2. Kaleidoscope: Implementing a Parser and AST

2.1. Chapter 2 Introduction

Welcome to Chapter 2 of the “Implementing a language with LLVM in Objective Caml” tutorial. This chapter shows you how to use the lexer, built in Chapter 1, to build a full parser for our Kaleidoscope language. Once we have a parser, we’ll define and build an Abstract Syntax Tree (AST).

The parser we will build uses a combination of Recursive Descent Parsing and Operator-Precedence Parsing to parse the Kaleidoscope language (the latter for binary expressions and the former for everything else). Before we get to parsing though, lets talk about the output of the parser: the Abstract Syntax Tree.

2.2. The Abstract Syntax Tree (AST)

The AST for a program captures its behavior in such a way that it is easy for later stages of the compiler (e.g. code generation) to interpret. We basically want one object for each construct in the language, and the AST should closely model the language. In Kaleidoscope, we have expressions, a prototype, and a function object. We’ll start with expressions first:

(* expr - Base type for all expression nodes. *)
type expr =
  (* variant for numeric literals like "1.0". *)
  | Number of float

The code above shows the definition of the base ExprAST class and one subclass which we use for numeric literals. The important thing to note about this code is that the Number variant captures the numeric value of the literal as an instance variable. This allows later phases of the compiler to know what the stored numeric value is.

Right now we only create the AST, so there are no useful functions on them. It would be very easy to add a function to pretty print the code, for example. Here are the other expression AST node definitions that we’ll use in the basic form of the Kaleidoscope language:

(* variant for referencing a variable, like "a". *)
| Variable of string

(* variant for a binary operator. *)
| Binary of char * expr * expr

(* variant for function calls. *)
| Call of string * expr array

This is all (intentionally) rather straight-forward: variables capture the variable name, binary operators capture their opcode (e.g. ‘+’), and calls capture a function name as well as a list of any argument expressions. One thing that is nice about our AST is that it captures the language features without talking about the syntax of the language. Note that there is no discussion about precedence of binary operators, lexical structure, etc.

For our basic language, these are all of the expression nodes we’ll define. Because it doesn’t have conditional control flow, it isn’t Turing-complete; we’ll fix that in a later installment. The two things we need next are a way to talk about the interface to a function, and a way to talk about functions themselves:

(* proto - This type represents the "prototype" for a function, which captures
 * its name, and its argument names (thus implicitly the number of arguments the
 * function takes). *)
type proto = Prototype of string * string array

(* func - This type represents a function definition itself. *)
type func = Function of proto * expr

In Kaleidoscope, functions are typed with just a count of their arguments. Since all values are double precision floating point, the type of each argument doesn’t need to be stored anywhere. In a more aggressive and realistic language, the “expr” variants would probably have a type field.

With this scaffolding, we can now talk about parsing expressions and function bodies in Kaleidoscope.

2.3. Parser Basics

Now that we have an AST to build, we need to define the parser code to build it. The idea here is that we want to parse something like “x+y” (which is returned as three tokens by the lexer) into an AST that could be generated with calls like this:

let x = Variable "x" in
let y = Variable "y" in
let result = Binary ('+', x, y) in
...

The error handling routines make use of the builtin Stream.Failure and Stream.Error``s. ``Stream.Failure is raised when the parser is unable to find any matching token in the first position of a pattern. Stream.Error is raised when the first token matches, but the rest do not. The error recovery in our parser will not be the best and is not particular user-friendly, but it will be enough for our tutorial. These exceptions make it easier to handle errors in routines that have various return types.

With these basic types and exceptions, we can implement the first piece of our grammar: numeric literals.

2.4. Basic Expression Parsing

We start with numeric literals, because they are the simplest to process. For each production in our grammar, we’ll define a function which parses that production. We call this class of expressions “primary” expressions, for reasons that will become more clear later in the tutorial. In order to parse an arbitrary primary expression, we need to determine what sort of expression it is. For numeric literals, we have:

(* primary
 *   ::= identifier
 *   ::= numberexpr
 *   ::= parenexpr *)
parse_primary = parser
  (* numberexpr ::= number *)
  | [< 'Token.Number n >] -> Ast.Number n

This routine is very simple: it expects to be called when the current token is a Token.Number token. It takes the current number value, creates a Ast.Number node, advances the lexer to the next token, and finally returns.

