coq - The formal proof system

Age	Commit message (Collapse)	Author
2010-11-10	Integer division: quot and rem (trunc convention) in addition to div and mod	letouzey
	(floor convention). We follow Haskell naming convention: quot and rem are for Round-Toward-Zero (a.k.a Trunc, what Ocaml, C, Asm do by default, cf. the ex-ZOdiv file), while div and mod are for Round-Toward-Bottom (a.k.a Floor, what Coq does historically in Zdiv). We use unicode ÷ for quot, and infix rem for rem (which is actually remainder in full). This way, both conventions can be used at the same time. Definitions (and proofs of specifications) for div mod quot rem are migrated in a new file Zdiv_def. Ex-ZOdiv file is now Zquot. With this new organisation, no need for functor application in Zdiv and Zquot. On the abstract side, ZAxiomsSig now provides div mod quot rem. Zproperties now contains properties of them. In NZDiv, we stop splitting specifications in Common vs. Specific parts. Instead, the NZ specification is be extended later, even if this leads to a useless mod_bound_pos, subsumed by more precise axioms. A few results in ZDivTrunc and ZDivFloor are improved (sgn stuff). A few proofs in Nnat, Znat, Zabs are reworked (no more dependency to Zmin, Zmax). A lcm (least common multiple) is derived abstractly from gcd and division (and hence available for nat N BigN Z BigZ :-). In these new files NLcm and ZLcm, we also provide some combined properties of div mod quot rem gcd. We also provide a new file Zeuclid implementing a third division convention, where the remainder is always positive. This file instanciate the abstract one ZDivEucl. Operation names are ZEuclid.div and ZEuclid.modulo. git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@13633 85f007b7-540e-0410-9357-904b9bb8a0f7
2010-10-14	Numbers: new functions pow, even, odd + many reorganisations	letouzey
	- Simplification of functor names, e.g. ZFooProp instead of ZFooPropFunct - The axiomatisations of the different fonctions are now in {N,Z}Axioms.v apart for Z division (three separate flavours in there own files). Content of {N,Z}AxiomsSig is extended, old version is {N,Z}AxiomsMiniSig. - In NAxioms, the recursion field isn't that useful, since we axiomatize other functions and not define them (apart in the toy NDefOps.v). We leave recursion there, but in a separate NAxiomsFullSig. - On Z, the pow function is specified to behave as Zpower : a^(-1)=0 - In BigN/BigZ, (power:t->N->t) is now pow_N, while pow is t->t->t These pow could be more clever (we convert 2nd arg to N and use pow_N). Default "^" is now (pow:t->t->t). BigN/BigZ ring is adapted accordingly - In BigN, is_even is now even, its spec is changed to use Zeven_bool. We add an odd. In BigZ, we add even and odd. - In ZBinary (implem of ZAxioms by ZArith), we create an efficient Zpow to implement pow. This Zpow should replace the current linear Zpower someday. - In NPeano (implem of NAxioms by Arith), we create pow, even, odd functions, and we modify the div and mod functions for them to be linear, structural, tail-recursive. git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@13546 85f007b7-540e-0410-9357-904b9bb8a0f7
2010-07-24	Updated all headers for 8.3 and trunk	herbelin
	git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@13323 85f007b7-540e-0410-9357-904b9bb8a0f7
2010-02-10	Euclidean division for NArith	letouzey
	There was already a Ndiv and Nmod, but hiddent in ZOdiv_def. We higlight it by putting it in a separate file, prove its specification without using Z (but for the moment can't avoid a detour via nat, though), and then instantiate general results from Natural/Abstract/NDiv git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12726 85f007b7-540e-0410-9357-904b9bb8a0f7
2010-02-09	ZBinary (impl of Numbers via Z) reworked, comes earlier, subsumes ZOrderedType	letouzey
	git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12714 85f007b7-540e-0410-9357-904b9bb8a0f7
2010-01-11	Support "Local Obligation Tactic" (now the default in sections).	msozeau
