Michelson: the language of Smart Contracts in Tezos =================================================== The language is stack based, with high level data types and primitives and strict static type checking. Its design cherry picks traits from several language families. Vigilant readers will notice direct references to Forth, Scheme, ML and Cat. A Michelson program is a series of instructions that are run in sequence: each instruction receives as input the stack resulting of the previous instruction, and rewrites it for the next one. The stack contains both immediate values and heap allocated structures. All values are immutable and garbage collected. A Michelson program receives as input a single element stack containing an input value and the contents of a storage space. It must return a single element stack containing an output value and the new contents of the storage space. Alternatively, a Michelson program can fail, explicitly using a specific opcode, or because something went wrong that could not be caught by the type system (e.g. division by zero, gas exhaustion). The types of the input, output and storage are fixed and monomorphic, and the program is typechecked before being introduced into the system. No smart contract execution can fail because an instruction has been executed on a stack of unexpected length or contents. This specification gives the complete instruction set, type system and semantics of the language. It is meant as a precise reference manual, not an easy introduction. Even though, some examples are provided at the end of the document and can be read first or at the same time as the specification. Table of contents ----------------- * I - Semantics * II - Type system * III - Core data types * IV - Core instructions * V - Operations * VI - Domain specific data types * VII - Domain specific operations * VIII - Macros * IX - Concrete syntax * X - JSON syntax * XI - Examples * XII - Full grammar * XIII - Reference implementation I - Semantics ------------- This specification gives a detailed formal semantics of the Michelson language. It explains in a symbolic way the computation performed by the Michelson interpreter on a given program and initial stack to produce the corresponding resulting stack. The Michelson interpreter is a pure function: it only builds a result stack from the elements of an initial one, without affecting its environment. This semantics is then naturally given in what is called a big step form: a symbolic definition of a recursive reference interpreter. This definition takes the form of a list of rules that cover all the possible inputs of the interpreter (program and stack), and describe the computation of the corresponding resulting stacks. ### Rules form and selection The rules have the main following form. > (syntax pattern) / (initial stack pattern) => (result stack pattern) iff (conditions) where (recursions) The left hand side of the `=>` sign is used for selecting the rule. Given a program and an initial stack, one (and only one) rule can be selected using the following process. First, the toplevel structure of the program must match the syntax pattern. This is quite simple since there is only a few non trivial patterns to deal with instruction sequences, and the rest is made of trivial pattern that match one specific instruction. Then, the initial stack must match the initial stack pattern. Finally, some rules add extra conditions over the values in the stack that follow the `iff` keyword. Sometimes, several rules may apply in a given context. In this case, the one that appears first in this specification is to be selected. If no rule applies, the result is equivalent to the one for the explicit `FAIL` instruction. This case does not happen on well-typed programs, as explained in the next section. The right hand side describes the result of the interpreter if the rule applies. It consists in a stack pattern, whose part are either constants, or elements of the context (program and initial stack) that have been named on the left hand side of the `=>` sign. ### Recursive rules (big step form) Sometimes, the result of interpreting a program is derived from the result of interpreting another one (as in conditionals or function calls). In these cases, the rule contains a clause of the following form. where (intermediate program) / (intermediate stack) => (partial result) This means that this rules applies in case interpreting the intermediate state on the left gives the pattern on the right. The left hand sign of the `=>` sign is constructed from elements of the initial state or other partial results, and the right hand side identify parts that can be used to build the result stack of the rule. If the partial result pattern does not actually match the result of the interpretation, then the result of the whole rule is equivalent to the one for the explicit `FAIL` instruction. Again, this case does not happen on well-typed programs, as explained in the next section. ### Format of patterns Code patterns are of one of the following syntactical forms. * `INSTR` (an uppercase identifier) is a simple instruction (e.g. `DROP`); * `INSTR (arg) ...` is a compound instruction, whose arguments can be code, data or type patterns (e.g. `PUSH nat 3`) ; * `{ (instr) ; ... }` is a possibly empty sequence of instructions, (e.g. `IF { SWAP ; DROP } { DROP }`), nested sequences can drop the braces ; * `name` is a pattern that matches any program and names a part of the matched program that can be used to build the result ; * `_` is a pattern that matches any instruction. Stack patterns are of one of the following syntactical forms. * `[FAIL]` is the special failed state ; * `[]` is the empty stack ; * `(top) : (rest)` is a stack whose top element is matched by the data pattern `(top)` on the left, and whose remaining elements are matched by the stack pattern `(rest)` on the right (e.g. `x : y : rest`) ; * `name` is a pattern that matches any stack and names it in order to use it to build the result ; * `_` is a pattern that matches any stack. Data patterns are of one of the following syntactical forms. * integer/natural number literals, (e.g. `3`) ; * string literals, (e.g. `"contents"`) ; * `Tag` (capitalized) is a symbolic constant, (e.g. `Unit`, `True`, `False`) ; * `(Tag (arg) ...)