There are some interesting aspects to this. The most important one is that this routine eats all of the tokens that correspond to the production and returns the lexer buffer with the next token (which is not part of the grammar production) ready to go. This is a fairly standard way to go for recursive descent parsers. For a better example, the parenthesis operator is defined like this:

(* parenexpr ::= '(' expression ')' *)
| [< 'Token.Kwd '('; e=parse_expr; 'Token.Kwd ')' ?? "expected ')'" >] -> e

This function illustrates a number of interesting things about the parser:

1) It shows how we use the Stream.Error exception. When called, this function expects that the current token is a ‘(‘ token, but after parsing the subexpression, it is possible that there is no ‘)’ waiting. For example, if the user types in “(4 x” instead of “(4)”, the parser should emit an error. Because errors can occur, the parser needs a way to indicate that they happened. In our parser, we use the camlp4 shortcut syntax token ?? "parse error", where if the token before the ?? does not match, then Stream.Error "parse error" will be raised.

2) Another interesting aspect of this function is that it uses recursion by calling Parser.parse_primary (we will soon see that Parser.parse_primary can call Parser.parse_primary). This is powerful because it allows us to handle recursive grammars, and keeps each production very simple. Note that parentheses do not cause construction of AST nodes themselves. While we could do it this way, the most important role of parentheses are to guide the parser and provide grouping. Once the parser constructs the AST, parentheses are not needed.

The next simple production is for handling variable references and function calls:

(* identifierexpr
 *   ::= identifier
 *   ::= identifier '(' argumentexpr ')' *)
| [< 'Token.Ident id; stream >] ->
    let rec parse_args accumulator = parser
      | [< e=parse_expr; stream >] ->
          begin parser
            | [< 'Token.Kwd ','; e=parse_args (e :: accumulator) >] -> e
            | [< >] -> e :: accumulator
          end stream
      | [< >] -> accumulator
    in
    let rec parse_ident id = parser
      (* Call. *)
      | [< 'Token.Kwd '(';
           args=parse_args [];
           'Token.Kwd ')' ?? "expected ')'">] ->
          Ast.Call (id, Array.of_list (List.rev args))

      (* Simple variable ref. *)
      | [< >] -> Ast.Variable id
    in
    parse_ident id stream

This routine follows the same style as the other routines. (It expects to be called if the current token is a Token.Ident token). It also has recursion and error handling. One interesting aspect of this is that it uses look-ahead to determine if the current identifier is a stand alone variable reference or if it is a function call expression. It handles this by checking to see if the token after the identifier is a ‘(‘ token, constructing either a Ast.Variable or Ast.Call node as appropriate.

We finish up by raising an exception if we received a token we didn’t expect:

| [< >] -> raise (Stream.Error "unknown token when expecting an expression.")

Now that basic expressions are handled, we need to handle binary expressions. They are a bit more complex.

2.5. Binary Expression Parsing

Binary expressions are significantly harder to parse because they are often ambiguous. For example, when given the string “x+y*z”, the parser can choose to parse it as either “(x+y)*z” or “x+(y*z)”. With common definitions from mathematics, we expect the later parse, because “*” (multiplication) has higher precedence than “+” (addition).

There are many ways to handle this, but an elegant and efficient way is to use Operator-Precedence Parsing. This parsing technique uses the precedence of binary operators to guide recursion. To start with, we need a table of precedences:

(* binop_precedence - This holds the precedence for each binary operator that is
 * defined *)
let binop_precedence:(char, int) Hashtbl.t = Hashtbl.create 10

(* precedence - Get the precedence of the pending binary operator token. *)
let precedence c = try Hashtbl.find binop_precedence c with Not_found -> -1

...

let main () =
  (* Install standard binary operators.
   * 1 is the lowest precedence. *)
  Hashtbl.add Parser.binop_precedence '<' 10;
  Hashtbl.add Parser.binop_precedence '+' 20;
  Hashtbl.add Parser.binop_precedence '-' 20;
  Hashtbl.add Parser.binop_precedence '*' 40;    (* highest. *)
  ...

