\documentclass{article} \usepackage{axiom} \title{\File{src/interp/i-resolv.boot} Pamphlet} \author{The Axiom Team} \begin{document} \maketitle \begin{abstract} \end{abstract} \eject \tableofcontents \eject \begin{verbatim} new resolution: types and modes a type is any term (structure) which can be regarded as a functor call a basic type is the call of a nullary functor (e.g. (Integer)), otherwise it is a structured type (e.g. (Polynomial (Integer))) a functor together with its non-type arguments is called a type constructor a mode is a type which can be partially specified, i.e. a term containing term variables a term variable (denoted by control-L) stands for any nullary or unary function which was build from type constructors this means, a term variable can be: a function LAMBDA ().T, where T is a type a function LAMBDA (X).T(X), where X is a variable for a type and T a type containing this variable a function LAMBDA X.X ("control-L can be disregarded") examples: P(control-L) can stand for (Polynomial (RationalFunction (Integer))) G(control-L(I)) can stand for (Gaussian (Polynomial (Integer))), but also for (Gaussian (Integer)) Resolution of Two Types this symmetric resolution is done the following way: 1. if the same type constructor occurs in both terms, then the type tower is built around this constructor (resolveTTEq) 2. the next step is to look for two constructors which have an "algebraic relationship", this means, a rewrite rule is applicable (e.g. UP(x,I) and MP([x,y],I)) this is done by resolveTTRed 3. if none of this is true, then a tower of types is built e.g. resolve P I and G I to P G I \end{verbatim} \section{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. @ <<*>>= <> resolveTypeList u == u is [a,:tail] => -- if the list consists entirely of variables then keep it explicit allVars := a is ['Variable,v] => [v] nil while allVars for b in tail repeat allVars := b is ['Variable,v] => insert(v, allVars) nil allVars => null rest allVars => ['Variable, first allVars] ['OrderedVariableList,nreverse allVars] for md in tail repeat a := resolveTT(md,a) null a => return nil a throwKeyedMsg("S2IR0002",NIL) -- resolveTT is in CLAMMED BOOT resolveTypeListAny tl == rt := resolveTypeList tl null rt => $Any rt resolveTTAny(t1,t2) == (t3 := resolveTT(t1, t2)) => t3 $Any resolveTT1(t1,t2) == -- this is the main symmetric resolve -- first it looks for equal constructors on both sides -- then it tries to use a rewrite rule -- and finally it builds up a tower t1=t2 => t1 (t1 = '$NoValueMode) or (t2 = '$NoValueMode) => NIL (t1 = $Void) or (t2 = $Void) => $Void (t1 = $Any) or (t2 = $Any) => $Any t1 = '(Exit) => t2 t2 = '(Exit) => t1 t1 is ['Union,:.] => resolveTTUnion(t1,t2) t2 is ['Union,:.] => resolveTTUnion(t2,t1) STRINGP(t1) => t2 = $String => t2 NIL STRINGP(t2) => t1 = $String => t1 NIL null acceptableTypesToResolve(t1,t2) => NIL if compareTT(t1,t2) then t := t1 t1 := t2 t2 := t (t := resolveTTSpecial(t1,t2)) and isValidType t => t (t := resolveTTSpecial(t2,t1)) and isValidType t => t isSubTowerOf(t1,t2) and