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An implementation of spartan type theory

This repository shows how to implement a minimalist type theory of the kind that is sometimes called “spartan”. The current version is an updated version of the one presented at the School and Workshop on Univalent Mathematics which took place at the University of Birmingham in December 2017.

The type theory

The dependent type theory spartan has the following ingridients:

  • A universe Type with Type : Type.
  • Dependent products, written as forall (x : T₁), T₂ or ∀ (x : T₁), T₂ or ∏ (x : T₁), T₂.
  • Functions, written as one of fun (x : T) => e or λ (x : T) ⇒ e. The typing annotation may be omitted, i.e., fun x => e, and multiple abstractions may be shortened as λ x y (z u : T) (w : U) ⇒ e.
  • Application e₁ e₂.
  • Type ascription written as e : T.

Top-level commands:

  • Definition x := e. -- define a value
  • Axiom x : T. -- assume a constant x of type T
  • Check e. -- print the type of e
  • Eval e. -- evaluate e a la call-by-value
  • Load "⟨file⟩". -- load a file

Prerequisites

  • OCaml and OPAM

  • The OPAM packages dune, menhir, mehirLib, sedlex and bindlib:

      opam install dune menhir menihirLib sedlex bindlib
    
  • It is recommended that you also install the rlwrap or ledit command line wrapper.

Compilation

You can type:

  • dune build to compile the spartan.exe executable.
  • dune clean to clean up.

Usage

Once you compile the program, you can run it in interactive mode as ./spartan.exe

Run ./spartan.exe --help to see the command-line options and general usage.

Source code

The purpose of the implementation is to keep the source uncomplicated and short. The essential bits of source code can be found in the following files. It should be possible for you to just read the entire source code.

It is best to first familiarize yourself with the core:

Continue with the infrastructure: