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\documentclass{article}
\usepackage{open-axiom}
\begin{document}
\title{\$SPAD/src/algebra gbintern.spad}
\author{The Axiom Team}
\maketitle
\begin{abstract}
\end{abstract}
\eject
\tableofcontents
\eject
\section{package GBINTERN GroebnerInternalPackage}
<<package GBINTERN GroebnerInternalPackage>>=
)abbrev package GBINTERN GroebnerInternalPackage
++ Author:
++ Date Created:
++ Date Last Updated:
++ Keywords:
++ Description
++ This package provides low level tools for Groebner basis computations
GroebnerInternalPackage(Dom, Expon, VarSet, Dpol): T == C where
Dom: GcdDomain
Expon: OrderedAbelianMonoidSup
VarSet: OrderedSet
Dpol: PolynomialCategory(Dom, Expon, VarSet)
NNI ==> NonNegativeInteger
------ Definition of Record critPair and Prinp
critPair ==> Record( lcmfij: Expon, totdeg: NonNegativeInteger,
poli: Dpol, polj: Dpol )
sugarPol ==> Record( totdeg: NonNegativeInteger, pol : Dpol)
Prinp ==> Record( ci:Dpol,tci:Integer,cj:Dpol,tcj:Integer,c:Dpol,
tc:Integer,rc:Dpol,trc:Integer,tF:Integer,tD:Integer)
Prinpp ==> Record( ci:Dpol,tci:Integer,cj:Dpol,tcj:Integer,c:Dpol,
tc:Integer,rc:Dpol,trc:Integer,tF:Integer,tDD:Integer,
tDF:Integer)
T== with
credPol: (Dpol, List(Dpol)) -> Dpol
++ credPol \undocumented
redPol: (Dpol, List(Dpol)) -> Dpol
++ redPol \undocumented
gbasis: (List(Dpol), Integer, Integer) -> List(Dpol)
++ gbasis \undocumented
critT: critPair -> Boolean
++ critT \undocumented
critM: (Expon, Expon) -> Boolean
++ critM \undocumented
critB: (Expon, Expon, Expon, Expon) -> Boolean
++ critB \undocumented
critBonD: (Dpol, List(critPair)) -> List(critPair)
++ critBonD \undocumented
critMTonD1: (List(critPair)) -> List(critPair)
++ critMTonD1 \undocumented
critMonD1: (Expon, List(critPair)) -> List(critPair)
++ critMonD1 \undocumented
redPo: (Dpol, List(Dpol) ) -> Record(poly:Dpol, mult:Dom)
++ redPo \undocumented
hMonic: Dpol -> Dpol
++ hMonic \undocumented
updatF: (Dpol, NNI, List(sugarPol) ) -> List(sugarPol)
++ updatF \undocumented
sPol: critPair -> Dpol
++ sPol \undocumented
updatD: (List(critPair), List(critPair)) -> List(critPair)
++ updatD \undocumented
minGbasis: List(Dpol) -> List(Dpol)
++ minGbasis \undocumented
lepol: Dpol -> Integer
++ lepol \undocumented
prinshINFO : Dpol -> Void
++ prinshINFO \undocumented
prindINFO: (critPair, Dpol, Dpol,Integer,Integer,Integer) -> Integer
++ prindINFO \undocumented
fprindINFO: (critPair, Dpol, Dpol, Integer,Integer,Integer
,Integer) -> Integer
++ fprindINFO \undocumented
prinpolINFO: List(Dpol) -> Void
++ prinpolINFO \undocumented
prinb: Integer-> Void
++ prinb \undocumented
critpOrder: (critPair, critPair) -> Boolean
++ critpOrder \undocumented
makeCrit: (sugarPol, Dpol, NonNegativeInteger) -> critPair
++ makeCrit \undocumented
virtualDegree : Dpol -> NonNegativeInteger
++ virtualDegree \undocumented
C== add
Ex ==> OutputForm
import OutputForm
------ Definition of intermediate functions
if Dpol has totalDegree: Dpol -> NonNegativeInteger then
virtualDegree p == totalDegree p
else
virtualDegree p == 0
------ ordering of critpairs
critpOrder(cp1,cp2) ==
cp1.totdeg < cp2.totdeg => true
cp2.totdeg < cp1.totdeg => false
cp1.lcmfij < cp2.lcmfij
------ creating a critical pair
makeCrit(sp1, p2, totdeg2) ==
p1 := sp1.pol
deg := sup(degree(p1), degree(p2))
e1 := subtractIfCan(deg, degree(p1))::Expon
e2 := subtractIfCan(deg, degree(p2))::Expon