For the basic form of Kaleidoscope, we will only support 4 binary operators (this can obviously be extended by you, our brave and intrepid reader). The Parser.precedence function returns the precedence for the current token, or -1 if the token is not a binary operator. Having a Hashtbl.t makes it easy to add new operators and makes it clear that the algorithm doesn’t depend on the specific operators involved, but it would be easy enough to eliminate the Hashtbl.t and do the comparisons in the Parser.precedence function. (Or just use a fixed-size array).

With the helper above defined, we can now start parsing binary expressions. The basic idea of operator precedence parsing is to break down an expression with potentially ambiguous binary operators into pieces. Consider ,for example, the expression “a+b+(c+d)*e*f+g”. Operator precedence parsing considers this as a stream of primary expressions separated by binary operators. As such, it will first parse the leading primary expression “a”, then it will see the pairs [+, b] [+, (c+d)] [*, e] [*, f] and [+, g]. Note that because parentheses are primary expressions, the binary expression parser doesn’t need to worry about nested subexpressions like (c+d) at all.

To start, an expression is a primary expression potentially followed by a sequence of [binop,primaryexpr] pairs:

(* expression
 *   ::= primary binoprhs *)
and parse_expr = parser
  | [< lhs=parse_primary; stream >] -> parse_bin_rhs 0 lhs stream

Parser.parse_bin_rhs is the function that parses the sequence of pairs for us. It takes a precedence and a pointer to an expression for the part that has been parsed so far. Note that “x” is a perfectly valid expression: As such, “binoprhs” is allowed to be empty, in which case it returns the expression that is passed into it. In our example above, the code passes the expression for “a” into Parser.parse_bin_rhs and the current token is “+”.

The precedence value passed into Parser.parse_bin_rhs indicates the minimal operator precedence that the function is allowed to eat. For example, if the current pair stream is [+, x] and Parser.parse_bin_rhs is passed in a precedence of 40, it will not consume any tokens (because the precedence of ‘+’ is only 20). With this in mind, Parser.parse_bin_rhs starts with:

(* binoprhs
 *   ::= ('+' primary)* *)
and parse_bin_rhs expr_prec lhs stream =
  match Stream.peek stream with
  (* If this is a binop, find its precedence. *)
  | Some (Token.Kwd c) when Hashtbl.mem binop_precedence c ->
      let token_prec = precedence c in

      (* If this is a binop that binds at least as tightly as the current binop,
       * consume it, otherwise we are done. *)
      if token_prec < expr_prec then lhs else begin

This code gets the precedence of the current token and checks to see if if is too low. Because we defined invalid tokens to have a precedence of -1, this check implicitly knows that the pair-stream ends when the token stream runs out of binary operators. If this check succeeds, we know that the token is a binary operator and that it will be included in this expression:

(* Eat the binop. *)
Stream.junk stream;

(* Parse the primary expression after the binary operator *)
let rhs = parse_primary stream in

(* Okay, we know this is a binop. *)
let rhs =
  match Stream.peek stream with
  | Some (Token.Kwd c2) ->

As such, this code eats (and remembers) the binary operator and then parses the primary expression that follows. This builds up the whole pair, the first of which is [+, b] for the running example.

Now that we parsed the left-hand side of an expression and one pair of the RHS sequence, we have to decide which way the expression associates. In particular, we could have “(a+b) binop unparsed” or “a + (b binop unparsed)”. To determine this, we look ahead at “binop” to determine its precedence and compare it to BinOp’s precedence (which is ‘+’ in this case):

(* If BinOp binds less tightly with rhs than the operator after
 * rhs, let the pending operator take rhs as its lhs. *)
let next_prec = precedence c2 in
if token_prec < next_prec

If the precedence of the binop to the right of “RHS” is lower or equal to the precedence of our current operator, then we know that the parentheses associate as “(a+b) binop ...”. In our example, the current operator is “+” and the next operator is “+”, we know that they have the same precedence. In this case we’ll create the AST node for “a+b”, and then continue parsing:

