depot/third_party/nixpkgs/pkgs/development/coq-modules/HoTT/default.nix
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{ lib, mkCoqDerivation, coq, version ? null }:
mkCoqDerivation {
pname = "HoTT";
repo = "Coq-HoTT";
owner = "HoTT";
inherit version;
defaultVersion = with lib.versions; lib.switch coq.coq-version [
{ case = range "8.14" "8.17"; out = coq.coq-version; }
] null;
releaseRev = v: "V${v}";
release."8.14".sha256 = "sha256-7kXk2pmYsTNodHA+Qts3BoMsewvzmCbYvxw9Sgwyvq0=";
release."8.15".sha256 = "sha256-JfeiRZVnrjn3SQ87y6dj9DWNwCzrkK3HBogeZARUn9g=";
release."8.16".sha256 = "sha256-xcEbz4ZQ+U7mb0SEJopaczfoRc2GSgF2BGzUSWI0/HY=";
release."8.17".sha256 = "sha256-GjTUpzL9UzJm4C2ilCaYEufLG3hcj7rJPc5Op+OMal8=";
# versions of HoTT for Coq 8.17 and onwards will use dune
# opam-name = if lib.versions.isLe "8.17" coq.coq-version then "coq-hott" else null;
opam-name = "coq-hott";
useDune = lib.versions.isGe "8.17" coq.coq-version;
patchPhase = ''
patchShebangs etc
'';
meta = {
homepage = "https://homotopytypetheory.org/";
description = "The Homotopy Type Theory library";
longDescription = ''
Homotopy Type Theory is an interpretation of Martin-Löfs intensional
type theory into abstract homotopy theory. Propositional equality is
interpreted as homotopy and type isomorphism as homotopy equivalence.
Logical constructions in type theory then correspond to
homotopy-invariant constructions on spaces, while theorems and even
proofs in the logical system inherit a homotopical meaning. As the
natural logic of homotopy, type theory is also related to higher
category theory as it is used e.g. in the notion of a higher topos.
The HoTT library is a development of homotopy-theoretic ideas in the Coq
proof assistant. It draws many ideas from Vladimir Voevodsky's
Foundations library (which has since been incorporated into the Unimath
library) and also cross-pollinates with the HoTT-Agda library.
'';
maintainers = with lib.maintainers; [ alizter siddharthist ];
};
}