` tagged constructed data, (e.g. `(Pair 3 4)`) ; * a code pattern for first class code values ; * `name` to name a value in order to use it to build the result ; * `_` to match any value. The domain of instruction names, symbolic constants and data constructors is fixed by this specification. Michelson does not let the programmer introduce its own types. Be aware that the syntax used in the specification may differ a bit from the concrete syntax, which is presented in Section IX. In particular, some instructions are annotated with types that are not present in the concrete language because they are synthesized by the typechecker. ### Shortcuts Sometimes, it is easier to think (and shorter to write) in terms of program rewriting than in terms of big step semantics. When it is the case, and when both are equivalents, we write rules of the form: p / S => S'' where p' / S' => S'' using the following shortcut: p / S => p' / S' The concrete language also has some syntax sugar to group some common sequences of operations as one. This is described in this specification using a simple regular expression style recursive instruction rewriting. II - Introduction to the type system and notations -------------------------------------------------- This specification describes a type system for Michelson. To make things clear, in particular to readers that are not accustomed to reading formal programming language specifications, it does not give a typechecking or inference algorithm. It only gives an intentional definition of what we consider to be well-typed programs. For each syntactical form, it describes the stacks that are considered well-typed inputs, and the resulting outputs. The type system is sound, meaning that if a program can be given a type, then if run on a well-typed input stack, the interpreter will never apply an interpretation rule on a stack of unexpected length or contents. Also, it will never reach a state where it cannot select an appropriate rule to continue the execution. Well-typed programs do not block, and do not go wrong. ### Type notations The specification introduces notations for the types of values, terms and stacks. Apart from a subset of value types that appear in the form of type annotations in some places throughout the language, it is important to understand that this type language only exists in the specification. A stack type can be written: * `[]` for the empty stack ; * `(top) : (rest)` for the stack whose first value has type `(top)` and queue has stack type `(rest)`. Instructions, programs and primitives of the language are also typed, their types are written: (type of stack before) -> (type of stack after) The types of values in the stack are written: * `identifier` for a primitive data-type (e.g. `bool`), * `identifier (arg)` for a parametric data-type with one parameter type `(arg)` (e.g. `list nat`), * `identifier (arg) ...` for a parametric data-type with several parameters (e.g. `map string int`), * `[ (type of stack before) -> (type of stack after) ]` for a code quotation, (e.g. `[ int : int : [] -> int : [] ]`), * `lambda (arg) (ret)` is a shortcut for `[ (arg) : [] -> (ret) : [] ]`. ### Meta type variables The typing rules introduce meta type variables. To be clear, this has nothing to do with polymorphism, which Michelson does not have. These variables only live at the specification level, and are used to express the consistency between the parts of the program. For instance, the typing rule for the `IF` construct introduces meta variables to express that both branches must have the same type. Here are the notations for meta type variables: * `'a` for a type variable, * `'A` for a stack type variable, * `_` for an anonymous type or stack type variable. ### Typing rules The system is syntax directed, which means here that it defines a single typing rule for each syntax construct. A typing rule restricts the type of input stacks that are authorized for this syntax construct, links the output type to the input type, and links both of them to the subexpressions when needed, using meta type variables. Typing rules are of the form: (syntax pattern) :: (type of stack before) -> (type of stack after) [rule-name] iff (premises) Where premises are typing requirements over subprograms or values in the stack, both of the form `(x) :: (type)`, meaning that value `(x)` must have type `(type)`. A program is shown well-typed if one can find an instance of a rule that applies to the toplevel program expression, with all meta type variables replaced by non variable type expressions, and of which all type requirements in the premises can be proven well-typed in the same manner. For the reader unfamiliar with formal type systems, this is called building a typing derivation. Here is an example typing derivation on a small program that computes `(x+5)*10` for a given input `x`, obtained by instantiating the typing rules for instructions `PUSH`, `ADD` and for the sequence, as found in the next sections. When instantiating, we replace the `iff` with `by`. { PUSH nat 5 ; ADD ; PUSH nat 10 ; SWAP ; MUL } :: [ nat : [] -> nat : [] ] by { PUSH nat 5 ; ADD } :: [ nat : [] -> nat : [] ] by PUSH nat 5 :: [ nat : [] -> nat : nat : [] ] by 5 :: nat and ADD :: [ nat : nat : [] -> nat : [] ] and { PUSH nat 10 ; SWAP ; MUL } :: [ nat : [] -> nat : [] ] by PUSH nat 10 :: [ nat : [] -> nat : nat : [] ] by 10 :: nat and { SWAP ; MUL } :: [ nat : nat : [] -> nat : [] ] by SWAP :: [ nat : nat : [] -> nat : nat : [] ] and MUL :: [ nat : nat : [] -> nat : [] ] Producing such a typing derivation can be done in a number of manners, such as unification or abstract interpretation. In the implementation of Michelson, this is done by performing a recursive symbolic evaluation of the program on an abstract stack representing the input type provided by the programmer, and checking that the resulting symbolic stack is consistent with the expected result, also provided by the programmer. ### Annotations Most Instructions in the language can optionally take an annotation. Annotations allow you to better track data, on the stack and within pairs and unions. If added on the components of a type, the annotation will be propagated by the typechecker througout access instructions. Annotating an instruction that produces a value on the stack will rewrite the annotation an the toplevel of its type. Trying to annotate an instruction that does not produce a value will result in a typechecking error. At join points in the program (`IF`, `IF_LEFT`, `IF_CONS`, `IF_NONE`, `LOOP`), annotations must be compatible. Annotations are compatible if both elements are annotated with the same annotation or if at least one of the values/types is unannotated. Stack visualization tools like the Michelson's Emacs mode print annotations associated with each type in the program, as propagated by the typechecker. This is useful as a debugging aid. ### Side note As with most type systems, it is incomplete. There are programs that cannot be given a type in this type system, yet that would not go wrong if executed. This is a necessary compromise to make the type system usable. Also, it is important to remember that the implementation of Michelson does not accept as many programs as the type system describes as well-typed. This is because the implementation uses a simple single pass typechecking algorithm, and does not handle any form of polymorphism. III - Core data types and notations ----------------------------------- * `string`, `nat`, `int`: The core primitive constant types. * `bool`: The type for booleans whose values are `True` and `False` * `unit`: The type whose only value is `Unit`, to use as a placeholder when some result or parameter is non necessary. For instance, when the only goal of a contract is to update its storage. * `list (t)`: A single, immutable, homogeneous linked list, whose elements are of type `(t)`, and that we note `{}` for the empty list or `{ first ; ... }`. In the semantics, we use chevrons to denote a subsequence