	Update Numbers that was implicitely using [simpl_relation] instead of the default tactic [program_simpl]. git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12647 85f007b7-540e-0410-9357-904b9bb8a0f7
2010-01-07	Rework of GenericMinMax: new axiomatic, split logical/decidable parts, ↵	letouzey
	Leibniz part Moreover, instantiation like MinMax are now made without redefining generic properties (easier maintenance). We start using inner modules for qualifying (e.g. Z.max_comm). git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12638 85f007b7-540e-0410-9357-904b9bb8a0f7
2010-01-05	Numbers abstract layer: more Module Type, used especially for divisions.	letouzey
	Properties are now rather passed as functor arg instead of via Include or some inner modules. git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12629 85f007b7-540e-0410-9357-904b9bb8a0f7
2009-12-17	ZOdiv: fully use generic properties from ZDivTrunc.v	letouzey
	git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12596 85f007b7-540e-0410-9357-904b9bb8a0f7
2009-12-17	Division in Numbers : more properties, new filenames based on a paper by R. ↵	letouzey
	Boute Following R. Boute (paper "the Euclidean Definition of the Functions div and mod"): - ZDivFloor.v for Coq historical division (former ZDivCoq.v) - ZDivTrunc.v for Ocaml convention (former ZDivOcaml.v) - ZDivEucl.v for "Mathematical" convention 0<=r (former ZDivMath.v) These property functors are more or less finished (except that sign and abs stuff should be migrated to a separate file). git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12594 85f007b7-540e-0410-9357-904b9bb8a0f7
2009-12-16	Division in Numbers: more properties proved (still W.I.P.)	letouzey
	git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12591 85f007b7-540e-0410-9357-904b9bb8a0f7
2009-12-15	A generic euclidean division in Numbers (Still Work-In-Progress)	letouzey
	- For Z, we propose 3 conventions for the sign of the remainder... - Instanciation for nat in NPeano. - Beginning of instanciation in ZOdiv. Still many proofs to finish, etc, etc, but soon we will have a decent properties database for all divisions of all instances of Numbers (e.g. BigZ). git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12590 85f007b7-540e-0410-9357-904b9bb8a0f7
2009-09-17	Delete trailing whitespaces in all .{v,ml} files	glondu
	git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12337 85f007b7-540e-0410-9357-904b9bb8a0f7
2009-09-09	Znumtheory + Zdiv enriched with stuff from ZMicromega, misc improvements	letouzey
	Mostly results about Zgcd (commutativity, associativity, ...). Slight improvement of ZMicromega. Beware: some lemmas of Zdiv/ Znumtheory were asking for too strict or useless hypothesis. Some minor glitches may occur. By the way, some iff lemmas about negb in Bool.v git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@12313 85f007b7-540e-0410-9357-904b9bb8a0f7
2007-11-10	A result about Zsgn(a/b), both for Zdiv and ZOdiv	letouzey
	git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@10313 85f007b7-540e-0410-9357-904b9bb8a0f7
2007-11-10	First reasonably complete version of ZOdiv, including some properties	letouzey
	that aren't so nice after all. For instance, ((a+b*c) mod c) might differ from (a mod c), due to sign issues. Minor improvements to Zdiv git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@10312 85f007b7-540e-0410-9357-904b9bb8a0f7
2007-11-09	git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@10309 ↵	jforest
	85f007b7-540e-0410-9357-904b9bb8a0f7
2007-11-09	more about ZOdiv and ZOmod (still not finished)	letouzey
	git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@10307 85f007b7-540e-0410-9357-904b9bb8a0f7
2007-11-08	setoid_ring/Ring_zdiv is moved to ZArith and renamed to ZOdiv_def.	letouzey
	A file ZOdiv is added which contains results about this euclidean division. Interest compared with Zdiv: ZOdiv implements others (better?) conventions concerning negative numbers, in particular it is compatible with Caml div and mod. ZOdiv is only partially finished... git-svn-id: svn+ssh://scm.gforge.inria.fr/svn/coq/trunk@10302 85f007b7-540e-0410-9357-904b9bb8a0f7