canCoerceFrom(t1,t2) => t2 isSubTowerOf(t2,t1) and canCoerceFrom(t2,t1) => t1 t := resolveTTRed(t1,t2) => t t := resolveTTCC(t1,t2) => t (t := resolveTTEq(t1,t2)) and isValidType t => t [c1,:arg1] := deconstructT t1 arg1 and [c2,:arg2] := deconstructT t2 arg2 and t := resolveTT1(last arg1,last arg2) t and ( resolveTT2(c1,c2,arg1,arg2,t) or resolveTT2(c2,c1,arg2,arg1,t) ) acceptableTypesToResolve(t1,t2) == -- this is temporary. It ensures that two types that have coerces -- that really should be converts don't automatically resolve. -- when the coerces go away, so will this. acceptableTypesToResolve1(t1,t2) and acceptableTypesToResolve1(t2,t1) acceptableTypesToResolve1(t1,t2) == t1 = $Integer => t2 = $String => NIL true t1 = $DoubleFloat or t1 = $Float => t2 = $String => NIL t2 = '(RationalNumber) => NIL t2 = [$QuotientField, $Integer] => NIL true true resolveTT2(c1,c2,arg1,arg2,t) == -- builds a tower and tests for all the necessary coercions t0 := constructM(c2,replaceLast(arg2,t)) canCoerceFrom(t,t0) and t1 := constructM(c1,replaceLast(arg1,t0)) canCoerceFrom(t0,t1) and t1 resolveTTUnion(t1 is ['Union,:doms],t2) == unionDoms1 := doms and first doms is [":",:.] => tagged := true [t for [.,.,t] in doms] tagged := false doms member(t2,unionDoms1) => t1 tagged => NIL t2 isnt ['Union,:doms2] => ud := nil bad := nil for d in doms while ^bad repeat d = '"failed" => ud := [d,:ud] null (d' := resolveTT(d,t2)) => bad := true ud := [d',:ud] bad => NIL ['Union,:REMDUP reverse ud] ud := nil bad := nil for d in doms2 while ^bad repeat d = '"failed" => ud := append(ud,[d]) null (d' := resolveTTUnion(t1,d)) => bad := true ud := append(ud,CDR d') bad => NIL ['Union,:REMDUP ud] resolveTTSpecial(t1,t2) == -- tries to resolve things that would otherwise get mangled in the -- rest of the resolve world. I'll leave it for Albi to fix those -- things. (RSS 1/-86) -- following is just an efficiency hack (t1 = '(Symbol) or t1 is ['OrderedVariableList,.]) and PAIRP(t2) and CAR(t2) in '(Polynomial RationalFunction) => t2 (t1 = '(Symbol)) and ofCategory(t2, '(IntegerNumberSystem)) => resolveTT1(['Polynomial, t2], t2) t1 = '(AlgebraicNumber) and (t2 = $Float or t2 = $DoubleFloat) => ['Expression, t2] t1 = '(AlgebraicNumber) and (t2 = ['Complex, $Float] or t2 = ['Complex, $DoubleFloat]) => ['Expression, CADR t2] t1 = '(AlgebraicNumber) and t2 is ['Complex,.] => resolveTT1('(Expression (Integer)), t2) t1 is ['SimpleAlgebraicExtension,F,Rep,poly] => t2 = Rep => t1 t2 is ['UnivariatePolynomial,x,R] and (t3 := resolveTT(t1, R)) => ['UnivariatePolynomial,x,t3] t2 is ['Variable,x] and (t3 := resolveTT(t1, F)) => ['UnivariatePolynomial,x,t3] t2 is ['Polynomial,R] and (R' := resolveTT(Rep, t2)) => R' = Rep => t1 ['Polynomial,t1] canCoerceFrom(t2,F) => t1 nil t1 = $PositiveInteger and ofCategory(t2,'(Ring)) => resolveTT1($Integer,t2) t1 = $NonNegativeInteger and ofCategory(t2,'(Ring)) => resolveTT1($Integer,t2) t1 is ['OrderedVariableList,[x]] => resolveTTSpecial(['Variable, x], t2) t1 is ['OrderedVariableList,vl] => ofCategory(t2,'(Ring)) => resolveTT(['Polynomial,'(Integer)],t2) resolveTT($Symbol,t2) t1 is ['Variable,x] => EQCAR(t2,'SimpleAlgebraicExtension) => resolveTTSpecial(t2,t1) t2 is ['UnivariatePolynomial,y,S] => x = y => t2 resolveTT1(['UnivariatePolynomial,x,'(Integer)],t2) t2 is ['Variable,y] => x = y => t1 -- ['OrderedVariableList, MSORT [x,y]] $Symbol t2 = '(Symbol) => t2 t2 is ['Polynomial,.] => t2 t2 is ['OrderedVariableList, vl] and member(x,vl) => t2 isPolynomialMode t2 => nil ofCategory(t2, '(IntegerNumberSystem)) => resolveTT(['Polynomial, t2], t2) resolveTT(['Polynomial,'(Integer)],t2) t1 is ['FunctionCalled,f] and t2 is ['FunctionCalled,g] => null (mf := get(f,'mode,$e)) => NIL null (mg := get(g,'mode,$e)) => NIL mf ^= mg => NIL mf t1 is ['UnivariatePolynomial,x,S] => EQCAR(t2,'Variable) => resolveTTSpecial(t2,t1) EQCAR(t2,'SimpleAlgebraicExtension) => resolveTTSpecial(t2,t1) t2 is ['UnivariatePolynomial,y,T] => (x = y) and (U := resolveTT1(S,T)) and ['UnivariatePolynomial,x,U] nil t1 = '(Pi) => t2 is ['Complex,d] => defaultTargetFE t2 t2 is ['AlgebraicNumber] => defaultTargetFE t2 EQCAR(t2, 'Variable) or t2 = $Symbol => defaultTargetFE($Symbol) t2 is ['Polynomial, .] or t2 is ['Fraction, ['Polynomial, .]] => defaultTargetFE(t2) nil t1 is ['Polynomial,['Complex,u1]] and t2 is ['Complex,u2] => resolveTT1(t1,u2) t1 is ['Polynomial,R] and t2 is ['Complex,S] => containsPolynomial(S) => resolveTT1(['Polynomial,['Complex,R]],t2) ['Polynomial,['Complex,resolveTT1(R,S)]] t1 is ['Expression, R] and t2 is ['Complex,S] => dom' := resolveTT(R, t2) null dom' => nil ['Expression, dom'] t1 is ['Segment, dom] and t2 isnt ['Segment,.] => dom' := resolveTT(dom, t2) null dom' => nil ['Segment, dom'] nil resolveTTCC(t1,t2) == -- tries to use canCoerceFrom information to see if types can be -- coerced to one another gt21 := GGREATERP(t2,t1) (c12 := canCoerceFrom(t1,t2)) and gt21 => t2 c21 := canCoerceFrom(t2,t1) null (c12 or c21) => NIL c12 and not c21 => t2 c21 and not c12 => t1 -- both are coerceable to each other if gt21 then t1 else t2 resolveTTEq(t1,t2) == -- tries to find the constructor of t1 somewhere in t2 (or vice versa) -- and move the other guy to the top [c1,:arg1] := deconstructT t1 [c2,:arg2] := deconstructT t2 t := resolveTTEq1(c1,arg1,[c2,arg2]) => t t := ( arg1 and resolveTTEq2(c2,arg2,[c1,arg1]) ) => t arg2 and resolveTTEq2(c1,arg1,[c2,arg2]) resolveTTEq1(c1,arg1,TL is [c2,arg2,:.]) == -- takes care of basic types and of types with the same constructor -- calls resolveTT1 on the arguments in the second case null arg1 and null arg2 => canCoerceFrom(c1,c2) => constructTowerT(c2,CDDR TL) canCoerceFrom(c2,c1) and constructTowerT(c1,CDDR TL) c1=c2 and [c2,arg2,:TL] := bubbleType TL until null arg1 or null arg2 or not t repeat t := resolveTT1(CAR arg1,CAR arg2) => arg := CONS(t,arg) arg1 := CDR arg1 arg2 := CDR arg2 t and null arg1 and null arg2 and t0 := constructM(c1,nreverse arg) constructTowerT(t0,TL) resolveTTEq2(c1,arg1,TL is [c,arg,:.]) == -- tries to resolveTTEq the type [c1,arg1] with the last argument -- of the type represented