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mathcomp-real-closed 1.1.1 Not compatible ๐Ÿ‘ผ

Context

# Packages matching: installed
# Name                # Installed # Synopsis
base-bigarray         base
base-domains          base
base-nnp              base        Naked pointers prohibited in the OCaml heap
base-threads          base
base-unix             base
conf-gmp              4           Virtual package relying on a GMP lib system installation
coq                   8.17.1      The Coq Proof Assistant
coq-core              8.17.1      The Coq Proof Assistant -- Core Binaries and Tools
coq-stdlib            8.17.1      The Coq Proof Assistant -- Standard Library
coqide-server         8.17.1      The Coq Proof Assistant, XML protocol server
dune                  3.12.1      Fast, portable, and opinionated build system
ocaml                 5.1.1       The OCaml compiler (virtual package)
ocaml-base-compiler   5.1.1       Official release 5.1.1
ocaml-config          3           OCaml Switch Configuration
ocaml-options-vanilla 1           Ensure that OCaml is compiled with no special options enabled
ocamlfind             1.9.6       A library manager for OCaml
zarith                1.13        Implements arithmetic and logical operations over arbitrary-precision integers
# opam file:
opam-version: "2.0"
maintainer: "Mathematical Components <mathcomp-dev@sympa.inria.fr>"
homepage: "https://github.com/math-comp/real-closed"
bug-reports: "https://github.com/math-comp/real-closed/issues"
dev-repo: "git+https://github.com/math-comp/real-closed.git"
license: "CECILL-B"
build: [ make "-j" "%{jobs}%" ]
install: [ make "install" ]
depends: [
  "coq" { (>= "8.7" & < "8.13~") | (= "dev")}
  "coq-mathcomp-field"       {(>= "1.11.0" & <= "1.12~")}
  "coq-mathcomp-bigenough"   {(>= "1.0.0" & < "1.1~")}
]
tags: [ "keyword:real closed field" "keyword:small scale reflection" "keyword:mathematical components" "date:2020-06-11" "logpath:mathcomp"]
authors: [ "Cyril Cohen <>" "Assia Mahboubi <>" ]
synopsis: "Mathematical Components Library on real closed fields"
description: """
This library contains definitions and theorems about real closed
fields, with a construction of the real closure and the algebraic
closure (including a proof of the fundamental theorem of algebra). It
also contains a proof of decidability of the first order theory of
real closed field, through quantifier elimination.
"""
url {
  http: "https://github.com/math-comp/real-closed/archive/1.1.1.tar.gz"
  checksum: "sha512=f2f8dc4a04f6495e9b29baa0eeff2638151ead6e150f91a723cc256419f3fa3eb2c53b1a4b5cc65c11e9b1f6085c58b41455950c569935614db075e96436c87b"
}

Lint

Command
true
Return code
0

Dry install ๐Ÿœ๏ธ

Dry install with the current Coq version:

Command
opam install -y --show-action coq-mathcomp-real-closed.1.1.1 coq.8.17.1
Return code
5120
Output
[NOTE] Package coq is already installed (current version is 8.17.1).
[ERROR] Package conflict!
  * No agreement on the version of ocaml:
    - (invariant) -> ocaml-base-compiler >= 5.1.1 -> ocaml = 5.1.1
    - coq-mathcomp-real-closed = 1.1.1 -> coq (< 8.13~ | >= dev) -> ocaml < 4.02.0
    You can temporarily relax the switch invariant with `--update-invariant'
  * No agreement on the version of ocaml-base-compiler:
    - (invariant) -> ocaml-base-compiler >= 5.1.1
    - coq-mathcomp-real-closed = 1.1.1 -> coq (< 8.13~ | >= dev) -> ocaml < 4.02.0 -> ocaml-base-compiler = 3.08.1
  * Missing dependency:
    - coq-mathcomp-real-closed = 1.1.1 -> coq (< 8.13~ | >= dev) -> ocaml < 4.02.0 -> ocaml-variants >= 3.09.2 -> ocaml-beta
    unmet availability conditions: 'enable-ocaml-beta-repository'
No solution found, exiting

Dry install without Coq/switch base, to test if the problem was incompatibility with the current Coq/OCaml version:

Command
opam remove -y coq; opam install -y --show-action --unlock-base coq-mathcomp-real-closed.1.1.1
Return code
0

Install dependencies

Command
true
Return code
0
Duration
0 s

Install ๐Ÿš€

Command
true
Return code
0
Duration
0 s

Installation size

No files were installed.

Uninstall ๐Ÿงน

Command
true
Return code
0
Missing removes
none
Wrong removes
none