of elements. For instance `{ head ; }`. * `pair (l) (r)`: A pair of values `a` and `b` of types `(l)` and `(r)`, that we write `(Pair a b)`. * `option (t)`: Optional value of type `(t)` that we note `None` or `(Some v)`. * `or (l) (r)`: A union of two types: a value holding either a value `a` of type `(l)` or a value `b` of type `(r)`, that we write `(Left a)` or `(Right b)`. * `set (t)`: Immutable sets of values of type `(t)` that we note as lists `{ item ; ... }`, of course with their elements unique, and sorted. * `map (k) (t)`: Immutable maps from keys of type `(k)` of values of type `(t)` that we note `{ Elt key value ; ... }`, with keys sorted. IV - Core instructions ---------------------- ### Control structures * `FAIL`: Explicitly abort the current program. :: _ -> _ This special instruction is callable in any context, since it does not use its input stack (first rule below), and makes the output useless since all subsequent instruction will simply ignore their usual semantics to propagate the failure up to the main result (second rule below). Its type is thus completely generic. > FAIL / _ => [FAIL] > _ / [FAIL] => [FAIL] * `{ I ; C }`: Sequence. :: 'A -> 'C iff I :: [ 'A -> 'B ] C :: [ 'B -> 'C ] > I ; C / SA => SC where I / SA => SB and C / SB => SC * `IF bt bf`: Conditional branching. :: bool : 'A -> 'B iff bt :: [ 'A -> 'B ] bf :: [ 'A -> 'B ] > IF bt bf / True : S => bt / S > IF bt bf / False : S => bf / S * `LOOP body`: A generic loop. :: bool : 'A -> 'A iff body :: [ 'A -> bool : 'A ] > LOOP body / True : S => body ; LOOP body / S > LOOP body / False : S => S * `LOOP_LEFT body`: A loop with an accumulator :: (or 'a 'b) : 'A -> 'A iff body :: [ 'a : 'A -> (or 'a 'b) : 'A ] > LOOP body / (Left a) : S => body ; LOOP body / (or 'a 'b) : S > LOOP body / (Right b) : S => b : S * `DIP code`: Runs code protecting the top of the stack. :: 'b : 'A -> 'b : 'C iff code :: [ 'A -> 'C ] > DIP code / x : S => x : S' where code / S => S' * `EXEC`: Execute a function from the stack. :: 'a : lambda 'a 'b : 'C -> 'b : 'C > EXEC / a : f : S => r : S where f / a : [] => r : [] ### Stack operations * `DROP`: Drop the top element of the stack. :: _ : 'A -> 'A > DROP / _ : S => S * `DUP`: Duplicate the top of the stack. :: 'a : 'A -> 'a : 'a : 'A > DUP / x : S => x : x : S * `SWAP`: Exchange the top two elements of the stack. :: 'a : 'b : 'A -> 'b : 'a : 'A > SWAP / x : y : S => y : x : S * `PUSH 'a x`: Push a constant value of a given type onto the stack. :: 'A -> 'a : 'A iff x :: 'a > PUSH 'a x / S => x : S * `UNIT`: Push a unit value onto the stack. :: 'A -> unit : 'A > UNIT / S => Unit : S * `LAMBDA 'a 'b code`: Push a lambda with given parameter and return types onto the stack. :: 'A -> (lambda 'a 'b) : 'A ### Generic comparison Comparison only works on a class of types that we call comparable. A `COMPARE` operation is defined in an ad hoc way for each comparable type, but the result of compare is always an `int`, which can in turn be checked in a generic manner using the following combinators. The result of `COMPARE` is `0` if the top two elements of the stack are equal, negative if the first element in the stack is less than the second, and positive otherwise. * `EQ`: Checks that the top of the stack EQuals zero. :: int : 'S -> bool : 'S > EQ ; C / 0 : S => C / True : S > EQ ; C / _ : S => C / False : S * `NEQ`: Checks that the top of the stack does Not EQual zero. :: int : 'S -> bool : 'S > NEQ ; C / 0 : S => C / False : S > NEQ ; C / _ : S => C / True : S * `LT`: Checks that the top of the stack is Less Than zero. :: int : 'S -> bool : 'S > LT ; C / v : S => C / True : S iff v < 0 > LT ; C / _ : S => C / False : S * `GT`: Checks that the top of the stack is Greater Than zero. :: int : 'S -> bool : 'S > GT ; C / v : S => C / True : S iff v > 0 > GT ; C / _ : S => C / False : S * `LE`: Checks that the top of the stack is Less Than of Equal to zero. :: int : 'S -> bool : 'S > LE ; C / v : S => C / True : S iff v <= 0 > LE ; C / _ : S => C / False : S * `GE`: Checks that the top of the stack is Greater Than of Equal to zero. :: int : 'S -> bool : 'S > GE ; C / v : S => C / True : S iff v >= 0 > GE ; C / _ : S => C / False : S V - Operations -------------- ### Operations on booleans * `OR` :: bool : bool : 'S -> bool : 'S > OR ; C / x : y : S => C / (x | y) : S * `AND` :: bool : bool : 'S -> bool : 'S > AND ; C / x : y : S => C / (x & y) : S * `XOR` :: bool : bool : 'S -> bool : 'S > XOR ; C / x : y : S => C / (x ^ y) : S * `NOT` :: bool : 'S -> bool : 'S > NOT ; C / x : S => C / ~x : S ### Operations on integers and natural numbers Integers and naturals are arbitrary-precision, meaning the only size limit is fuel. * `NEG` :: int : 'S -> int : 'S :: nat : 'S -> int : 'S > NEG ; C / x : S => C / -x : S * `ABS` :: int : 'S -> nat : 'S > ABS ; C / x : S => C / abs (x) : S * `ADD` :: int : int : 'S -> int : 'S :: int : nat : 'S -> int : 'S :: nat : int : 'S -> int : 'S :: nat : nat : 'S -> nat : 'S > ADD ; C / x : y : S => C / (x + y) : S * `SUB` :: int : int : 'S -> int : 'S :: int : nat : 'S -> int : 'S :: nat : int : 'S -> int : 'S :: nat : nat : 'S -> int : 'S > SUB ; C / x : y : S => C / (x - y) : S * `MUL` :: int : int : 'S -> int : 'S :: int : nat : 'S -> int : 'S :: nat : int : 'S -> int : 'S :: nat : nat : 'S -> nat : 'S > MUL ; C / x : y : S => C / (x * y) : S * `EDIV` Perform Euclidian division :: int : int : 'S -> option (pair int nat) : 'S :: int : nat : 'S -> option (pair int nat) : 'S :: nat : int : 'S -> option (pair int nat) : 'S :: nat : nat : 'S -> option (pair nat nat) : 'S > EDIV ; C / x : 0 : S => C / None > EDIV ; C / x : y : S => C / Some (Pair (x / y) (x % y)) : S Bitwise logical operators are also available on unsigned integers. * `OR` :: nat : nat : 'S -> nat : 'S > OR ; C / x : y : S => C / (x | y) : S * `AND` :: nat : nat : 'S -> nat : 'S > AND ; C / x : y : S => C / (x & y) : S * `XOR` :: nat : nat : 'S -> nat : 'S > XOR ; C / x : y : S => C / (x ^ y) : S * `NOT` The return type of `NOT` is an `int` and not a `nat`. This is because the sign is also negated. The resulting integer is computed using two's complement. For instance, the boolean negation of `0` is `-1`. :: nat : 'S -> int : 'S :: int : 'S -> int : 'S > NOT ; C / x : S => C / ~x : S * `LSL` :: nat : nat : 'S -> nat : 'S > LSL ; C / x : s : S => C / (x << s) : S iff s <= 256 > LSL ; C / x : s : S => [FAIL] * `LSR` :: nat : nat : 'S -> nat : 'S > LSR ; C / x : s : S => C / (x >>> s) : S * `COMPARE`: Integer/natural comparison :: int : int : 'S -> int : 'S :: nat : nat : 'S -> int : 'S > COMPARE ; C / x : y : S => C / -1 : S iff x < y > COMPARE ; C / x : y : S => C / 0 : S iff x = y > COMPARE ; C / x : y : S => C / 1 : S iff x > y ### Operations on strings Strings are mostly used for naming things without having to rely on external ID databases. So what can be done is basically use string constants as is, concatenate them and use them as keys. * `CONCAT`: String concatenation. :: string : string : 'S -> string : 'S * `COMPARE`: Lexicographic comparison. :: string : string : 'S -> int : 'S ### Operations on pairs * `PAIR`: Build a pair from the stack's top two elements. :: 'a : 'b : 'S -> pair 'a 'b : 'S > PAIR ; C / a : b : S => C / (Pair a b) : S * `CAR`: Access the left part of a pair. :: pair 'a _ : 'S -> 'a : 'S > Car ; C / (Pair a _) : S => C / a : S * `CDR`: Access the right part of a pair. :: pair _ 'b : 'S -> 'b : 'S > Car ; C / (Pair _ b) : S => C / b : S ### Operations on sets * `EMPTY_SET 'elt`: Build a new, empty set for elements of a given type. :: 'S -> set 'elt : 'S The `'elt` type must be comparable (the `COMPARE` primitive must be defined over it). * `MEM`: Check for the presence of an element in a set. :: 'elt : set 'elt : 'S -> bool : 'S * `UPDATE`: Inserts or removes an element in a set, replacing a previous value. :: 'elt : bool : set 'elt : 'S -> set 'elt : 'S * `MAP`: Apply a function on a map and return the map of results under the same bindings. The `'b` type must be comparable (the `COMPARE` primitive must be defined over it). :: lambda 'elt 'b : set 'elt : 'S -> set 'b : 'S * `MAP body`: Apply the body expression to each element of the set. The body sequence has access to the stack. :: (set 'elt) : 'A -> (set 'b) : 'A iff body :: [ 'elt : 'A -> 'b : 'A ] * `REDUCE`: Apply a function on a set passing the result of each application to the next one and return the last. :: lambda (pair 'elt * 'b) 'b : set 'elt : 'b : 'S -> 'b : 'S * `ITER body`: Apply the body expression to each element of a set. The body sequence has access to the stack. :: (set 'elt) : 'A -> 'A iff body :: [ 'elt : 'A -> 'A ] * `SIZE`: Get the cardinality of the set. :: set 'elt : 'S -> nat : 'S ### Operations on maps * `EMPTY_MAP 'key 'val`: Build a new, empty map. The `'key` type must be comparable (the `COMPARE` primitive must be defined over it). :: 'S -> map 'key 'val : 'S * `GET`: Access an element in a map, returns an optional value to be checked with `IF_SOME`. :: 'key : map 'key 'val : 'S -> option 'val : 'S * `MEM`: Check for the presence of an element in a map. :: 'key : map 'key 'val : 'S -> bool : 'S * `UPDATE`: Assign or remove an element in a map. :: 'key : option 'val : map 'key 'val : 'S -> map 'key 'val : 'S * `MAP`: Apply a function on a map and return the map of results under the same bindings. :: lambda (pair 'key 'val) 'b : map 'key 'val : 'S -> map 'key 'b : 'S * `MAP body`: Apply the body expression to each element of a map. The body sequence has access to the stack. :: (map 'key 'val) : 'A -> (map 'key 'b) : 'A iff body :: [ (pair 'key 'val) : 'A -> 'b : 'A ] * `REDUCE`: Apply a function on a map passing the result of each application to the next one and return the last. :: lambda (pair (pair 'key 'val) 'b) 'b : map 'key 'val : 'b : 'S -> 'b : 'S * `ITER body`: Apply the body expression to each element of a map. The body sequence has access to the stack. :: (map 'elt 'val) : 'A -> 'A iff body :: [ (pair 'elt 'val) : 'A -> 'A ] * `SIZE`: Get the cardinality of the map. :: map 'key 'val : 'S -> nat : 'S ### Operations on optional values * `SOME`: Pack a present optional value. :: 'a : 'S -> 'a? : 'S > SOME ; C / v :: S => C / (Some v) :: S * `NONE 'a`: The absent optional value. :: 'S -> 'a? : 'S > NONE ; C / v :: S => C / None :: S * `IF_NONE bt bf`: Inspect an optional value. :: 'a? : 'S -> 'b : 'S iff bt :: [ 'S -> 'b : 'S] bf :: [ 'a : 'S -> 'b : 'S] > IF_NONE ; C / (None) : S => bt ; C / S > IF_NONE ; C / (Some a) : S => bf ; C / a : S ### Operations on unions * `LEFT 'b`: Pack a value in a union (left case). :: 'a : 'S -> or 'a 'b : 'S > LEFT ; C / v :: S => C / (Left v) :: S * `RIGHT 'a`: Pack a value in a union (right case). :: 'b : 'S -> or 'a 'b : 'S > RIGHT ; C / v :: S => C / (Right v) :: S * `IF_LEFT bt bf`: Inspect a value of a variant type. :: or 'a 'b : 'S -> 'c : 'S iff bt :: [ 'a : 'S -> 'c : 'S] bf :: [ 'b : 'S -> 'c : 'S] > IF_LEFT ; C / (Left a) : S => bt ; C / a : S > IF_LEFT ; C / (Right b) : S => bf ; C / b : S * `IF_RIGHT bt bf`: Inspect a value of a variant type. :: or 'a 'b : 'S -> 'c : 'S iff bt :: [ 'b : 'S -> 'c : 'S] bf :: [ 'a : 'S -> 'c : 'S] > IF_LEFT ; C / (Right b) : S => bt ; C / b : S > IF_RIGHT ; C / (Left a) : S => bf ; C / a : S ### Operations on lists * `CONS`: Prepend an element to a list. :: 'a : list 'a : 'S -> list 'a : 'S > CONS ; C / a : { } : S => C / { a ; } : S * `NIL 'a`: The empty list. :: 'S -> list 'a : 'S > NIL ; C / S => C / {} : S * `IF_CONS bt bf`: Inspect an optional value. :: list 'a : 'S -> 'b : 'S iff bt :: [ 'a : list 'a : 'S -> 'b : 'S] bf :: [ 'S -> 'b : 'S] > IF_CONS ; C / { a ; } : S => bt ; C / a : { } : S > IF_CONS ; C / {} : S => bf ; C / S * `MAP`: Apply a function on a list from left to right and return the list of results in the same order. :: lambda 'a 'b : list 'a : 'S -> list 'b : 'S * `MAP body`: Apply the body expression to each element of the list. The body sequence has access to the stack. :: (list 'elt) : 'A -> (list 'b) : 'A iff body :: [ 'elt : 'A -> 'b : 'A ] * `REDUCE`: Apply a function on a list from left to right passing the result of each application to the next one and return the last. :: lambda (pair 'a 'b) 'b : list 'a : 'b : 'S -> 'b : 'S * `SIZE`: Get the number of elements in the list. :: list 'elt : 'S -> nat : 'S * `ITER body`: Apply the body expression to each element of a list. The body sequence has access to the stack. :: (list 'elt) : 'A -> 'A iff body :: [ 'elt : 'A -> 'A ] VI - Domain specific data types ------------------------------- * `timestamp`: Dates in the real world. * `tez`: A specific type for manipulating tokens. * `contract 'param 'result`: A contract, with the type of its code. * `key`: A public cryptography key. * `key_hash`: The hash of a public cryptography key. * `signature`: A cryptographic signature. VII - Domain specific operations -------------------------------- ### Operations on timestamps Timestamp immediates can be obtained by the `NOW` operation, or retrieved from script parameters or globals. * `ADD` Increment / decrement a timestamp of the given number of seconds. :: timestamp : int : 'S -> timestamp : 'S :: int : timestamp : 'S -> timestamp : 'S > ADD ; C / seconds : nat (t) : S => C / (seconds + t) : S > ADD ; C / nat (t) : seconds : S => C / (t + seconds) : S * `SUB` Subtract a number of seconds from a timestamp. :: timestamp : int : 'S -> timestamp : 'S > SUB ; C / seconds : nat (t) : S => C / (seconds - t) : S * `SUB` Subtract two timestamps. :: timestamp : timestamp : 'S -> int : 'S > SUB ; C / seconds(t1) : seconds(t2) : S => C / (t1 - t2) : S * `COMPARE`: Timestamp comparison. :: timestamp : timestamp : 'S -> int : 'S ### Operations on Tez Tez are internally represented by a 64 bit signed integer. There are restrictions to prevent creating a negative amount of tez. Operations are limited to prevent overflow and mixing them with other numerical types by mistake. They are also mandatorily checked for under/overflows. * `ADD`: :: tez : tez : 'S -> tez : 'S > ADD ; C / x : y : S => [FAIL] on overflow > ADD ; C / x : y : S => C / (x + y) : S * `SUB`: :: tez : tez : 'S -> tez : 'S > SUB ; C / x : y : S => [FAIL] iff x < y > SUB ; C / x : y : S => C / (x - y) : S * `MUL` :: tez : nat : 'S -> tez : 'S :: nat : tez : 'S -> tez : 'S > MUL ; C / x : y : S => [FAIL] on overflow > MUL ; C / x : y : S => C / (x * y) : S * `EDIV` :: tez : nat : 'S -> option (pair tez tez) : 'S :: tez : tez : 'S -> option (pair nat tez) : 'S > EDIV ; C / x : 0 : S => C / None > EDIV ; C / x : y : S => C / Some (Pair (x / y) (x % y)) : S * `COMPARE`: :: tez : tez : 'S -> int : 'S ### Operations on contracts * `MANAGER`: Access the manager of a contract. :: contract 'p 'r : 'S -> key_hash : 'S * `CREATE_CONTRACT`: Forge a new contract. :: key_hash : key_hash? : bool : bool : tez : lambda (pair 'p 'g) (pair 'r 'g) : 'g : 'S -> contract 'p 'r : 'S As with non code-emitted originations the contract code takes as argument the transferred amount plus an ad-hoc argument and returns an ad-hoc value. The code also takes the global data and returns it to be stored and retrieved on the next transaction. These data are initialized by another parameter. The calling convention for the code is as follows: `(Pair arg globals)) -> (Pair ret globals)`, as extrapolatable from the instruction type. The first parameters are the manager, optional delegate, then spendable and delegatable flags and finally the initial amount taken from the currently executed contract. The contract is returned as a first class value to be called immediately or stored. * `CREATE_CONTRACT { storage 'g ; parameter 'p ; return 'r ; code ... }`: Forge a new contract from a literal. :: key_hash : key_hash? : bool : bool : tez : 'g : 'S -> contract 'p 'r : 'S Originate a contract based on a literal. This is currently the only way to include transfers inside of an originated contract. The first parameters are the manager, optional delegate, then spendable and delegatable flags and finally the initial amount taken from the currently executed contract. The contract is returned as a first class value to be called immediately or stored. * `CREATE_ACCOUNT`: Forge an account (a contract without code). :: key_hash : key_hash? : bool : tez : 'S -> contract unit unit : 'S Take as argument the manager, optional delegate, the delegatable flag and finally the initial amount taken from the currently executed contract. * `TRANSFER_TOKENS`: Forge and evaluate a transaction. :: 'p : tez : contract 'p 'r : 'g : [] -> 'r : 'g : [] The parameter and return value must be consistent with the ones expected by the contract, unit for an account. To preserve the global consistency of the system, the current contract's storage must be updated before passing the control to another script. For this, the script must put the partially updated storage on the stack ('g is the type of the contract's storage). If a recursive call to the current contract happened, the updated storage is put on the stack next to the return value. Nothing else can remain on the stack during a nested call. If some local values have to be kept for after the nested call, they have to be stored explicitly in a transient part of the storage. A trivial example of that is to reserve a boolean in the storage, initialized to false, reset to false at the end of each contract execution, and set to true during a nested call. This thus gives an easy way for a contract to prevent recursive call (the contract just fails if the boolean is true). * `BALANCE`: Push the current amount of tez of the current contract. :: 'S -> tez :: 'S * `SOURCE 'p 'r`: Push the source contract of the current transaction. :: 'S -> contract 'p 'r :: 'S * `SELF`: Push the current contract. :: 'S -> contract 'p 'r :: 'S where contract 'p 'r is the type of the current contract * `AMOUNT`: Push the amount of the current transaction. :: 'S -> tez :: 'S * `DEFAULT_ACCOUNT`: Return a default contract with the given public/private key pair. Any funds deposited in this contract can immediately be spent by the holder of the private key. This contract cannot execute Michelson code and will always exist on the blockchain. :: key_hash : 'S -> contract unit unit :: 'S ### Special operations * `STEPS_TO_QUOTA`: Push the remaining steps before the contract execution must terminate. :: 'S -> nat :: 'S * `NOW`: Push the timestamp of the block whose validation triggered this execution (does not change during the execution of the contract). :: 'S -> timestamp :: 'S ### Cryptographic primitives * `HASH_KEY`: Compute the b58check of a public key. :: key : 'S -> key_hash : 'S * `H`: Compute a cryptographic hash of the value contents using the Blake2B cryptographic hash function. :: 'a : 'S -> string : 'S * `CHECK_SIGNATURE`: Check that a sequence of bytes has been signed with a given key. :: key : pair signature string : 'S -> bool : 'S * `COMPARE`: :: key_hash : key_hash : 'S -> int : 'S VIII - Macros ------------- In addition to the operations above, several extensions have been added to the language's concreate syntax. If you are interacting with the node via RPC, bypassing the client, which expands away these macros, you will need to desurgar them yourself. These macros are designed to be unambiguous and reversable, meaning that errors are reported in terms of resugared syntax. Below you'll see these macros defined in terms of other syntactic forms. That is how these macros are seen by the node. ### Compare Syntactic sugar exists for merging `COMPARE` and comparison combinators, and also for branching. * `CMP{EQ|NEQ|LT|GT|LE|GE}` > CMP(\op) ; C / S => COMPARE ; (\op) ; C / S * `IF{EQ|NEQ|LT|GT|LE|GE} bt bf` > IF(\op) ; C / S => (\op) ; IF bt bf ; C / S * `IFCMP{EQ|NEQ|LT|GT|LE|GE} bt bf` > IFCMP(\op) ; C / S => COMPARE ; (\op) ; IF bt bf ; C / S ### Assertion Macros All assertion operations are syntactic sugar for conditionals with a `FAIL` instruction in the appropriate branch. When possible, use them to increase clarity about illegal states. * `ASSERT`: > IF {} {FAIL} * `ASSERT_{EQ|NEQ|LT|LE|GT|GE}`: > ASSERT_(\op) => IF(\op) {} {FAIL} * `ASSERT_CMP{EQ|NEQ|LT|LE|GT|GE}`: > ASSERT_CMP(\op) => IFCMP(\op) {} {FAIL} * `ASSERT_NONE`: Equivalent to ``. > ASSERT_NONE => IF_NONE {} {FAIL} * `ASSERT_SOME`: Equivalent to `IF_NONE {FAIL} {}`. > ASSERT_NONE => IF_NONE {FAIL} {} * `ASSERT_LEFT`: > ASSERT_LEFT => IF_LEFT {} {FAIL} * `ASSERT_RIGHT`: > ASSERT_RIGHT => IF_LEFT {FAIL} {} ### Syntactic Conveniences These are macros are simply more convenient syntax for various common operations. * `DII+P code`: A syntactic sugar for working deeper in the stack. > DII(\rest=I*)P code / S => DIP (DI(\rest)P code) / S * `DUU+P`: A syntactic sugar for duplicating the `n`th element of the stack. > DUU(\rest=U*)P / S => DIP (DU(\rest)P) ; SWAP / S * `P(A*AI)+R`: A syntactic sugar for building nested pairs in bulk. > P(\fst=A*)AI(\rest=(A*AI)+)R ; C / S => P(\fst)AIR ; P(\rest)R ; C / S > PA(\rest=A*)AIR ; C / S => DIP (P(\rest)AIR) ; C / S * `C[AD]+R`: A syntactic sugar for accessing fields in nested pairs. > CA(\rest=[AD]+)R ; C / S => CAR ; C(\rest)R ; C / S > CD(\rest=[AD]+)R ; C / S => CDR ; C(\rest)R ; C / S * `IF_SOME bt bf`: Inspect an optional value. :: 'a? : 'S -> 'b : 'S iff bt :: [ 'a : 'S -> 'b : 'S] bf :: [ 'S -> 'b : 'S] > IF_SOME ; C / (Some a) : S => bt ; C / a : S > IF_SOME ; C / (None) : S => bf ; C / S * `SET_CAR`: Set the first value of a pair. > SET_CAR => CDR ; SWAP ; PAIR * `SET_CDR`: Set the first value of a pair. > SET_CDR => CAR ; PAIR * `SET_C[AD]+R`: A syntactic sugar for setting fields in nested pairs. > SET_CA(\rest=[AD]+)R ; C / S => { DUP ; DIP { CAR ; SET_C(\rest)R } ; CDR ; SWAP ; PAIR } ; C / S > SET_CD(\rest=[AD]+)R ; C / S => { DUP ; DIP { CDR ; SET_C(\rest)R } ; CAR ; PAIR } ; C / S * `MAP_CAR` code: Transform the first value of a pair. > SET_CAR => DUP ; CDR ; SWAP ; code ; CAR ; PAIR * `MAP_CDR` code: Transform the first value of a pair. > SET_CDR => DUP ; CDR ; code ; SWAP ; CAR ; PAIR * `MAP_C[AD]+R` code: A syntactic sugar for transforming fields in nested pairs. > MAP_CA(\rest=[AD]+)R ; C / S => { DUP ; DIP { CAR ; MAP_C(\rest)R code } ; CDR ; SWAP ; PAIR } ; C / S > MAP_CD(\rest=[AD]+)R ; C / S => { DUP ; DIP { CDR ; MAP_C(\rest)R code } ; CAR ; PAIR } ; C / S IX - Concrete syntax ---------------------- The concrete language is very close to the formal notation of the specification. Its structure is extremely simple: an expression in the language can only be one of the four following constructs. 