records can be used as a simple but powerful module system. For example, imagine a module "List.x" with derived operations on lists:

let
    reverse     = foldl (xs x -> x :: xs) [];
    intercalate = xs xss -> concat (intersperse xs xss);
    ...

-- Exports
in { reverse
   , intercalate
   , ...
   }

Such a module can be imported using a let declaration:

λ> let list = import "List.x"
λ> :type list.intercalate
forall a. [a] -> [[a]] -> [a]

Or simply:

λ> let {..} = import "List.x"

Records with polymorphic functions can be passed as lambda arguments and remain polymorphic using higher-rank polymorphism. To accomplish this, we must provide Expresso with a suitable type annotation of the argument. For example:

let f = (m : forall a. { reverse : [a] -> [a] |_}) ->
            {l = m.reverse [True, False], r = m.reverse [1,2,3] }

The function f above takes a "module" m containing a polymorphic function reverse. We annotate m with a type by using a single colon : followed by the type we are expecting. Note the underscore _ in the tail of the record. This is a type wildcard, meaning we have specified a partial type signature. This type wildcard allows us to pass an arbitrary module containing a reverse function with this signature. To see the full type signature of f, we can use the Expresso REPL:

λ> :t f
forall r. (r\reverse) => (forall a. {reverse : [a] -> [a] | r}) ->
    {l : [Bool], r : [Int]}

Note that the r, representing the rest of the module fields, is a top-level quantifier. The type wildcard is especially useful here, as it allows us to avoid creating a top-level signature for the entire function and explicitly naming this row variable. More generally, type wildcards allow us to leave parts of a type signature unspecified.

Function f can now of course be applied to any module satisfying the type signature:

λ> f (import "List.x")
{l = [False, True], r = [3,2,1]}

Difference records and concatenation

To encode concatenation, we can use functions that extend records and compose them using straightforward function composition:

let f = (r -> { x = "foo", y = True | r}) >> (r -> { z = "bar" | r})

Expresso has a special syntax for such "difference records":

λ> let f = {| x = "foo", y = True |} >> {| z = "bar" |}
λ> f {}
{z = "bar", x = "foo", y = True}

Concatenation is asymmetric whenever we use overrides, for example:

 {| x = "foo" |} >> {| x := "bar" |} -- Type checks
 {| x = "foo" |} << {| x := "bar" |} -- DOES NOT TYPE CHECK!

The Unit type

The type {} is an example of a Unit type. It has only one inhabitant, the empty record {}:

λ> :type {}
{}

Variants

The dual of records are variants, which are also polymorphic and extensible since they use the same underlying row-types. Variants are introduced via injection (the dual of record selection), for example:

λ> Foo 1
Foo 1

Unlike literal records, literal variants are open.

λ> :type Foo 1
forall r. (r\Foo) => <Foo : Int | r>

Variants are eliminated using the case construct, for example:

λ> case Foo 1 of { Foo x -> x, Bar{x,y} -> x+y }
1

The above case expression eliminates a closed variant, meaning any value other than Foo or Bar with their expected payloads would lead to a type error. To eliminate an open variant, we use a syntax analogous to extension:

λ> let f = x -> case x of { Foo x -> x, Bar{x,y} -> x+y | otherwise -> 42 }
λ> f (Baz{})
42

Here the unmatched variant is passed to a lambda (with otherwise as the parameter). The expression after the bar | typically either ignores the variant or delegates it to another function.

Closed variants

We will often need to create closed variant types. For example, we may want to create a structural type analogous to Haskell's Maybe a, having only two constructors: Nothing and Just. This can be accomplished using smart constructors with type annotations. In the Prelude, we define the equivalent constructors just and nothing, as well as a fold maybe over this closed set:

type Maybe a = <Just : a, Nothing : {}>;

just        : forall a. a -> Maybe a
            = x -> Just x;

nothing     : forall a. Maybe a
            = Nothing{};

maybe       = b f m -> case m of { Just a -> f a, Nothing{} -> b }

Note that we declare and use a type synonym Maybe a to avoid repeating the type <Just : a, Nothing : {}>. Type synonyms can be included at the top of any file and have global scope.

