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ramsey 8.7.0 Not compatible

(2019-07-15 10:52:38 UTC)

Context

# Packages matching: installed
# Name              # Installed       # Synopsis
base-bigarray       base
base-num            base              Num library distributed with the OCaml compiler
base-threads        base
base-unix           base
camlp5              7.06.10-g84ce6cc4 Preprocessor-pretty-printer of OCaml
conf-m4             1                 Virtual package relying on m4
coq                 8.6.1             Formal proof management system.
num                 0                 The Num library for arbitrary-precision integer and rational arithmetic
ocaml               4.05.0            The OCaml compiler (virtual package)
ocaml-base-compiler 4.05.0            Official 4.05.0 release
ocaml-config        1                 OCaml Switch Configuration
ocamlfind           1.8.0             A library manager for OCaml
# opam file:
opam-version: "2.0"
maintainer: "Hugo.Herbelin@inria.fr"
homepage: "https://github.com/coq-contribs/ramsey"
license: "LGPL 2.1"
build: [make "-j%{jobs}%"]
install: [make "install"]
remove: ["rm" "-R" "%{lib}%/coq/user-contrib/Ramsey"]
depends: [
  "ocaml"
  "coq" {>= "8.7" & < "8.8~"}
]
tags: [ "keyword: dimension one Ramsey theorem" "keyword: constructive mathematics" "keyword: almost full sets" "category: Mathematics/Logic/See also" "category: Mathematics/Combinatorics and Graph Theory" "category: Miscellaneous/Extracted Programs/Combinatorics" ]
authors: [ "Marc Bezem" ]
bug-reports: "https://github.com/coq-contribs/ramsey/issues"
dev-repo: "git+https://github.com/coq-contribs/ramsey.git"
synopsis: "Ramsey Theory"
description: """
For dimension one, the Infinite Ramsey Theorem states that, for any
subset A of the natural numbers nat, either A or nat\\A is
infinite. This special case of the Pigeon Hole Principle is
classically equivalent to: if A and B are both co-finite, then so is
their intersection. None of these principles is constructively
valid. In [VB] the notion of an almost full set is introduced,
classically equivalent to co-finiteness, for which closure under
finite intersection can be proved constructively. A is almost full if
for every (strictly) increasing sequence f: nat -> nat there exists an
x in nat such that f(x) in A. The notion of almost full and its
closure under finite intersection are generalized to all finite
dimensions, yielding constructive Ramsey Theorems. The proofs for
dimension two and higher essentially use Brouwer's Bar Theorem.
In the proof development below we strengthen the notion of almost full
for dimension one in the following sense. A: nat -> Prop is called
Y-full if for every (strictly) increasing sequence f: nat -> nat we
have (A (f (Y f))). Here of course Y : (nat -> nat) -> nat. Given
YA-full A and YB-full B we construct X from YA and YB such that the
intersection of A and B is X-full. This is essentially [VB, Th. 5.4],
but now it can be done without using axioms, using only inductive
types. The generalization to higher dimensions will be much more
difficult and is not pursued here."""
flags: light-uninstall
url {
  src: "https://github.com/coq-contribs/ramsey/archive/v8.7.0.tar.gz"
  checksum: "md5=2dae4557a10bb6ab518e14e2cc8e7b8e"
}

Lint

Command
true
Return code
0

Dry install

Dry install with the current Coq version:

Command
opam install -y --show-action coq-ramsey.8.7.0 coq.8.6.1
Return code
5120
Output
[NOTE] Package coq is already installed (current version is 8.6.1).
The following dependencies couldn't be met:
  - coq-ramsey -> coq >= 8.7
Your request can't be satisfied:
  - No available version of coq satisfies the constraints
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-ramsey.8.7.0
Return code
0

Install dependencies

Command
true
Return code
0
Duration
0 s

Install

Command
true
Return code
0
Duration
0 s

Installation size

No files were installed.

Uninstall

Command
true
Return code
0
Missing removes
none
Wrong removes
none