1. An integer. 1. A character string. 2. The application of a primitive to a sequence of expressions. 3. A sequence of expressions. This simple four cases notation is called Micheline. ### Constants There are two kinds of constants: 1. Integers or naturals in decimal (no prefix), hexadecimal (0x prefix), octal (0o prefix) or binary (0b prefix). 2. Strings with usual escapes `\n`, `\t`, `\b`, `\r`, `\\`, `\"`. The encoding of a Michelson source file must be UTF-8, and non-ASCII characters can only appear in comments. No line break can appear in a string. Any non-printable characters must be escaped using two hexadecimal characters, as in '\xHH' or the predefine escape sequences above.. ### Primitive applications A primitive application is a name followed by arguments prim arg1 arg2 When a primitive application is the argument to another primitive application, it must be wrapped with parentheses. prim (prim1 arg11 arg12) (prim2 arg21 arg22) ### Sequences Successive expression can be grouped as a single sequence expression using curly braces as delimiters and semicolon as separators. { expr1 ; expr2 ; expr3 ; expr4 } A sequence can be passed as argument to a primitive. prim arg1 arg2 { arg3_expr1 ; arg3_expr2 } Primitive applications right inside a sequence cannot be wrapped. { (prim arg1 arg2) } # is not ok ### Indentation To remove ambiguities for human readers, the parser enforces some indentation rules. - For sequences: - All expressions in a sequence must be aligned on the same column. - An exception is made when consecutive expressions fit on the same line, as long as the first of them is correctly aligned. - All expressions in a sequence must be indented to the right of the opening curly brace by at least one column. - The closing curly brace cannot be on the left of the opening one. - For primitive applications: - All arguments in an application must be aligned on the same column. - An exception is made when consecutive arguments fit on the same line, as long as the first of them is correctly aligned. - All arguments in a sequence must be indented to the right of the primitive name by at least one column. ### Annotations Sequences and primitive applications can receive an annotation. An annotation is a lowercase identifier that starts with an `@` sign. It comes after the opening curly brace for sequence, and after the primitive name for primitive applications. { @annot expr ; expr ; ... } (prim @annot arg arg ...) ### Differences with the formal notation The concrete syntax follows the same lexical conventions as the specification: instructions are represented by uppercase identifiers, type constructors by lowercase identifiers, and constant constructors are Capitalized. All domain specific constants are Micheline strings with specific formats: - `tez` amounts are written using the same notation as JSON schemas and the command line client: thousands are optionally separated by comas, and centiles, if present, must be prefixed by a period. - in regexp form: `([0-9]{1,3}(,[0-9]{3})+)|[0-9]+(\.[0.9]{2})?` - `"1234567"` means 123456700 tez centiles - `"1,234,567"` means 123456700 tez centiles - `"1234567.89"` means 123456789 tez centiles - `"1,234,567.00"` means 123456789 tez centiles - `"1234,567"` is invalid - `"1,234,567."` is invalid - `"1,234,567.0"` is invalid - `timestamp`s are written using `RFC 339` notation. - `contract`s are the raw strings returned by JSON RPCs or the command line interface and cannot be forged by hand so their format is of no interest here. - `key`s are `Blake2B` hashes of `ed25519` public keys encoded in `base58` format with the following custom alphabet: `"eXMNE9qvHPQDdcFx5J86rT7VRm2atAypGhgLfbS3CKjnksB4"`. - `signature`s are `ed25519` signatures as a series of hex-encoded bytes. To prevent errors, control flow primitives that take instructions as parameters require sequences in the concrete syntax. IF { instr1_true ; instr2_true ; ... } { instr1_false ; instr2_false ; ... } ### Main program structure The toplevel of a smart contract file must be an undelimited sequence of four primitive applications (in no particular order) that provide its `parameter`, `return` and `storage` types, as well as its `code`. See the next section for a concrete example. ### Comments A hash sign (`#`) anywhere outside of a string literal will make the rest of the line (and itself) completely ignored, as in the following example. { PUSH nat 1 ; # pushes 1 PUSH nat 2 ; # pushes 2 ADD } # computes 2 + 1 Comments that span on multiple lines or that stop before the end of the line can also be written, using C-like delimiters (`/* ... */`). X - JSON syntax --------------- Micheline expressions are encoded in JSON like this: - An integer `N` is an object with a single field `"int"` whose valus is the decimal representation as a string. `{ "int": "N" }` - A string `"contents"` is an object with a single field `"string"` whose valus is the decimal representation as a string. `{ "string": "contents" }` - A sequence is a JSON array. `[ expr, ... ]` - A primitive application is an object with two fields `"prim"` for the primitive name and `"args"` for the arguments (that must contain an array). A third optionnal field `"annot"` may contains an annotation, including the `@` sign. { "prim": "pair", "args": [ { "prim": "nat", args: [] }, { "prim": "nat", args: [] } ], "annot": "@numbers" }` As in the concrete syntax, all domain specific constants are encoded as strings. XI - Examples ------------- Contracts in the system are stored as a piece of code and a global data storage. The type of the global data of the storage is fixed for each contract at origination time. This is ensured statically by checking on origination that the code preserves the type of the global data. For this, the code of the contract is checked to be of the following type lambda (pair 'arg 'global) -> (pair 'ret 'global) where 'global is the type of the original global store given on origination. The contract also takes a parameter and returns a value, hence the complete calling convention above. ### Empty contract Any contract with the same `parameter` and `return` types may be written