    ... if body omitted ...
  in

  (* Merge lhs/rhs. *)
  let lhs = Ast.Binary (c, lhs, rhs) in
  parse_bin_rhs expr_prec lhs stream
end

In our example above, this will turn “a+b+” into “(a+b)” and execute the next iteration of the loop, with “+” as the current token. The code above will eat, remember, and parse “(c+d)” as the primary expression, which makes the current pair equal to [+, (c+d)]. It will then evaluate the ‘if’ conditional above with “*” as the binop to the right of the primary. In this case, the precedence of “*” is higher than the precedence of “+” so the if condition will be entered.

The critical question left here is “how can the if condition parse the right hand side in full”? In particular, to build the AST correctly for our example, it needs to get all of “(c+d)*e*f” as the RHS expression variable. The code to do this is surprisingly simple (code from the above two blocks duplicated for context):

    match Stream.peek stream with
    | Some (Token.Kwd c2) ->
        (* If BinOp binds less tightly with rhs than the operator after
         * rhs, let the pending operator take rhs as its lhs. *)
        if token_prec < precedence c2
        then parse_bin_rhs (token_prec + 1) rhs stream
        else rhs
    | _ -> rhs
  in

  (* Merge lhs/rhs. *)
  let lhs = Ast.Binary (c, lhs, rhs) in
  parse_bin_rhs expr_prec lhs stream
end

At this point, we know that the binary operator to the RHS of our primary has higher precedence than the binop we are currently parsing. As such, we know that any sequence of pairs whose operators are all higher precedence than “+” should be parsed together and returned as “RHS”. To do this, we recursively invoke the Parser.parse_bin_rhs function specifying “token_prec+1” as the minimum precedence required for it to continue. In our example above, this will cause it to return the AST node for “(c+d)*e*f” as RHS, which is then set as the RHS of the ‘+’ expression.

Finally, on the next iteration of the while loop, the “+g” piece is parsed and added to the AST. With this little bit of code (14 non-trivial lines), we correctly handle fully general binary expression parsing in a very elegant way. This was a whirlwind tour of this code, and it is somewhat subtle. I recommend running through it with a few tough examples to see how it works.

This wraps up handling of expressions. At this point, we can point the parser at an arbitrary token stream and build an expression from it, stopping at the first token that is not part of the expression. Next up we need to handle function definitions, etc.

2.6. Parsing the Rest

The next thing missing is handling of function prototypes. In Kaleidoscope, these are used both for ‘extern’ function declarations as well as function body definitions. The code to do this is straight-forward and not very interesting (once you’ve survived expressions):

(* prototype
 *   ::= id '(' id* ')' *)
let parse_prototype =
  let rec parse_args accumulator = parser
    | [< 'Token.Ident id; e=parse_args (id::accumulator) >] -> e
    | [< >] -> accumulator
  in

  parser
  | [< 'Token.Ident id;
       'Token.Kwd '(' ?? "expected '(' in prototype";
       args=parse_args [];
       'Token.Kwd ')' ?? "expected ')' in prototype" >] ->
      (* success. *)
      Ast.Prototype (id, Array.of_list (List.rev args))

  | [< >] ->
      raise (Stream.Error "expected function name in prototype")

Given this, a function definition is very simple, just a prototype plus an expression to implement the body:

(* definition ::= 'def' prototype expression *)
let parse_definition = parser
  | [< 'Token.Def; p=parse_prototype; e=parse_expr >] ->
      Ast.Function (p, e)

In addition, we support ‘extern’ to declare functions like ‘sin’ and ‘cos’ as well as to support forward declaration of user functions. These ‘extern’s are just prototypes with no body:

(*  external ::= 'extern' prototype *)
let parse_extern = parser
  | [< 'Token.Extern; e=parse_prototype >] -> e

Finally, we’ll also let the user type in arbitrary top-level expressions and evaluate them on the fly. We will handle this by defining anonymous nullary (zero argument) functions for them:

(* toplevelexpr ::= expression *)
let parse_toplevel = parser
  | [< e=parse_expr >] ->
      (* Make an anonymous proto. *)
      Ast.Function (Ast.Prototype ("", [||]), e)

Now that we have all the pieces, let’s build a little driver that will let us actually execute this code we’ve built!