by TL [c2,:arg2] := deconstructT last arg TL := [c2,arg2,:TL] t := resolveTTEq1(c1,arg1,TL) => t arg2 and resolveTTEq2(c1,arg1,TL) resolveTTRed(t1,t2) == -- the same function as resolveTTEq, but instead of testing for -- constructor equality, it looks whether a rewrite rule can be applied t := resolveTTRed1(t1,t2,NIL) => t [c1,:arg1] := deconstructT t1 t := arg1 and resolveTTRed2(t2,last arg1,[c1,arg1]) => t [c2,:arg2] := deconstructT t2 arg2 and resolveTTRed2(t1,last arg2,[c2,arg2]) resolveTTRed1(t1,t2,TL) == -- tries to apply a reduction rule on (Resolve t1 t2) -- then it creates a type using the result and TL EQ(t,term1RW(t := ['Resolve,t1,t2],$Res)) and EQ(t,term1RW(t := ['Resolve,t2,t1],$Res)) => NIL [c2,:arg2] := deconstructT t2 [c2,arg2,:TL] := bubbleType [c2,arg2,:TL] t2 := constructM(c2,arg2) l := term1RWall(['Resolve,t1,t2],$Res) for t0 in l until t repeat t := resolveTTRed3 t0 l and t => constructTowerT(t,TL) l := term1RWall(['Resolve,t2,t1],$Res) for t0 in l until t repeat t := resolveTTRed3 t0 l and t and constructTowerT(t,TL) resolveTTRed2(t1,t2,TL) == -- tries to resolveTTRed t1 and t2 and build a type using TL t := resolveTTRed1(t1,t2,TL) => t [c2,:arg2] := deconstructT t2 arg2 and resolveTTRed2(t1,last arg2,[c2,arg2,:TL]) resolveTTRed3(t) == -- recursive resolveTTRed which handles all subterms of the form -- (Resolve t1 t2) or subterms which have to be interpreted atom t => t t is ['Resolve,a,b] => ( t1 := resolveTTRed3 a ) and ( t2 := resolveTTRed3 b ) and resolveTT1(t1,t2) t is ['Incl,a,b] => member(a,b) and b t is ['SetDiff,a,b] => intersection(a,b) and SETDIFFERENCE(a,b) t is ['SetComp,a,b] => and/[member(x,a) for x in b] and SETDIFFERENCE(a,b) t is ['SetInter,a,b] => intersection(a,b) t is ['SetUnion,a,b] => union(a,b) t is ['VarEqual,a,b] => (a = b) and a t is ['SetEqual,a,b] => (and/[member(x,a) for x in b] and and/[member(x,b) for x in a]) and a [( atom x and x ) or ((not cs and x and not interpOp? x and x) or resolveTTRed3 x) or return NIL for x in t for cs in GETDATABASE(CAR t, 'COSIG) ] interpOp?(op) == PAIRP(op) and CAR(op) in '(Incl SetDiff SetComp SetInter SetUnion VarEqual SetEqual) --% Resolve Type with Category resolveTCat(t,c) == -- this function attempts to find a type tc of category c such that -- t can be coerced to tc. NIL returned for failure. -- Example: t = Integer, c = Field ==> tc = RationalNumber -- first check whether t already belongs to c ofCategory(t,c) => t -- if t is built by a parametrized constructor and there is a -- condition on the parameter that matches the category, try to -- recurse. An example of this is (G I, Field) -> G RN rest(t) and (tc := resolveTCat1(t,c)) => tc -- now check some specific niladic categories c in '((Field) (EuclideanDomain)) and ofCategory(t,'(IntegralDomain))=> eqType [$QuotientField, t] c = '(Field) and t = $Symbol => ['RationalFunction,$Integer] c = '(Ring) and t is ['FactoredForm,t0] => ['FactoredRing,t0] (t is [t0]) and (sd := getImmediateSuperDomain(t0)) and sd ^= t0 => resolveTCat(sd,c) SIZE(td := deconstructT t) ^= 2=> NIL