with an empty sequence in its `code` section. The simplest contract is the contract for which the `parameter`, `storage`, and `return` are all of type `unit`. This contract is as follows: code {}; storage unit; parameter unit; return unit; ### Reservoir contract We want to create a contract that stores tez until a timestamp `T` or a maximum amount `N` is reached. Whenever `N` is reached before `T`, all tokens are reversed to an account `B` (and the contract is automatically deleted). Any call to the contract's code performed after `T` will otherwise transfer the tokens to another account `A`. We want to build this contract in a reusable manner, so we do not hard-code the parameters. Instead, we assume that the global data of the contract are `(Pair (Pair T N) (Pair A B))`. Hence, the global data of the contract has the following type 'g = pair (pair timestamp tez) (pair (contract unit unit) (contract unit unit)) Following the contract calling convention, the code is a lambda of type lambda (pair unit 'g) (pair unit 'g) written as lambda (pair unit (pair (pair timestamp tez) (pair (contract unit unit) (contract unit unit)))) (pair unit (pair (pair timestamp tez) (pair (contract unit unit) (contract unit unit)))) The complete source `reservoir.tz` is: parameter timestamp ; storage (pair (pair timestamp tez) # T N (pair (contract unit unit) (contract unit unit))) ; # A B return unit ; code { DUP ; CDAAR ; # T NOW ; COMPARE ; LE ; IF { DUP ; CDADR ; # N BALANCE ; COMPARE ; LE ; IF { CDR ; UNIT ; PAIR } { DUP ; CDDDR ; # B BALANCE ; UNIT ; DIIIP { CDR } ; TRANSFER_TOKENS ; PAIR } } { DUP ; CDDAR ; # A BALANCE ; UNIT ; DIIIP { CDR } ; TRANSFER_TOKENS ; PAIR } } ### Reservoir contract (variant with broker and status) We basically want the same contract as the previous one, but instead of destroying it, we want to keep it alive, storing a flag `S` so that we can tell afterwards if the tokens have been transferred to `A` or `B`. We also want a broker `X` to get some fee `P` in any case. We thus add variables `P` and `S` and `X` to the global data of the contract, now `(Pair (S, Pair (T, Pair (Pair P N) (Pair X (Pair A B)))))`. `P` is the fee for broker `A`, `S` is the state, as a string `"open"`, `"timeout"` or `"success"`. At the beginning of the transaction: S is accessible via a CDAR T via a CDDAR P via a CDDDAAR N via a CDDDADR X via a CDDDDAR A via a CDDDDDAR B via a CDDDDDDR For the contract to stay alive, we test that all least `(Tez "1.00")` is still available after each transaction. This value is given as an example and must be updated according to the actual Tezos minimal value for contract balance. The complete source `scrutable_reservoir.tz` is: parameter timestamp ; storage (pair string # S (pair timestamp # T (pair (pair tez tez) ; # P N (pair (contract unit unit) # X (pair (contract unit unit) (contract unit unit)))))) ; # A B return unit ; code { DUP ; CDAR # S PUSH string "open" ; COMPARE ; NEQ ; IF { FAIL } # on "success", "timeout" or a bad init value { DUP ; CDDAR ; # T NOW ; COMPARE ; LT ; IF { # Before timeout # We compute ((1 + P) + N) tez for keeping the contract alive PUSH tez "1.00" ; DIP { DUP ; CDDDAAR } ; ADD ; # P DIP { DUP ; CDDDADR } ; ADD ; # N # We compare to the cumulated amount BALANCE ; COMPARE; LT ; IF { # Not enough cash, we just accept the transaction # and leave the global untouched CDR } { # Enough cash, successful ending # We update the global CDDR ; PUSH string "success" ; PAIR ; # We transfer the fee to the broker DUP ; CDDAAR ; # P DIP { DUP ; CDDDAR } # X UNIT ; TRANSFER_TOKENS ; DROP ; # We transfer the rest to A DUP ; CDDADR ; # N DIP { DUP ; CDDDDAR } # A UNIT ; TRANSFER_TOKENS ; DROP } } { # After timeout, we refund # We update the global CDDR ; PUSH string "timeout" ; PAIR ; # We try to transfer the fee to the broker PUSH tez "1.00" ; BALANCE ; SUB ; # available DIP { DUP ; CDDAAR } ; # P COMPARE ; LT ; # available < P IF { PUSH tez "1.00" ; BALANCE ; SUB ; # available DIP { DUP ; CDDDAR } # X UNIT ; TRANSFER_TOKENS ; DROP } { DUP ; CDDAAR ; # P DIP { DUP ; CDDDAR } # X UNIT ; TRANSFER_TOKENS ; DROP } # We transfer the rest to B PUSH tez "1.00" ; BALANCE ; SUB ; # available DIP { DUP ; CDDDDDR } # B UNIT ; TRANSFER_TOKENS ; DROP } } # return Unit UNIT ; PAIR } ### Forward contract We want to write a forward contract on dried peas. The contract takes as global data the tons of peas `Q`, the expected delivery date `T`, the contract agreement date `Z`, a strike `K`, a collateral `C` per ton of dried peas, and the accounts of the buyer `B`, the seller `S` and the warehouse `W`. These parameters as grouped in the global storage as follows: Pair (Pair (Pair Q (Pair T Z))) (Pair (Pair K C) (Pair (Pair B S) W)) of type pair (pair nat (pair timestamp timestamp)) (pair (pair tez tez) (pair (pair account account) account)) The 24 hours after timestamp `Z` are for the buyer and seller to store their collateral `(Q * C)`. For this, the contract takes a string as parameter, matching `"buyer"` or `"seller"` indicating the party for which the tokens are transferred. At the end of this day, each of them can send a transaction to send its tokens back. For this, we need to store who already paid and how much, as a `(pair tez tez)` where the left component is the buyer and the right one the seller. After the first day, nothing cam happen until `T`. During the 24 hours after `T`, the buyer must pay `(Q * K)` to the contract, minus the amount already sent. After this day, if the buyer didn't pay enough then any transaction will send all the tokens to the seller. Otherwise, the seller must deliver at least `Q` tons of dried peas to the warehouse, in the next 24 hours. When the amount is equal to or exceeds `Q`, all the tokens are transferred to the seller and the contract is destroyed. For storing the quantity of peas already delivered, we add a counter of type `nat` in the global storage. For knowing this quantity, we accept messages from W with a partial amount of delivered peas as argument. After this day, any transaction will send all the tokens to the buyer (not enough peas have been delivered in time). Hence, the global storage is a pair, with the counters on the left, and the constant parameters on the right, initially as follows. Pair (Pair 0 (Pair 0_00 0_00)) (Pair (Pair (Pair Q (Pair T Z))) (Pair (Pair K C) (Pair (Pair B S) W))) of type pair (pair nat (pair tez tez)) (pair (pair nat (pair timestamp timestamp)) (pair (pair tez tez) (pair (pair account account) account))) The parameter of the transaction will be either a transfer from the buyer or the seller or a delivery notification from the warehouse of type `(or string nat)`. At the beginning of the transaction: Q is accessible via a CDDAAR T via a CDDADAR Z via a CDDADDR K via a CDDDAAR C via a CDDDADR B via a CDDDDAAR S via a CDDDDADR W via a CDDDDDR the delivery counter via a CDAAR the amount versed by the seller via a CDADDR the argument via a CAR The contract returns a unit value, and we assume that it is created with the minimum amount, set to `(Tez "1.00")`. The complete source `forward.tz` is: parameter (or string nat) ; return unit ; storage (pair (pair nat (pair tez