2.7. The Driver

The driver for this simply invokes all of the parsing pieces with a top-level dispatch loop. There isn’t much interesting here, so I’ll just include the top-level loop. See below for full code in the “Top-Level Parsing” section.

(* top ::= definition | external | expression | ';' *)
let rec main_loop stream =
  match Stream.peek stream with
  | None -> ()

  (* ignore top-level semicolons. *)
  | Some (Token.Kwd ';') ->
      Stream.junk stream;
      main_loop stream

  | Some token ->
      begin
        try match token with
        | Token.Def ->
            ignore(Parser.parse_definition stream);
            print_endline "parsed a function definition.";
        | Token.Extern ->
            ignore(Parser.parse_extern stream);
            print_endline "parsed an extern.";
        | _ ->
            (* Evaluate a top-level expression into an anonymous function. *)
            ignore(Parser.parse_toplevel stream);
            print_endline "parsed a top-level expr";
        with Stream.Error s ->
          (* Skip token for error recovery. *)
          Stream.junk stream;
          print_endline s;
      end;
      print_string "ready> "; flush stdout;
      main_loop stream

The most interesting part of this is that we ignore top-level semicolons. Why is this, you ask? The basic reason is that if you type “4 + 5” at the command line, the parser doesn’t know whether that is the end of what you will type or not. For example, on the next line you could type “def foo...” in which case 4+5 is the end of a top-level expression. Alternatively you could type “* 6”, which would continue the expression. Having top-level semicolons allows you to type “4+5;”, and the parser will know you are done.

2.8. Conclusions

With just under 300 lines of commented code (240 lines of non-comment, non-blank code), we fully defined our minimal language, including a lexer, parser, and AST builder. With this done, the executable will validate Kaleidoscope code and tell us if it is grammatically invalid. For example, here is a sample interaction:

$ ./toy.byte
ready> def foo(x y) x+foo(y, 4.0);
Parsed a function definition.
ready> def foo(x y) x+y y;
Parsed a function definition.
Parsed a top-level expr
ready> def foo(x y) x+y );
Parsed a function definition.
Error: unknown token when expecting an expression
ready> extern sin(a);
ready> Parsed an extern
ready> ^D
$

There is a lot of room for extension here. You can define new AST nodes, extend the language in many ways, etc. In the next installment, we will describe how to generate LLVM Intermediate Representation (IR) from the AST.

2.9. Full Code Listing

Here is the complete code listing for this and the previous chapter. Note that it is fully self-contained: you don’t need LLVM or any external libraries at all for this. (Besides the ocaml standard libraries, of course.) To build this, just compile with:

# Compile
ocamlbuild toy.byte
# Run
./toy.byte

Here is the code:

_tags:
<{lexer,parser}.ml>: use_camlp4, pp(camlp4of)
token.ml:
(*===----------------------------------------------------------------------===
 * Lexer Tokens
 *===----------------------------------------------------------------------===*)

(* The lexer returns these 'Kwd' if it is an unknown character, otherwise one of
 * these others for known things. *)
type token =
  (* commands *)
  | Def | Extern

  (* primary *)
  | Ident of string | Number of float

  (* unknown *)
  | Kwd of char
lexer.ml:
(*===----------------------------------------------------------------------===
 * Lexer
 *===----------------------------------------------------------------------===*)

let rec lex = parser
  (* Skip any whitespace. *)
  | [< ' (' ' | '\n' | '\r' | '\t'); stream >] -> lex stream

  (* identifier: [a-zA-Z][a-zA-Z0-9] *)
  | [< ' ('A' .. 'Z' | 'a' .. 'z' as c); stream >] ->
      let buffer = Buffer.create 1 in
      Buffer.add_char buffer c;
      lex_ident buffer stream

  (* number: [0-9.]+ *)
  | [< ' ('0' .. '9' as c); stream >] ->
      let buffer = Buffer.create 1 in
      Buffer.add_char buffer c;
      lex_number buffer stream

