TL-formal

See also TL Language. For the syntax of declaring combinators, see in article Formal declaration of TL combinators. For the syntax of patterns, see in article Formal declaration of TL patterns.

Tokens

Comments are the same as in C/C++. They are removed by a lexical parser (for example, being replaced by a single space). Whitespace separates tokens. Except for string constants, tokens cannot contain spaces.

Character classes:

lc-letter ::= a | b | ... | z
uc-letter ::= A | B | ... | Z
digit ::= 0 | 1 | ... | 9
hex-digit ::= digit | a | b | c | d | e | f
underscore ::= _
letter ::= lc-letter | uc-letter
ident-char ::= letter | digit | underscore

Simple identifiers and keywords:

lc-ident ::= lc-letter { ident-char }
uc-ident ::= uc-letter { ident-char }
namespace-ident ::= lc-ident
lc-ident-ns ::= [ namespace-ident . ] lc-ident
uc-ident-ns ::= [ namespace-ident . ] uc-ident
lc-ident-full ::= lc-ident-ns [ # hex-digit *8 ]

Tokens:

underscore ::= _
colon ::= :
semicolon ::= ;
open-par ::= (
close-par ::= )
open-bracket ::= [
close-bracket ::= ]
open-brace ::= {
close-brace ::= }
triple-minus ::= ---
nat-const ::= digit { digit }
lc-ident-full
lc-ident
uc-ident-ns
equals ::= =
hash ::= #
question-mark ::= ?
percent ::= %
plus ::= +
langle ::= <
rangle ::= >
comma ::= ,
dot ::= .
asterisk ::= *
excl-mark ::= !
Final-kw ::= Final
New-kw ::= New
Empty-kw ::= Empty

Final is a reserved keyword, e.g. a special token. Words like Type are not keywords, rather they are identifiers with preset values.

Tokens consisting of one or more constant symbols shall be hereafter denoted using terms in quotation marks (for example, --- replaces triple-minus).

Syntax

General syntax of a TL program

Syntactically, a TL program consists of a stream of tokens (separated by spaces, which are ignored at this stage). General program structure:

TL-program ::= constr-declarations { --- functions --- fun-declarations | --- types --- constr-declarations }

Here the constructor- and function declarations are nearly identical in their syntax (they are both combinators):

constr-declarations ::= { declaration }
fun-declarations ::= { declaration }

There are various declarations:

declaration ::= combinator-decl | partial-app-decl | final-decl

Before explaining how declarations of combinators, partial applications, and type finalization are given, we will introduce additional syntactical categories:

Syntactical categories and constructions

The concept of an expression (expr) is important. There are type expressions (type-expr) and numeric expressions (nat-expr). However, they are defined the same way. Their correctness as type- or numeric expressions is checked when the type of the analyzed expression is checked.

type-expr ::= expr
nat-expr ::= expr
expr ::= { subexpr }
subexpr ::= term | nat-const + subexpr | subexpr + nat-const
term ::= ( expr ) | type-ident | var-ident | nat-const | % term | type-ident < expr { , expr } >
type-ident ::= boxed-type-ident | lc-ident-ns | #
boxed-type-ident ::= uc-ident-ns
var-ident ::= lc-ident | uc-ident
type-term ::= term
nat-term ::= term

Note that writing E = E_1 E_2 ... E_n in the expression for expr means applying the function E_1 to the argument E_2, applying the result to E_3, etc. Specifically, E_1 E_2 E_3 = (E_1 E_2) E_3. A solitary # is included in type-ident, because it is actually the identifier for a built-in type (# alias nat).

The expression E<E_1,...,E_n> is syntactic sugar for (E (E_1) ... (E_n)), i.e. both expressions are transformed into the same internal representation.

Combinator declarations

combinator-decl ::= full-combinator-id { opt-args } { args } = result-type ;
full-combinator-id ::= lc-ident-full | _
combinator-id ::= lc-ident-ns | _
opt-args ::= { var-ident { var-ident } : [excl-mark] type-expr }
args ::= var-ident-opt : [ conditional-def ] [ ! ] type-term
args ::= [ var-ident-opt : ] [ multiplicity *] [ { args } ]
args ::= ( var-ident-opt { var-ident-opt } : [!] type-term )
args ::= [ ! ] type-term
multiplicity ::= nat-term
var-ident-opt ::= var-ident | _
conditional-def ::= var-ident [ . nat-const ] ?
result-type ::= boxed-type-ident { subexpr }
result-type ::= boxed-type-ident < subexpr { , subexpr } >

See Formal declaration of TL combinators for a description of what exactly this means. Here we will only note that when declaring the type of a combinator’s next argument, only the names of previously arranged (more to the left) arguments of the same combinator may be used as variables, but when declaring the result type you can use all of its parameters (of type Type and #).

