This OCaml package defines backward lists that are isomorphic to lists.
They are useful when one wishes to give a different type to the lists that are semantically in reverse.
In our experience, it is easy to miss List.rev
or misuse List.rev_append
when both semantically forward and backward lists are present.
With backward lists having a different type, it is impossible to make those mistakes.
The API is relatively stable. Here is the API documentation.
You need OCaml 4.14.0 or newer to enjoy the experimental TMC feature. Otherwise, there will be warnings about incorrect tailcall
annotations because order versions of OCaml cannot automatically transform some functions into tail-recursive ones.
The package is available in the OPAM repository:
opam install bwd
You can also pin the latest version in development:
opam pin https://github.com/RedPRL/bwd.git
open Bwd
open Bwd.Infix
(* [Emp] is the empty list and [<:] is snoc (cons in reverse).
The following expression gives the backward list corresponding to [1; 2; 3]. *)
let b1 : int bwd = Emp <: 1 <: 2 <: 3
(* The module [Bwd] is similar to the standard [List] but for backward lists.
It has most functions you would expect. For example, the following expression
gives the backward list corresponding to [2; 3; 4]. *)
let b2 : int bwd = Bwd.map (fun x -> x + 1) b1
(* Same as above, but using [BwdLabels] that mimics [ListLabels] instead. *)
let b2' : int bwd = BwdLabels.map ~f:(fun x -> x + 1) b1
(* bwd yoga 1: [<@] for moving elements from a forward list on the right
to a backward list on the left. The following gives the backward list
corresponding to [1; 2; 3; 4; 5; 6]. *)
let b3 : int bwd = b1 <@ [4; 5; 6]
(* bwd yoga 2: [@>] for moving elements from a backward list on the left
to a forward list on the right. The following gives the forward list
[1; 2; 3; 4; 5; 6; 7; 8; 9]. *)
let l4 : int list = b3 @> [7; 8; 9]
The idea is that the textual order of elements should never change---what's on the left should stay on the left. We can then rely on the textual order to keep track of semantic order. We might choose different representations (backward or forward lists) to gain efficient access to the elements on one end, but the textual order remains the same. The function List.rev
violates this invariant because it gives a new list whose elements are in the opposite textual order. For this reason, the following functions (including List.rev
) are considered ill-typed and should never be used:
List.rev
List.rev_map
List.rev_map2
List.rev_append
On the other hand, functions in this library (except the general folds) only move elements between forward and backward lists without changing their textual order. The yoga of moving elements should ring a bell for people who have implemented normalization by evaluation (NbE). This simple trick of maintaining textual order seems to have prevented many potential bugs in our proof assistants.