Variant embedding

The dual of record restriction is variant embedding. This allows us to restrict the behaviour exposed by a case expression, by exploiting the non-overlapping field constraints. For example, to prevent use of the Bar alternative of function f above, we can define a new function g as follows:

λ> let g = x -> f (<|Bar|> x)
λ> :type g
forall r. (r\Bar\Foo) => <Foo : Int | r> -> Int

Embedding is used internally to implement overriding alternatives, for example:

λ> let g = x -> case x of { override Foo x -> x + 1 | f }

is sugar for:

λ> let g = x -> case x of { Foo x -> x + 1 | <|Foo|> >> f }

λ> :type g
forall r1 r2. (r1\x\y, r2\Bar\Foo) => <Foo : Int, Bar : {x : Int, y : Int | r1} | r2> -> Int

The Void type

Internally, the syntax to eliminate a closed variant uses the empty variant type <>, also known as Void. The Void type has no inhabitants, but we can use it to define a function absurd:

λ> :type absurd
forall a. <> -> a

Absurd is an example of Ex Falso Quodlibet from classical logic (anything can be proven using a contradiction as a premise).

As an example of the above, the following closed case expression:

case x of { Foo{} -> 1, Bar{} -> 2 }

is actually sugar for:

case x of { Foo{} -> 1 | x' -> case x' of { Bar{} -> 2 | absurd } }

A data-exchange format with schemas

We could use Expresso as a lightweight data-exchange format (i.e. JSON with types). But how might we validate terms against a schema?

A simple type annotation <term> : <type> , will not suffice for "schema validation". For example, consider this attempt at validating an integer against a schema that permits everything:

1 : forall a. a        -- DOES NOT TYPE CHECK!

The above fails to type check since the left-hand-side is inferred as the most general type (here a concrete int) and the right-hand-side must be less so.

Instead we need something like this:

(id : forall a. a -> a) 1

A nice syntactic sugar for this is a signature section, although the version in Expresso is slightly different from the Haskell proposal. We write (:T) to mean id : T -> T, where any quantifiers are kept at the top-level. We can now use:

(: forall a. a) 1

If we really do have places in our schema where we want to permit arbitrary data, we should use the equality constraint to guarantee the absence of partially-applied functions. For example:

(: forall a. Eq a => { x : <Foo : Int, Bar : a> }) { x = Bar id }

would fail to type check. But the following succeeds:

λ> (: forall a. Eq a => { x : <Foo : Int, Bar : a> }) { x = Bar "abc" }
{x = Bar "abc"}

Lazy evaluation

Expresso uses lazy evaluation in the hope that it might lead to efficiency gains when working with large nested records.

λ> :peek {x = "foo"}
{x = <Thunk>}

Turing equivalence?

Turing equivalence is introduced via a single fix primitive, which can be easily removed or disabled. fix can be useful to achieve open recursive records and dynamic binding (à la Nix).

λ> let r = mkOverridable (self -> {x = "foo", y = self.x <> "bar"})
λ> r
{override_ = <Lambda>, x = "foo", y = "foobar"}

λ> override r {| x := "baz" |}
{override_ = <Lambda>, x = "baz", y = "bazbar"}

Note that removing fix and Turing equivalence does not guarantee termination in practice. It is still possible to write exponential programs that will not terminate during the lifetime of the universe without recursion or fix.

A configuration file format

Expresso can be used as a typed configuration file format from within Haskell programs. As an example, let's consider a hypothetical small config file for a backup program:

let awsTemplate =
    { location ="s3://s3-eu-west-1.amazonaws.com/tim-backup"
    , include  = []
    , exclude  = []
    }
in
{ cachePath   = Default{}
, taskThreads = Override 2
, profiles =
   [ { name = "pictures"
     , source = "~/Pictures"
     | awsTemplate
     }
   , { name = "music"
     , source = "~/Music"
     , exclude := ["**/*.m4a"]
     | awsTemplate }
   ]
}

Note that even for such a small example, we can already leverage some of the abstraction power of extensible records to avoid repetition in the config file.