Note that the names of combinators declared in this way may be used in TL itself only as the corresponding bare types. The only combinators that appear in declarations are built-in: O : # and S : # -> #.

There are also “pseudo-declarations” that are allowed only to declare built-in types (such as int ? = Int;):

builtin-combinator-decl ::= full-combinator-id ? = boxed-type-ident ;

Partial applications (patterns)

partial-app-decl ::= partial-type-app-decl | partial-comb-app-decl
partial-type-app-decl ::= boxed-type-ident subexpr { subexpr } ; | boxed-type-ident < expr { , expr } > ;
partial-comb-app-decl ::= combinator-id subexpr { subexpr } ;

See Formal declaration of TL patterns.

Type finalization

final-decl ::= New boxed-type-ident ; | Final boxed-type-ident ; | Empty boxed-type-ident ;

This type of declaration means that there must not be any constructor for the indicated type: before the declaration for New and after the declaration for Final. The keyword Empty enables both effects.

Predefined identifiers

Nearly all predefined identifiers may be given using the following schema (usually located in common.tl):

/////
//
// Common Types
//
/////

// Built-in types
int ? = Int;
long ? = Long;
double ? = Double;
string ? = String;

// Boolean emulation
boolFalse = Bool;
boolTrue = Bool;

// Boolean for diagonal queries
boolStat statTrue:int statFalse:int statUnknown:int = BoolStat;

// Vector
vector {t:Type} # [t] = Vector t;
tuple {t:Type} {n:#} [t] = Tuple t n;
vectorTotal {t:Type} total_count:int vector:%(Vector t) = VectorTotal t;

/////
//
// Result- (Maybe-) types
//
/////

resultFalse {t:Type} = Maybe t;
resultTrue {t:Type} result:t = Maybe t;

pair {X:Type} {Y:Type} a:X b:Y = Pair X Y;
map {X:Type} {Y:Type} key:X value:Y = Map X Y;

Empty False;
true = True;

unit = Unit;

  • Predefined identifier Type: This type signifies the type of all types. It is usually used to specify the types of optional parameters in the constructors of polymorphic types. If strongly desired, it can be used in its own right, but this is very rarely needed in practice.

  • Identifier #: This type is used to specify a special type of nonnegative integers in the range from 0 to 2^31-1; its main purpose is the same as that of Type. There are two built-in constructors: O : # and S : # -> # (“null” and “next number”, respectively), which work as if # was defined using the schema

O = #;
S # = #;

  • Identifier Tuple: Type -> # -> Type denotes a set of the specified number of values of the indicated type. In other words, Tuple X n means “a set of n values of type X".

  • The typeBool, with two constructors boolTrue and boolFalse, is used to transmit Boolean values.

  • The constructor-less type False may be used instead of undeclared or invalid types in the construction of a TL schema, because any attempt to (de)serialize a value of type False will produce an error. Usage Example:

user {flags:#} id:flags.0?string first_name:flags.1?string last_name:flags.2?string reserved3:flags.3?False reserved4:flags.4?False = User flags;
user_present {flags:#} info:%(User flags) = UserInfo flags;
user_absent {flags:#} = UserInfo flags;
getUser flags:# id:int = !UserInfo flags;

In the future, bits 3 and 4 in the flags field may be used to transmit new fields after changing the names and types of the reserved3 and reserved4 fields. This will change the user constructor’s number, but this isn’t too important, since the User flags type is only used as a bare type. Transmitting bits 3 or 4 in the flags field in a getUser query before these fields have actually been defined will lead to an error in the (de)serialization of the request.

  • The type True with a single null constructor true plays a role similar to the void type in C/C++. It is especially useful as a bare type %True, alias true, because its serialization has zero length. For example, the first_name:flags.1?string constructor used above is in fact shorthand for (the as-yet unsupported) alternative-type general constructor first_name:(flags.1?string:true).

When directly used in a conditional field it may simply indicate the presence (absence) of a certain parameter with void type. If the conditional field exists, the associated parameter will not be populated; the conditional field simply exists and the existance value can be used to perform certain operations, example:

user {flags:#} id:flags.0?string first_name:flags.1?string last_name:flags.2?string bot:flags.3?true reserved4:flags.4?False = User flags;

If bit 3 of the flags parameter isn't set, the user is a normal user. If bit 3 of the flags parameter is set, this indicates that the specified user is a bot: however, during deserialization, the bot parameter must not be assigned any value, since true is actually a void type.

  • The typeUnit with a single null constructor Unit is similar to the previous type.

ANTLR definition

An ANLTR definition of TL grammar can be found here ».