SIZE(tc := deconstructT c) ^= 2 => NIL ut := underDomainOf t null isValidType(uc := last tc) => NIL null canCoerceFrom(ut,uc) => NIL nt := constructT(first td,[uc]) ofCategory(nt,c) => nt NIL resolveTCat1(t,c) == -- does the hard work of looking at conditions on under domains -- if null (ut := getUnderModeOf(t)) then ut := last dt null (conds := getConditionsForCategoryOnType(t,c)) => NIL --rest(conds) => NIL -- will handle later cond := first conds cond isnt [.,['has, pat, c1],:.] => NIL rest(c1) => NIL -- make it simple argN := 0 t1 := nil for ut in rest t for i in 1.. while (argN = 0) repeat sharp := INTERNL('"#",STRINGIMAGE i) sharp = pat => argN := i t1 := ut null t1 => NIL null (t1' := resolveTCat(t1,c1)) => NIL t' := copy t t'.argN := t1' t' getConditionsForCategoryOnType(t,cat) == getConditionalCategoryOfType(t,[NIL],['ATTRIBUTE,cat]) getConditionalCategoryOfType(t,conditions,match) == if PAIRP t then t := first t t in '(Union Mapping Record) => NIL conCat := GETDATABASE(t,'CONSTRUCTORCATEGORY) REMDUP CDR getConditionalCategoryOfType1(conCat,conditions,match,[NIL]) getConditionalCategoryOfType1(cat,conditions,match,seen) == cat is ['Join,:cs] or cat is ['CATEGORY,:cs] => null cs => conditions getConditionalCategoryOfType1([first cat,:rest cs], getConditionalCategoryOfType1(first cs,conditions,match,seen), match,seen) cat is ['IF,., cond,.] => matchUpToPatternVars(cond,match,NIL) => RPLACD(conditions,CONS(cat,CDR conditions)) conditions conditions cat is [catName,:.] and (GETDATABASE(catName,'CONSTRUCTORKIND) = 'category) => cat in CDR seen => conditions RPLACD(seen,[cat,:CDR seen]) subCat := GETDATABASE(catName,'CONSTRUCTORCATEGORY) -- substitute vars of cat into category for v in rest cat for vv in $TriangleVariableList repeat subCat := SUBST(v,vv,subCat) getConditionalCategoryOfType1(subCat,conditions,match,seen) conditions matchUpToPatternVars(pat,form,patAlist) == -- tries to match pattern variables (of the # form) in pat -- against expressions in form. If one is found, it is checked -- against the patAlist to make sure we are using the same expression -- each time. EQUAL(pat,form) => true isSharpVarWithNum(pat) => -- see is pattern variable is in alist (p := ASSOC(pat,patAlist)) => EQUAL(form,CDR p) patAlist := [[pat,:form],:patAlist] true PAIRP(pat) => not (PAIRP form) => NIL matchUpToPatternVars(CAR pat, CAR form,patAlist) and matchUpToPatternVars(CDR pat, CDR form,patAlist) NIL --% Resolve Type with Mode -- only implemented for nullary control-L's (which stand for types) resolveTMOrCroak(t,m) == resolveTM(t,m) or throwKeyedMsg("S2IR0004",[t,m]) resolveTM(t,m) == -- resolves a type with a mode which may be partially specified startTimingProcess 'resolve $Subst : local := NIL $Coerce : local := 'T t := eqType t m := eqType SUBSTQ("**",$EmptyMode,m) tt := resolveTM1(t,m) result := tt and isValidType tt and eqType tt stopTimingProcess 'resolve result resolveTM1(t,m) == -- general resolveTM, which looks for a term variable -- otherwise it looks whether the type has the same top level -- constructor