  (* Comment until end of line. *)
  | [< ' ('#'); stream >] ->
      lex_comment stream

  (* Otherwise, just return the character as its ascii value. *)
  | [< 'c; stream >] ->
      [< 'Token.Kwd c; lex stream >]

  (* end of stream. *)
  | [< >] -> [< >]

and lex_number buffer = parser
  | [< ' ('0' .. '9' | '.' as c); stream >] ->
      Buffer.add_char buffer c;
      lex_number buffer stream
  | [< stream=lex >] ->
      [< 'Token.Number (float_of_string (Buffer.contents buffer)); stream >]

and lex_ident buffer = parser
  | [< ' ('A' .. 'Z' | 'a' .. 'z' | '0' .. '9' as c); stream >] ->
      Buffer.add_char buffer c;
      lex_ident buffer stream
  | [< stream=lex >] ->
      match Buffer.contents buffer with
      | "def" -> [< 'Token.Def; stream >]
      | "extern" -> [< 'Token.Extern; stream >]
      | id -> [< 'Token.Ident id; stream >]

and lex_comment = parser
  | [< ' ('\n'); stream=lex >] -> stream
  | [< 'c; e=lex_comment >] -> e
  | [< >] -> [< >]
ast.ml:
(*===----------------------------------------------------------------------===
 * Abstract Syntax Tree (aka Parse Tree)
 *===----------------------------------------------------------------------===*)

(* expr - Base type for all expression nodes. *)
type expr =
  (* variant for numeric literals like "1.0". *)
  | Number of float

  (* variant for referencing a variable, like "a". *)
  | Variable of string

  (* variant for a binary operator. *)
  | Binary of char * expr * expr

  (* variant for function calls. *)
  | Call of string * expr array

(* proto - This type represents the "prototype" for a function, which captures
 * its name, and its argument names (thus implicitly the number of arguments the
 * function takes). *)
type proto = Prototype of string * string array

(* func - This type represents a function definition itself. *)
type func = Function of proto * expr
parser.ml:
(*===---------------------------------------------------------------------===
 * Parser
 *===---------------------------------------------------------------------===*)

(* binop_precedence - This holds the precedence for each binary operator that is
 * defined *)
let binop_precedence:(char, int) Hashtbl.t = Hashtbl.create 10

(* precedence - Get the precedence of the pending binary operator token. *)
let precedence c = try Hashtbl.find binop_precedence c with Not_found -> -1

(* primary
 *   ::= identifier
 *   ::= numberexpr
 *   ::= parenexpr *)
let rec parse_primary = parser
  (* numberexpr ::= number *)
  | [< 'Token.Number n >] -> Ast.Number n

  (* parenexpr ::= '(' expression ')' *)
  | [< 'Token.Kwd '('; e=parse_expr; 'Token.Kwd ')' ?? "expected ')'" >] -> e

  (* identifierexpr
   *   ::= identifier
   *   ::= identifier '(' argumentexpr ')' *)
  | [< 'Token.Ident id; stream >] ->
      let rec parse_args accumulator = parser
        | [< e=parse_expr; stream >] ->
            begin parser
              | [< 'Token.Kwd ','; e=parse_args (e :: accumulator) >] -> e
              | [< >] -> e :: accumulator
            end stream
        | [< >] -> accumulator
      in
      let rec parse_ident id = parser
        (* Call. *)
        | [< 'Token.Kwd '(';
             args=parse_args [];
             'Token.Kwd ')' ?? "expected ')'">] ->
            Ast.Call (id, Array.of_list (List.rev args))

        (* Simple variable ref. *)
        | [< >] -> Ast.Variable id
      in
      parse_ident id stream

  | [< >] -> raise (Stream.Error "unknown token when expecting an expression.")

