# Packages matching: installed # Name # Installed # Synopsis base-bigarray base base-threads base base-unix base conf-findutils 1 Virtual package relying on findutils coq 8.12.2 Formal proof management system num 1.4 The legacy Num library for arbitrary-precision integer and rational arithmetic ocaml 4.11.2 The OCaml compiler (virtual package) ocaml-base-compiler 4.11.2 Official release 4.11.2 ocaml-config 1 OCaml Switch Configuration ocamlfind 1.9.5 A library manager for OCaml # opam file: opam-version: "2.0" maintainer: "matej.kosik@inria.fr" homepage: "https://github.com/coq-contribs/higman-s" license: "LGPL" build: [make "-j%{jobs}%"] install: [make "install"] remove: ["rm" "-R" "%{lib}%/coq/user-contrib/HigmanS"] depends: [ "ocaml" "coq" {>= "8.5" & < "8.6~"} ] tags: [ "keyword:Higman's lemma" "keyword:well quasi ordering" "category:Mathematics/Combinatorics and Graph Theory" "date:2007-09-14" ] authors: [ "William Delobel <william.delobel@lif.univ-mrs.fr>" ] bug-reports: "https://github.com/coq-contribs/higman-s/issues" dev-repo: "git+https://github.com/coq-contribs/higman-s.git" synopsis: "Higman's lemma on an unrestricted alphabet" description: "This proof is more or less the proof given by Monika Seisenberger in \"An Inductive Version of Nash-Williams' Minimal-Bad-Sequence Argument for Higman's Lemma\"." flags: light-uninstall url { src: "https://github.com/coq-contribs/higman-s/archive/v8.5.0.tar.gz" checksum: "md5=3f304e5b60fe9760b55d0d3ed2ca8d51" }
true
Dry install with the current Coq version:
opam install -y --show-action coq-higman-s.8.5.0 coq.8.12.2
[NOTE] Package coq is already installed (current version is 8.12.2). The following dependencies couldn't be met: - coq-higman-s -> coq < 8.6~ -> ocaml < 4.06.0 base of this switch (use `--unlock-base' to force) No solution found, exiting
Dry install without Coq/switch base, to test if the problem was incompatibility with the current Coq/OCaml version:
opam remove -y coq; opam install -y --show-action --unlock-base coq-higman-s.8.5.0
true
true
No files were installed.
true