as the mode, looks for a rewrite rule, or builds up -- a tower t=m => t m is ['Union,:.] => resolveTMUnion(t,m) m = '(Void) => m m = '(Any) => m m = '(Exit) => t containsVars m => isPatternVar m => p := ASSQ(m,$Subst) => $Coerce => tt := resolveTT1(t,CDR p) => RPLACD(p,tt) and tt NIL t=CDR p and t $Subst := CONS(CONS(m,t),$Subst) t atom(t) or atom(m) => NIL (t is ['Record,:tr]) and (m is ['Record,:mr]) and (tt := resolveTMRecord(tr,mr)) => tt t is ['Record,:.] or m is ['Record,:.] => NIL t is ['Variable, .] and m is ['Mapping, :.] => m t is ['FunctionCalled, .] and m is ['Mapping, :.] => m if isEqualOrSubDomain(t, $Integer) then t := $Integer tt := resolveTMEq(t,m) => tt $Coerce and tt := resolveTMRed(t,m) => tt resolveTM2(t,m) $Coerce and canCoerceFrom(t,m) and m resolveTMRecord(tr,mr) == #tr ^= #mr => NIL ok := true tt := NIL for ta in tr for ma in mr while ok repeat -- element is [':,tag,mode] CADR(ta) ^= CADR(ma) => ok := NIL -- match tags ra := resolveTM1(CADDR ta, CADDR ma) -- resolve modes null ra => ok := NIL tt := CONS([CAR ta,CADR ta,ra],tt) null ok => NIL ['Record,nreverse tt] resolveTMUnion(t, m is ['Union,:ums]) == isTaggedUnion m => resolveTMTaggedUnion(t,m) -- resolves t with a Union type t isnt ['Union,:uts] => ums := REMDUP spliceTypeListForEmptyMode([t],ums) ums' := nil success := nil for um in ums repeat (um' := resolveTM1(t,um)) => success := true um' in '(T TRUE) => ums' := [um,:ums'] ums' := [um',:ums'] ums' := [um,:ums'] -- remove any duplicate domains that might have been created m' := ['Union,:REMDUP reverse ums'] success => null CONTAINED('_*_*,m') => m' t = $Integer => NIL resolveTM1($Integer,m') NIL -- t is actually a Union if we got here ums := REMDUP spliceTypeListForEmptyMode(uts,ums) bad := nil doms := nil for ut in uts while ^bad repeat (m' := resolveTMUnion(ut,['Union,:ums])) => doms := append(CDR m',doms) bad := true bad => NIL ['Union,:REMDUP doms] resolveTMTaggedUnion(t, m is ['Union,:ums]) == NIL spliceTypeListForEmptyMode(tl,ml) == -- splice in tl for occurrence of ** in ml null ml => nil ml is [m,:ml'] => m = "**" => append(tl,spliceTypeListForEmptyMode(tl,ml')) [m,:spliceTypeListForEmptyMode(tl,ml')] resolveTM2(t,m) == -- resolves t with the last argument of m and builds up a tower [cm,:argm] := deconstructT m argm and tt := resolveTM1(t,last argm) tt and ttt := constructM(cm,replaceLast(argm,tt)) ttt and canCoerceFrom(tt,ttt) and ttt resolveTMEq(t,m) == -- tests whether t and m have the same top level constructor, which, -- in the case of t, could be bubbled up (res := resolveTMSpecial(t,m)) => res [cm,:argm] := deconstructT m c := containsVars cm TL := NIL until b or not t repeat [ct,:argt] := deconstructT t b := c => SL := resolveTMEq1(ct,cm) not EQ(SL,'failed) ct=cm not b => TL := [ct,argt,:TL] t := argt and last argt b and t := resolveTMEq2(cm,argm,[ct,argt,:TL]) if t then for p in SL repeat $Subst := augmentSub(CAR p,CDR p,$Subst) t resolveTMSpecial(t,m) == -- a few special cases t = $AnonymousFunction and m is ['Mapping,:.] => m t is ['Variable,x] and m is ['OrderedVariableList,le] => isPatternVar le => ['OrderedVariableList,[x]] PAIRP(le) and member(x,le) => le NIL t is ['Fraction, ['Complex, t1]] and m is ['Complex, m1] => resolveTM1(['Complex, ['Fraction, t1]], m) t is ['Fraction, ['Polynomial, ['Complex, t1]]] and m is ['Complex, m1] => resolveTM1(['Complex, ['Fraction, ['Polynomial, t1]]], m) t is ['Mapping,:lt] and m is ['Mapping,:lm] => #lt ^= #lm => NIL l := NIL ok := true for at in lt for am in lm while ok repeat (ok := resolveTM1(at,am)) => l := [ok,:l] ok and ['Mapping,:reverse l] t is ['Segment,u] and m is ['UniversalSegment,.] => resolveTM1(['UniversalSegment, u], m) NIL resolveTMEq1(ct,cm) == -- ct and cm are type constructors -- tests for a match from cm to ct -- the result is a substitution or 'failed not (CAR ct=CAR cm) => 'failed SL := NIL ct := CDR ct cm := CDR cm b := 'T while ct and cm and b repeat xt := CAR ct ct := CDR ct xm := CAR cm cm := CDR cm if not (atom xm) and CAR xm = ":" -- i.e. Record and CAR xt = ":" and CADR xm = CADR xt then xm := CADDR xm xt := CADDR xt b := xt=xm => 'T isPatternVar(xm) and p := ASSQ(xm,$Subst) => xt=CDR p p := ASSQ(xm,SL) => xt=CDR p SL := augmentSub(xm,xt,SL) b => SL 'failed resolveTMEq2(cm,argm,TL) == -- [cm,argm] is a deconstructed mode, -- TL is a deconstructed type t [ct,argt,:TL] := $Coerce => bubbleType TL TL null TL and null argm => constructM(ct,argt) -- null argm => NIL arg := NIL while argt and argm until not tt repeat x1 := CAR argt argt := CDR argt x2 := CAR argm argm := CDR argm tt := resolveTM1(x1,x2) => arg := CONS(tt,arg) null argt and null argm and tt and constructM(ct,nreverse arg) resolveTMRed(t,m) == -- looks for an applicable rewrite rule at any level of t and tries -- to bubble this constructor up to the top to t TL := NIL until b or not t repeat [ct,:argt] := deconstructT t b := not EQ(t,term1RW(['Resolve,t,m],$ResMode)) and [c0,arg0,:TL0] := bubbleType [ct,argt,:TL] null TL0 and l := term1RWall(['Resolve,constructM(c0,arg0),m],$ResMode) for t0 in l until t repeat t := resolveTMRed1 t0 l and t b or TL := [ct,argt,:TL] t := argt and last argt b and t resolveTMRed1(t) == -- recursive resolveTMRed which handles all subterms of the form -- (Resolve a b) atom t => t t is ['Resolve,a,b] => ( a := resolveTMRed1 a ) and ( b := resolveTMRed1 b ) and resolveTM1(a,b) t is ['Incl,a,b] => PAIRP b and member(a,b) and b t is ['Diff,a,b] => PAIRP a and member(b,a) and SETDIFFERENCE(a,[b]) t is ['SetIncl,a,b] => PAIRP b and and/[member(x,b) for x in a] and b t is ['SetDiff,a,b] => PAIRP b and PAIRP b and intersection(a,b) and SETDIFFERENCE(a,b) t is ['VarEqual,a,b] => (a = b) and b t is ['SetComp,a,b] => PAIRP a and PAIRP b and and/[member(x,a) for x in b] and SETDIFFERENCE(a,b) t is ['SimpleAlgebraicExtension,a,b,p] => -- this is a hack. RSS ['SimpleAlgebraicExtension, resolveTMRed1 a, resolveTMRed1 b,p] [( atom x and x ) or resolveTMRed1 x or return NIL for x in t] --% Type and Mode Representation eqType(t) == -- looks for an equivalent but more simple type -- eg, eqType QF I = RN -- the new algebra orginization