tez)) # counter from_buyer from_seller (pair (pair nat (pair timestamp timestamp)) # Q T Z (pair (pair tez tez) # K C (pair (pair (contract unit unit) (contract unit unit)) # B S (contract unit unit))))) ; # W code { DUP ; CDDADDR ; # Z PUSH nat 86400 ; SWAP ; ADD ; # one day in second NOW ; COMPARE ; LT ; IF { # Before Z + 24 DUP ; CAR ; # we must receive (Left "buyer") or (Left "seller") IF_LEFT { DUP ; PUSH string "buyer" ; COMPARE ; EQ ; IF { DROP ; DUP ; CDADAR ; # amount already versed by the buyer DIP { AMOUNT } ; ADD ; # transaction # then we rebuild the globals DIP { DUP ; CDADDR } ; PAIR ; # seller amount PUSH nat 0 ; PAIR ; # delivery counter at 0 DIP { CDDR } ; PAIR ; # parameters # and return Unit UNIT ; PAIR } { PUSH string "seller" ; COMPARE ; EQ ; IF { DUP ; CDADDR ; # amount already versed by the seller DIP { AMOUNT } ; ADD ; # transaction # then we rebuild the globals DIP { DUP ; CDADAR } ; SWAP ; PAIR ; # buyer amount PUSH nat 0 ; PAIR ; # delivery counter at 0 DIP { CDDR } ; PAIR ; # parameters # and return Unit UNIT ; PAIR } { FAIL } } } # (Left _) { FAIL } } # (Right _) { # After Z + 24 # test if the required amount is reached DUP ; CDDAAR ; # Q DIP { DUP ; CDDDADR } ; MUL ; # C PUSH nat 2 ; MUL ; PUSH tez "1.00" ; ADD ; BALANCE ; COMPARE ; LT ; # balance < 2 * (Q * C) + 1 IF { # refund the parties CDR ; DUP ; CADAR ; # amount versed by the buyer DIP { DUP ; CDDDAAR } # B UNIT ; TRANSFER_TOKENS ; DROP DUP ; CADDR ; # amount versed by the seller DIP { DUP ; CDDDADR } # S UNIT ; TRANSFER_TOKENS ; DROP BALANCE ; # bonus to the warehouse to destroy the account DIP { DUP ; CDDDDR } # W UNIT ; TRANSFER_TOKENS ; DROP # return unit, don't change the global # since the contract will be destroyed UNIT ; PAIR } { # otherwise continue DUP ; CDDADAR # T NOW ; COMPARE ; LT IF { FAIL } # Between Z + 24 and T { # after T DUP ; CDDADAR # T PUSH nat 86400 ; ADD # one day in second NOW ; COMPARE ; LT IF { # Between T and T + 24 # we only accept transactions from the buyer DUP ; CAR ; # we must receive (Left "buyer") IF_LEFT { PUSH string "buyer" ; COMPARE ; EQ ; IF { DUP ; CDADAR ; # amount already versed by the buyer DIP { AMOUNT } ; ADD ; # transaction # The amount must not exceed Q * K DUP ; DIIP { DUP ; CDDAAR ; # Q DIP { DUP ; CDDDAAR } ; MUL ; } ; # K DIP { COMPARE ; GT ; # new amount > Q * K IF { FAIL } { } } ; # abort or continue # then we rebuild the globals DIP { DUP ; CDADDR } ; PAIR ; # seller amount PUSH nat 0 ; PAIR ; # delivery counter at 0 DIP { CDDR } ; PAIR ; # parameters # and return Unit UNIT ; PAIR } { FAIL } } # (Left _) { FAIL } } # (Right _) { # After T + 24 # test if the required payment is reached DUP ; CDDAAR ; # Q DIP { DUP ; CDDDAAR } ; MUL ; # K DIP { DUP ; CDADAR } ; # amount already versed by the buyer COMPARE ; NEQ ; IF { # not reached, pay the seller and destroy the contract BALANCE ; DIP { DUP ; CDDDDADR } # S DIIP { CDR } ; UNIT ; TRANSFER_TOKENS ; DROP ; # and return Unit UNIT ; PAIR } { # otherwise continue DUP ; CDDADAR # T PUSH nat 86400 ; ADD ; PUSH nat 86400 ; ADD ; # two days in second NOW ; COMPARE ; LT IF { # Between T + 24 and T + 48 # We accept only delivery notifications, from W DUP ; CDDDDDR ; MANAGER ; # W SOURCE unit unit ; MANAGER ; COMPARE ; NEQ ; IF { FAIL } {} # fail if not the warehouse DUP ; CAR ; # we must receive (Right amount) IF_LEFT { FAIL } # (Left _) { # We increment the counter DIP { DUP ; CDAAR } ; ADD ; # And rebuild the globals in advance DIP { DUP ; CDADR } ; PAIR ; DIP { CDDR } ; PAIR ; UNIT ; PAIR ; # We test if enough have been delivered DUP ; CDAAR ; DIP { DUP ; CDDAAR } ; COMPARE ; LT ; # counter < Q IF { CDR } # wait for more { # Transfer all the money to the seller BALANCE ; # and destroy the contract DIP { DUP ; CDDDDADR } # S DIIP { CDR } ; UNIT ; TRANSFER_TOKENS ; DROP } } ; UNIT ; PAIR } { # after T + 48, transfer everything to the buyer BALANCE ; # and destroy the contract DIP { DUP ; CDDDDAAR } # B DIIP { CDR } ; UNIT ; TRANSFER_TOKENS ; DROP ; # and return unit UNIT ; PAIR } } } } } } } XII - Full grammar ---------------- ::= | | | | | | | | | | Unit | True | False | Pair | Left | Right | Some | None | { ; ... } | { Elt ; ... } | instruction ::= | { ... } | DROP | DUP | SWAP | PUSH | SOME | NONE | UNIT | IF_NONE { ... } { ... } | PAIR | CAR | CDR | LEFT | RIGHT | IF_LEFT { ... } { ... } | NIL | CONS | IF_CONS { ... } { ... } | EMPTY_SET | EMPTY_MAP | MAP | MAP { ... } | REDUCE | ITER { ... } | MEM | GET | UPDATE | IF { ... } { ... } | LOOP { ... } | LOOP_LEFT { ... } | LAMBDA { ... } | EXEC | DIP { ... } | FAIL | CONCAT | ADD | SUB | MUL | DIV | ABS | NEG | MOD | LSL | LSR | OR | AND | XOR | NOT | COMPARE | EQ | NEQ | LT | GT | LE | GE | INT | MANAGER | SELF | TRANSFER_TOKENS | CREATE_ACCOUNT | CREATE_CONTRACT | DEFAULT_ACCOUNT | NOW | AMOUNT | BALANCE | CHECK_SIGNATURE | H | HASH_KEY | STEPS_TO_QUOTA | SOURCE ::= | | key | unit | signature | option | list | set | contract | pair | or | lambda | map ::= | int | nat | string | tez | bool | key_hash | timestamp XIII - Reference implementation ----------------------------- The language is implemented in OCaml as follows: * The lower internal representation is written as a GADT whose type parameters encode exactly the typing rules given in this specification. In other words, if a program written in this representation is accepted by OCaml's typechecker, it is mandatorily type-safe. This of course also valid for programs not handwritten but generated by OCaml code, so we are sure that any manipulated code is type-safe. In the end, what remains to be checked is the encoding of the typing rules as OCaml types, which boils down to half a line of code for each instruction. Everything else is left to the venerable and well trusted OCaml. * The interpreter is basically the direct transcription of the rewriting rules presented above. It takes an instruction, a stack and transforms it. OCaml's typechecker ensures that the transformation respects the pre and post stack types declared by the GADT case for each instruction. The only things that remain to we reviewed are value dependent choices, such as that we did not swap true and false when interpreting the If instruction. * The input, untyped internal representation is an OCaml ADT with the only 5 grammar constructions: `String`, `Int`, `Seq` and `Prim`. It is the target language for the parser, since not all parsable programs are well typed, and thus could simply not be constructed using the GADT. * The typechecker is a simple function that recognizes the abstract grammar described in section X by pattern matching, producing the well-typed, corresponding GADT expressions. It is mostly a checker, not a full inferer, and thus takes some annotations (basically the input and output of the program, of lambdas and of uninitialized maps and sets). It works by performing a symbolic evaluation of the program, transforming a symbolic stack. It only needs one pass over the whole program. Here again, OCaml does most of the checking, the structure of the function is very simple, what we have to check is that we transform a `Prim ("If", ...)` into an `If`, a `Prim ("Dup", ...)` into a `Dup`, etc.