Spracherkennung für: .gi vermutete Sprache: Unknown {[0] [0] [0]} [Methode: Schwerpunktbildung, einfache Gewichte, sechs Dimensionen]
##
## quotient remainder case 1:
## a is a rat fun in Z[w, x_1, ..., x_m] and p is prime
## return a list [quotient, remainder] with a = quotient*p + remainder
## and remainder is a polynomial with coeffs in [0..p-1]
##
BindGlobal( "QuotRemInt", function( a, p, flag )
local u, v, e, b, r, i, l;
if IsRat(a) then
# catch info
u := NumeratorRat(a);
v := DenominatorRat(a);
# compute
if flag=true then
return [0*a, a mod p];
elif v = 1 then
return QuotientRemainder(u,p);
else
Error("QuotRem: division case 1");
fi;
elif IsRationalFunction(a) then
# catch info
u := SplitRatFun(a); v := u[2]; u := u[1];
# compute
if flag=true then
return [0*a, a mod p];
elif v = 1 then
e := ExtRepPolynomialRatFun(u);
b := ShallowCopy(e);
r := ShallowCopy(e);
for i in [2,4..Length(e)] do
l := QuotientRemainder( e[i], p );
b[i] := l[1]; r[i] := l[2];
od;
b := PolynomialByExtRep(FamilyObj(a), b);
r := PolynomialByExtRep(FamilyObj(a), r);
return [b,r];
else
Error("QuotRem: division case 2");
fi;
else
Error("case not found");
fi;
end );
##
## quotient remainder case 2:
## a is a rat fun in Q[x_1, ..., x_m, w][p] and p is indeterminate
## return a list [quotient, remainder] with a = quotient*p + remainder
## and remainder is a polynomial with leading coeff in [0..p-1]
##
BindGlobal( "QuotRemPoly", function( f, p, flag )
local u, v, c;
if IsRat(f) or 0*f=f then return [0*f, f]; fi;
u := SplitRatFun(f); v := u[2]; u := u[1];
if flag=true then
c := PolynomialCoefficientsOfPolynomial(u,p)[1];
return [0*c, c/v];
elif v=v^0 then
c := PolynomialCoefficientsOfPolynomial(u,p)[1];
return [(u-c)/p, c];
else
c := PolynomialCoefficientsOfPolynomial(u,p)[1];
return [(u-c)/p, c]/v;
fi;
end );
##
## extract entries from SC table
##
BindGlobal( "GetEntryMult", function( SC, i, j )
local k, e;
if i = j then return [1,[]]; fi;
if i < j then
k := Sum([1..j-1])+i;
e := -1;
elif i > j then
k := Sum([1..i-1])+j;
e := 1;
fi;
if IsBound(SC.tab[k]) then
return [e, SC.tab[k]];
else
return [e, []];
fi;
end );
BindGlobal( "GetEntryPow", function( SC, i )
local k;
k := Sum([1..i]);
if IsBound(SC.tab[k]) then
return SC.tab[k];
else
return [];
fi;
end );
##
## exp is a list of coefficients [c1, ..., cn]
## a is rational
## word is a list [i1, c1, i2, c2, ...] with i1 an index in [1..n] and
## c1 is typically an entry from the SCTable
##
BindGlobal( "AddWordToExp", function( exp, a, word )
local i;
if a = 0 then return exp; fi;
for i in [1,3..Length(word)-1] do
if a = 1 then
exp[word[i]] := exp[word[i]] + word[i+1];
else
exp[word[i]] := exp[word[i]] + a * word[i+1];
fi;
od;
end );
##
## apply zeros
##
BindGlobal( "LRApplyZeros", function( SC, exp )
return List(exp, x -> RedPol(SC.ring.zeros, x));
end );
##
## apply the relations p bi and zeros
##
BindGlobal( "LRReduceExp", function( SC, exp )
local p, n, a, b, i, new, u, v;
p := SC.prime;
n := SC.dim;
new := ShallowCopy(exp);
for i in [1..n] do
b := GetEntryPow( SC, i );
if IsInt(p) then
a := QuotRemInt( new[i], p, (Length(b)=0) );
else
a := QuotRemPoly( new[i], p, (Length(b)=0) );
fi;
if a[1] <> 0 * a[1] then AddWordToExp( new, a[1], b ); fi;
new[i] := RedPol( SC.ring.zeros, a[2] );
od;
return MakeInt(new);
end );
##
## determine a reduced word
##
BindGlobal( "LRCollectWord", function( SC, word )
local exp;
exp := List([1..SC.dim], x -> 0);
AddWordToExp( exp, 1, word );
return LRReduceExp( SC, exp );
end );
##
## multiply
##
BindGlobal( "LRMultiply", function( SC, exp1, exp2 )
local exp, k, i, j, a, b;
exp := List([1..SC.dim], x -> 0);
for i in [1..SC.dim] do
for j in [1..SC.dim] do
if exp1[i] <> 0 and exp2[j] <> 0 then
a := GetEntryMult( SC, i, j );
b := a[1]*exp1[i]*exp2[j];
AddWordToExp( exp, b, a[2] );
fi;
od;
od;
return LRReduceExp( SC, exp );
end );