In order to consume this file from a Haskell program, we can define some corresponding nominal data types:

data Config = Config
    { configCachePath   :: Overridable Text
    , configTaskThreads :: Overridable Integer
    , configProfiles    :: [Profile]
    } deriving Show

data Overridable a = Default | Override a deriving Show

data Profile = Profile
    { profileName     :: Text
    , profileLocation :: Text
    , profileInclude  :: [Text]
    , profileExclude  :: [Text]
    , profileSource   :: Text
    } deriving Show

Using the Expresso API, we can write HasValue instances to handle the projection into and injection from, Haskell values:

import Expresso

instance HasValue Config where
    proj v = Config
        <$> v .: "cachePath"
        <*> v .: "taskThreads"
        <*> v .: "profiles"
    inj Config{..} = mkRecord
        [ "cachePath"      .= inj configCachePath
        , "taskThreads"    .= inj configTaskThreads
        , "profiles"       .= inj configProfiles
        ]

instance HasValue a => HasValue (Overridable a) where
    proj = choice [("Override", fmap Override . proj)
                  ,("Default",  const $ pure Default)
                  ]
    inj (Override x) = mkVariant "Override" (inj x)
    inj Default = mkVariant "Default" unit

instance HasValue Profile where
    proj v = Profile
        <$> v .: "name"
        <*> v .: "location"
        <*> v .: "include"
        <*> v .: "exclude"
        <*> v .: "source"
    inj Profile{..} = mkRecord
        [ "name"     .= inj profileName
        , "location" .= inj profileLocation
        , "include"  .= inj profileInclude
        , "exclude"  .= inj profileExclude
        , "source"   .= inj profileSource
        ]

Before we load the config file, we will probably want to check the inferred types against an agreed signature (a.k.a. schema validation). The Expresso API provides a Template Haskell quasi-quoter to make this convenient from within Haskell:

import Expresso.TH.QQ

schema :: Type
schema =
  [expressoType|
    { cachePath   : <Default : {}, Override : Text>
    , taskThreads : <Default : {}, Override : Int>
    , profiles :
        [ { name     : Text
          , location : Text
          , include  : [Text]
          , exclude  : [Text]
          , source   : Text
          }
        ]
    }|]

We can thus load, validate and evaluate the above config file using the following code:

loadConfig :: FilePath -> IO (Either String Config)
loadConfig = evalFile (Just schema)

Note that we can also install our own custom values/functions for users to reference in their config files. For example:

loadConfig :: FilePath -> IO (Either String Config)
loadConfig = evalFile' envs (Just schema)
  where
    envs = installBinding "system" TText (inj System.Info.os)
         . installBinding "takeFileName"  (TFun TText TText) (inj takeFileName)
         . installBinding "takeDirectory" (TFun TText TText) (inj takeDirectory)
         . installBinding "doesPathExist" (TFun TText TBool) (inj doesPathExist) -- NB: This does IO reads
         $ initEnvironments

Finally, we need not limit ourselves to config files that specify record values. We can project Expresso function values into Haskell functions (in IO), allowing higher-order config files! The projection itself is handled by the HasValue class, just like any other value:

 Haskell> Right (f :: Integer -> IO Integer) <- evalString (Just $ TFun TInt TInt) "x -> x + 1"
 Haskell> f 1
 2

References

Expresso is built upon many ideas described in the following publications:

  • "Practical type inference for arbitrary-rank types" Peyton-Jones et al. 2011.
  • "A Polymorphic Type System for Extensible Records and Variants" B. R. Gaster and M. P. Jones, 1996.
  • "Extensible records with scoped labels" D. Leijen, 2005.