tdeg := max(sp1.totdeg + virtualDegree(monomial(1,e1)),
totdeg2 + virtualDegree(monomial(1,e2)))
[deg, tdeg, p1, p2]$critPair
------ calculate basis
gbasis(Pol: List(Dpol), xx1: Integer, xx2: Integer ) ==
D, D1: List(critPair)
--------- create D and Pol
Pol1:= sort(degree #1 > degree #2, Pol)
basPols:= updatF(hMonic(first Pol1),virtualDegree(first Pol1),[])
Pol1:= rest(Pol1)
D:= nil
while not null Pol1 repeat
h:= hMonic(first(Pol1))
Pol1:= rest(Pol1)
toth := virtualDegree h
D1:= [makeCrit(x,h,toth) for x in basPols]
D:= updatD(critMTonD1(sort(critpOrder, D1)),
critBonD(h,D))
basPols:= updatF(h,toth,basPols)
D:= sort(critpOrder, D)
xx:= xx2
-------- loop
redPols := [x.pol for x in basPols]
while not null D repeat
D0:= first D
s:= hMonic(sPol(D0))
D:= rest(D)
h:= hMonic(redPol(s,redPols))
if xx1 = 1 then
prinshINFO(h)
h = 0 =>
if xx2 = 1 then
prindINFO(D0,s,h,# basPols, # D,xx)
xx:= 2
" go to top of while "
degree(h) = 0 =>
D:= nil
if xx2 = 1 then
prindINFO(D0,s,h,# basPols, # D,xx)
xx:= 2
basPols:= updatF(h,0,[])
leave "out of while"
D1:= [makeCrit(x,h,D0.totdeg) for x in basPols]
D:= updatD(critMTonD1(sort(critpOrder, D1)),
critBonD(h,D))
basPols:= updatF(h,D0.totdeg,basPols)
redPols := concat(redPols,h)
if xx2 = 1 then
prindINFO(D0,s,h,# basPols, # D,xx)
xx:= 2
Pol := [x.pol for x in basPols]
if xx2 = 1 then
prinpolINFO(Pol)
messagePrint(" THE GROEBNER BASIS POLYNOMIALS")
if xx1 = 1 and not one? xx2 then
messagePrint(" THE GROEBNER BASIS POLYNOMIALS")
Pol
--------------------------------------
--- erase multiple of e in D2 using crit M
critMonD1(e: Expon, D2: List(critPair))==
null D2 => nil
x:= first(D2)
critM(e, x.lcmfij) => critMonD1(e, rest(D2))
cons(x, critMonD1(e, rest(D2)))
----------------------------
--- reduce D1 using crit T and crit M
critMTonD1(D1: List(critPair))==
null D1 => nil
f1:= first(D1)
s1:= #(D1)
cT1:= critT(f1)
s1= 1 and cT1 => nil
s1= 1 => D1
e1:= f1.lcmfij
r1:= rest(D1)
e1 = (first r1).lcmfij =>
cT1 => critMTonD1(cons(f1, rest(r1)))
critMTonD1(r1)
D1 := critMonD1(e1, r1)
cT1 => critMTonD1(D1)
cons(f1, critMTonD1(D1))
-----------------------------
--- erase elements in D fullfilling crit B
critBonD(h:Dpol, D: List(critPair))==
null D => nil
x:= first(D)
critB(degree(h), x.lcmfij, degree(x.poli), degree(x.polj)) =>
critBonD(h, rest(D))
cons(x, critBonD(h, rest(D)))
-----------------------------
--- concat F and h and erase multiples of h in F
updatF(h: Dpol, deg:NNI, F: List(sugarPol)) ==
null F => [[deg,h]]
f1:= first(F)
critM(degree(h), degree(f1.pol)) => updatF(h, deg, rest(F))
cons(f1, updatF(h, deg, rest(F)))
-----------------------------
--- concat ordered critical pair lists D1 and D2
updatD(D1: List(critPair), D2: List(critPair)) ==
null D1 => D2
null D2 => D1
dl1:= first(D1)
dl2:= first(D2)
critpOrder(dl1,dl2) => cons(dl1, updatD(D1.rest, D2))
cons(dl2, updatD(D1, D2.rest))
-----------------------------
--- remove gcd from pair of coefficients
gcdCo(c1:Dom, c2:Dom):Record(co1:Dom,co2:Dom) ==
d:=gcd(c1,c2)
[(c1 exquo d)::Dom, (c2 exquo d)::Dom]
--- calculate S-polynomial of a critical pair
sPol(p:critPair)==
Tij := p.lcmfij
fi := p.poli
fj := p.polj
cc := gcdCo(leadingCoefficient fi, leadingCoefficient fj)
reductum(fi)*monomial(cc.co2,subtractIfCan(Tij, degree fi)::Expon) -
reductum(fj)*monomial(cc.co1,subtractIfCan(Tij, degree fj)::Expon)
----------------------------
--- reduce critpair polynomial mod F
--- iterative version
redPo(s: Dpol, F: List(Dpol)) ==
m:Dom := 1
Fh := F
while not ( s = 0 or null F ) repeat
f1:= first(F)
s1:= degree(s)
e := subtractIfCan(s1, degree(f1))
e case Expon =>
cc:=gcdCo(leadingCoefficient f1, leadingCoefficient s)
s:=cc.co1*reductum(s) - monomial(cc.co2,e)*reductum(f1)
m := m*cc.co1
F:= Fh
F:= rest F
[s,m]
redPol(s: Dpol, F: List(Dpol)) == credPol(redPo(s,F).poly,F)
----------------------------
--- crit T true, if e1 and e2 are disjoint
critT(p: critPair) == p.lcmfij = (degree(p.poli) + degree(p.polj))
----------------------------
--- crit M - true, if lcm#2 multiple of lcm#1
critM(e1: Expon, e2: Expon) ==
en := subtractIfCan(e2, e1)
en case Expon
----------------------------
--- crit B - true, if eik is a multiple of eh and eik not equal
--- lcm(eh,ei) and eik not equal lcm(eh,ek)
critB(eh:Expon, eik:Expon, ei:Expon, ek:Expon) ==
critM(eh, eik) and (eik ~= sup(eh, ei)) and (eik ~= sup(eh, ek))
----------------------------
--- make polynomial monic case Domain a Field
hMonic(p: Dpol) ==
p= 0 => p
-- inv(leadingCoefficient(p))*p
primitivePart p
-----------------------------
--- reduce all terms of h mod F (iterative version )
credPol(h: Dpol, F: List(Dpol) ) ==
null F => h
h0:Dpol:= monomial(leadingCoefficient h, degree h)
while (h:=reductum h) ~= 0 repeat
hred:= redPo(h, F)
h := hred.poly
h0:=(hred.mult)*h0 + monomial(leadingCoefficient(h),degree h)
h0
-------------------------------
---- calculate minimal basis for ordered F
minGbasis(F: List(Dpol)) ==
null F => nil
newbas := minGbasis rest F
cons(hMonic credPol( first(F), newbas),newbas)
-------------------------------
---- calculate number of terms of polynomial
lepol(p1:Dpol)==
n: Integer
n:= 0
while p1 ~= 0 repeat
n:= n + 1
p1:= reductum(p1)
n
---- print blanc lines
prinb(n: Integer)==
for x in 1..n repeat
messagePrint(" ")
---- print reduced critpair polynom
prinshINFO(h: Dpol)==
prinb(2)
messagePrint(" reduced Critpair - Polynom :")
prinb(2)
print(h::Ex)
prinb(2)
-------------------------------
---- print info string
prindINFO(cp: critPair, ps: Dpol, ph: Dpol, i1:Integer,
i2:Integer, n:Integer) ==
ll: List Prinp
a: Dom
cpi:= cp.poli
cpj:= cp.polj
if n = 1 then
prinb(1)
messagePrint("you choose option -info- ")
messagePrint("abbrev. for the following information strings are")
messagePrint(" ci => Leading monomial for critpair calculation")
messagePrint(" tci => Number of terms of polynomial i")
messagePrint(" cj => Leading monomial for critpair calculation")
messagePrint(" tcj => Number of terms of polynomial j")
messagePrint(" c => Leading monomial of critpair polynomial")
messagePrint(" tc => Number of terms of critpair polynomial")
messagePrint(" rc => Leading monomial of redcritpair polynomial")
messagePrint(" trc => Number of terms of redcritpair polynomial")
messagePrint(" tF => Number of polynomials in reduction list F")
messagePrint(" tD => Number of critpairs still to do")
prinb(4)
n:= 2
prinb(1)
a:= 1
ph = 0 =>
ps = 0 =>
ll:= [[monomial(a,degree(cpi)),lepol(cpi),
monomial(a,degree(cpj)),
lepol(cpj),ps,0,ph,0,i1,i2]$Prinp]
print(ll::Ex)
prinb(1)
n
ll:= [[monomial(a,degree(cpi)),lepol(cpi),
monomial(a,degree(cpj)),lepol(cpj),monomial(a,degree(ps)),
lepol(ps), ph,0,i1,i2]$Prinp]
print(ll::Ex)
prinb(1)
n
ll:= [[monomial(a,degree(cpi)),lepol(cpi),
monomial(a,degree(cpj)),lepol(cpj),monomial(a,degree(ps)),
lepol(ps),monomial(a,degree(ph)),lepol(ph),i1,i2]$Prinp]
print(ll::Ex)
prinb(1)
n
-------------------------------