(* binoprhs
 *   ::= ('+' primary)* *)
and parse_bin_rhs expr_prec lhs stream =
  match Stream.peek stream with
  (* If this is a binop, find its precedence. *)
  | Some (Token.Kwd c) when Hashtbl.mem binop_precedence c ->
      let token_prec = precedence c in

      (* If this is a binop that binds at least as tightly as the current binop,
       * consume it, otherwise we are done. *)
      if token_prec < expr_prec then lhs else begin
        (* Eat the binop. *)
        Stream.junk stream;

        (* Parse the primary expression after the binary operator. *)
        let rhs = parse_primary stream in

        (* Okay, we know this is a binop. *)
        let rhs =
          match Stream.peek stream with
          | Some (Token.Kwd c2) ->
              (* If BinOp binds less tightly with rhs than the operator after
               * rhs, let the pending operator take rhs as its lhs. *)
              let next_prec = precedence c2 in
              if token_prec < next_prec
              then parse_bin_rhs (token_prec + 1) rhs stream
              else rhs
          | _ -> rhs
        in

        (* Merge lhs/rhs. *)
        let lhs = Ast.Binary (c, lhs, rhs) in
        parse_bin_rhs expr_prec lhs stream
      end
  | _ -> lhs

(* expression
 *   ::= primary binoprhs *)
and parse_expr = parser
  | [< lhs=parse_primary; stream >] -> parse_bin_rhs 0 lhs stream

(* prototype
 *   ::= id '(' id* ')' *)
let parse_prototype =
  let rec parse_args accumulator = parser
    | [< 'Token.Ident id; e=parse_args (id::accumulator) >] -> e
    | [< >] -> accumulator
  in

  parser
  | [< 'Token.Ident id;
       'Token.Kwd '(' ?? "expected '(' in prototype";
       args=parse_args [];
       'Token.Kwd ')' ?? "expected ')' in prototype" >] ->
      (* success. *)
      Ast.Prototype (id, Array.of_list (List.rev args))

  | [< >] ->
      raise (Stream.Error "expected function name in prototype")

(* definition ::= 'def' prototype expression *)
let parse_definition = parser
  | [< 'Token.Def; p=parse_prototype; e=parse_expr >] ->
      Ast.Function (p, e)

(* toplevelexpr ::= expression *)
let parse_toplevel = parser
  | [< e=parse_expr >] ->
      (* Make an anonymous proto. *)
      Ast.Function (Ast.Prototype ("", [||]), e)

(*  external ::= 'extern' prototype *)
let parse_extern = parser
  | [< 'Token.Extern; e=parse_prototype >] -> e
toplevel.ml:
(*===----------------------------------------------------------------------===
 * Top-Level parsing and JIT Driver
 *===----------------------------------------------------------------------===*)

(* top ::= definition | external | expression | ';' *)
let rec main_loop stream =
  match Stream.peek stream with
  | None -> ()

  (* ignore top-level semicolons. *)
  | Some (Token.Kwd ';') ->
      Stream.junk stream;
      main_loop stream

  | Some token ->
      begin
        try match token with
        | Token.Def ->
            ignore(Parser.parse_definition stream);
            print_endline "parsed a function definition.";
        | Token.Extern ->
            ignore(Parser.parse_extern stream);
            print_endline "parsed an extern.";
        | _ ->
            (* Evaluate a top-level expression into an anonymous function. *)
            ignore(Parser.parse_toplevel stream);
            print_endline "parsed a top-level expr";
        with Stream.Error s ->
          (* Skip token for error recovery. *)
          Stream.junk stream;
          print_endline s;
      end;
      print_string "ready> "; flush stdout;
      main_loop stream
toy.ml:
(*===----------------------------------------------------------------------===
 * Main driver code.
 *===----------------------------------------------------------------------===*)

let main () =
  (* Install standard binary operators.
   * 1 is the lowest precedence. *)
  Hashtbl.add Parser.binop_precedence '<' 10;
  Hashtbl.add Parser.binop_precedence '+' 20;
  Hashtbl.add Parser.binop_precedence '-' 20;
  Hashtbl.add Parser.binop_precedence '*' 40;    (* highest. *)

  (* Prime the first token. *)
  print_string "ready> "; flush stdout;
  let stream = Lexer.lex (Stream.of_channel stdin) in

  (* Run the main "interpreter loop" now. *)
  Toplevel.main_loop stream;
;;

main ()

Next: Implementing Code Generation to LLVM IR