no longer uses these sorts of types -- termRW(t,$TypeEQ) t equiType(t) == -- looks for an equivalent but expanded type -- eg, equiType RN == QF I -- the new algebra orginization no longer uses these sorts of types -- termRW(t,$TypeEqui) t getUnderModeOf d == not PAIRP d => NIL -- n := LASSOC(first d,$underDomainAlist) => d.n ----> $underDomainAlist NOW always NIL for a in rest d for m in rest destructT d repeat if m then return a --deconstructM(t) == -- -- M is a type, which may contain type variables -- -- results in a pair (type constructor . mode arguments) -- CDR t and constructor? CAR t => -- dt := destructT CAR t -- args := [ x for d in dt for y in t | ( x := d and y ) ] -- c := [ x for d in dt for y in t | ( x := not d and y ) ] -- CONS(c,args) -- CONS(t,NIL) deconstructT(t) == -- M is a type, which may contain type variables -- results in a pair (type constructor . mode arguments) KDR t and constructor? CAR t => dt := destructT CAR t args := [ x for d in dt for y in t | ( x := d and y ) ] c := [ x for d in dt for y in t | ( x := not d and y ) ] CONS(c,args) CONS(t,NIL) constructT(c,A) == -- c is a type constructor, A a list of argument types A => [if d then POP A else POP c for d in destructT CAR c] c constructM(c,A) == -- replaces top level RE's or QF's by equivalent types, if possible containsVars(c) or containsVars(A) => NIL -- collapses illegal FE's CAR(c) = $FunctionalExpression => eqType defaultTargetFE CAR A eqType constructT(c,A) replaceLast(A,t) == -- replaces the last element of the nonempty list A by t (constructively nreverse RPLACA(reverse A,t) destructT(functor)== -- provides a list of booleans, which indicate whether the arguments -- to the functor are category forms or not GETDATABASE(opOf functor,'COSIG) constructTowerT(t,TL) == -- t is a type, TL a list of constructors and argument lists -- t is embedded into TL while TL and t repeat [c,arg,:TL] := TL t0 := constructM(c,replaceLast(arg,t)) t := canCoerceFrom(t,t0) and t0 t bubbleType(TL) == -- tries to move the last constructor in TL upwards -- uses canCoerceFrom to test whether two constructors can be bubbled [c1,arg1,:T1] := TL null T1 or null arg1 => TL [c2,arg2,:T2] := T1 t := last arg1 t2 := constructM(c2,replaceLast(arg2,t)) arg1 := replaceLast(arg1,t2) newCanCoerceCommute(c2,c1) or canCoerceCommute(c2, c1) => bubbleType [c1,arg1,:T2] TL bubbleConstructor(TL) == -- TL is a nonempty list of type constructors and nonempty argument -- lists representing a deconstructed type -- then the lowest constructor is bubbled to the top [c,arg,:T1] := TL t := last arg until null T1 repeat [c1,arg1,:T1] := T1 arg1 := replaceLast(arg1,t) t := constructT(c1,arg1) constructT(c,replaceLast(arg,t)) compareTT(t1,t2) == -- 'T if type t1 is more nested than t2 -- otherwise 'T if t1 is lexicographically greater than t2 EQCAR(t1,$QuotientField) or MEMQ(opOf t2,[$QuotientField, 'SimpleAlgebraicExtension]) => NIL CGREATERP(PRIN2CVEC opOf t1,PRIN2CVEC opOf t2) @ \eject \begin{thebibliography}{99} \bibitem{1} nothing \end{thebibliography} \end{document}