---- print the groebner basis polynomials
prinpolINFO(pl: List(Dpol))==
n:Integer
n:= # pl
prinb(1)
n = 1 =>
messagePrint(" There is 1 Groebner Basis Polynomial ")
prinb(2)
messagePrint(" There are ")
prinb(1)
print(n::Ex)
prinb(1)
messagePrint(" Groebner Basis Polynomials. ")
prinb(2)
fprindINFO(cp: critPair, ps: Dpol, ph: Dpol, i1:Integer,
i2:Integer, i3:Integer, n: Integer) ==
ll: List Prinpp
a: Dom
cpi:= cp.poli
cpj:= cp.polj
if n = 1 then
prinb(1)
messagePrint("you choose option -info- ")
messagePrint("abbrev. for the following information strings are")
messagePrint(" ci => Leading monomial for critpair calculation")
messagePrint(" tci => Number of terms of polynomial i")
messagePrint(" cj => Leading monomial for critpair calculation")
messagePrint(" tcj => Number of terms of polynomial j")
messagePrint(" c => Leading monomial of critpair polynomial")
messagePrint(" tc => Number of terms of critpair polynomial")
messagePrint(" rc => Leading monomial of redcritpair polynomial")
messagePrint(" trc => Number of terms of redcritpair polynomial")
messagePrint(" tF => Number of polynomials in reduction list F")
messagePrint(" tD => Number of critpairs still to do")
messagePrint(" tDF => Number of subproblems still to do")
prinb(4)
n:= 2
prinb(1)
a:= 1
ph = 0 =>
ps = 0 =>
ll:= [[monomial(a,degree(cpi)),lepol(cpi),
monomial(a,degree(cpj)),
lepol(cpj),ps,0,ph,0,i1,i2,i3]$Prinpp]
print(ll::Ex)
prinb(1)
n
ll:= [[monomial(a,degree(cpi)),lepol(cpi),
monomial(a,degree(cpj)),lepol(cpj),monomial(a,degree(ps)),
lepol(ps), ph,0,i1,i2,i3]$Prinpp]
print(ll::Ex)
prinb(1)
n
ll:= [[monomial(a,degree(cpi)),lepol(cpi),
monomial(a,degree(cpj)),lepol(cpj),monomial(a,degree(ps)),
lepol(ps),monomial(a,degree(ph)),lepol(ph),i1,i2,i3]$Prinpp]
print(ll::Ex)
prinb(1)
n
@
\section{License}
<<license>>=
--Copyright (c) 1991-2002, The Numerical ALgorithms Group Ltd.
--All rights reserved.
--
--Redistribution and use in source and binary forms, with or without
--modification, are permitted provided that the following conditions are
--met:
--
-- - Redistributions of source code must retain the above copyright
-- notice, this list of conditions and the following disclaimer.
--
-- - Redistributions in binary form must reproduce the above copyright
-- notice, this list of conditions and the following disclaimer in
-- the documentation and/or other materials provided with the
-- distribution.
--
-- - Neither the name of The Numerical ALgorithms Group Ltd. nor the
-- names of its contributors may be used to endorse or promote products
-- derived from this software without specific prior written permission.
--
--THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS
--IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED
--TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A
--PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT OWNER
--OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL,
--EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO,
--PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR
--PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF
--LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING
--NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF THIS
--SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.
@
<<*>>=
<<license>>
<<package GBINTERN GroebnerInternalPackage>>
@
\eject
\begin{thebibliography}{99}
\bibitem{1} nothing
\end{thebibliography}
\end{document}
|
