(2019-11-30 21:22:11 UTC)
# Packages matching: installed # Name # Installed # Synopsis base-bigarray base base-threads base base-unix base conf-findutils 1 Virtual package relying on findutils conf-m4 1 Virtual package relying on m4 coq dev Formal proof management system num 1.3 The legacy Num library for arbitrary-precision integer and rational arithmetic ocaml 4.09.0 The OCaml compiler (virtual package) ocaml-base-compiler 4.09.0 Official release 4.09.0 ocaml-config 1 OCaml Switch Configuration ocamlfind 1.8.1 A library manager for OCaml # opam file: opam-version: "2.0" maintainer: "dev@clarus.me" homepage: "https://github.com/coq-contribs/fermat4" license: "Proprietary" build: [ ["coq_makefile" "-f" "Make" "-o" "Makefile"] [make "-j%{jobs}%"] [make "install"] ] remove: ["rm" "-R" "%{lib}%/coq/user-contrib/Fermat4"] depends: [ "ocaml" "coq" {= "dev"} ] tags: [ "keyword:diophantus" "keyword:fermat" "keyword:arithmetic" "keyword:infinite descent" "category:Mathematics/Arithmetic and Number Theory/Number theory" "date:2005-07" ] authors: [ "David Delahaye <>" "Micaela Mayero <>" ] synopsis: "Diophantus' 20th Problem and Fermat's Last Theorem for n = 4." description: """ This contribution presents the formalization of Fermat's proofs of Diophantus' 20th Problem and Fermat's Last Theorem for n = 4. The proofs are completed using Fermat's "wonderful" method of infinite descent.""" flags: light-uninstall url { src: "git+https://github.com/coq-contribs/fermat4.git#master" }
true
Dry install with the current Coq version:
opam install -y --show-action coq-fermat4.dev coq.dev
Dry install without Coq/switch base, to test if the problem was incompatibility with the current Coq/OCaml version:
true
opam list; echo; ulimit -Sv 4000000; timeout 2h opam install -y --deps-only coq-fermat4.dev coq.dev
opam list; echo; ulimit -Sv 4000000; timeout 1h opam install -y coq-fermat4.dev coq.dev
# Packages matching: installed # Name # Installed # Synopsis base-bigarray base base-threads base base-unix base conf-findutils 1 Virtual package relying on findutils conf-m4 1 Virtual package relying on m4 coq dev Formal proof management system num 1.3 The legacy Num library for arbitrary-precision integer and rational arithmetic ocaml 4.09.0 The OCaml compiler (virtual package) ocaml-base-compiler 4.09.0 Official release 4.09.0 ocaml-config 1 OCaml Switch Configuration ocamlfind 1.8.1 A library manager for OCaml [NOTE] Package coq is already installed (current version is dev). The following actions will be performed: - install coq-fermat4 dev <><> Gathering sources ><><><><><><><><><><><><><><><><><><><><><><><><><><><><> [coq-fermat4.dev] synchronised from git+https://github.com/coq-contribs/fermat4.git#master <><> Processing actions <><><><><><><><><><><><><><><><><><><><><><><><><><><><> [ERROR] The compilation of coq-fermat4 failed at "/home/bench/.opam/opam-init/hooks/sandbox.sh build make -j4". #=== ERROR while compiling coq-fermat4.dev ====================================# # context 2.0.5 | linux/x86_64 | ocaml-base-compiler.4.09.0 | file:///home/bench/run/opam-coq-archive/extra-dev # path ~/.opam/ocaml-base-compiler.4.09.0/.opam-switch/build/coq-fermat4.dev # command ~/.opam/opam-init/hooks/sandbox.sh build make -j4 # exit-code 2 # env-file ~/.opam/log/coq-fermat4-25466-0a5907.env # output-file ~/.opam/log/coq-fermat4-25466-0a5907.out ### output ### # [...] # COQC ArithCompl.v # COQC Descent.v # File "./ArithCompl.v", line 13, characters 0-45: # Warning: There is no option Standard Proposition Elimination Names. # [unknown-option,option] # File "./ArithCompl.v", line 24, characters 2-155: # Error: Not an inductive goal with 1 constructor. # # Makefile:672: recipe for target 'ArithCompl.vo' failed # make[1]: *** [ArithCompl.vo] Error 1 # Makefile:326: recipe for target 'all' failed # make: *** [all] Error 2 <><> Error report <><><><><><><><><><><><><><><><><><><><><><><><><><><><><><><> +- The following actions failed | - build coq-fermat4 dev +- - No changes have been performed # Run eval $(opam env) to update the current shell environment
No files were installed.
true