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5.1.132 sba
Syntax:
sba ( ideal_expression)
sba ( ideal_expression, int_expression, int_expression )
Type:
- ideal
Purpose:
- returns a standard basis of an ideal with respect to the
monomial ordering of the basering.
A standard basis is a set of generators such that
the leading terms generate the leading ideal, resp. module.
Use optional
second and third arguments of type int to determine the respective variant of
the signature-based standard basis algorithm:
The second argument specifies the internal module order sba uses:
-
0 : induced Schreyer order on the signatures, non-incremental computation
of the basis
-
1 : position over term order, incremental computation of the basis
-
2 : term over position order, non-incremental computation
-
3 : Schreyer-weighted degree over index over leading term
The third argument specifies the rewrite order sba uses:
-
0 : using the rewrite order described in
http://dx.doi.org/10.1016/j.jsc.2010.06.019
-
1 : using the rewrite order described in
http://dx.doi.org/10.1016/j.jsc.2011.05.004
The standard call of sba(i) corresponds to sba(i,0,1) .
Note:
- The
standard basis is computed with an optimized version of known signature-based
algorithms like Faugere's F5 Algorithm. Whereas the correctness of the
algorithms is only guaranteed for global orderings, timings for pure
lexicographical orderings can be slow. In this situation you should try to
compute the basis w.r.t. the graded reverse-lexicographic ordering and then
convert to a basis for the lexicographical ordering using other methods (
see fglm and see grwalk_lib). If the algorithms tend to use too much
memory, you should try the other implemented standard basis algorithms (
see std, see groebner, and see slimgb).
Note that the behaviour of sba on an example can be rather different
depending on which variant you choose (second and third argument).
Example:
| // incremental F5 computation
ring r=32003,(x,y,z),dp;
poly s1=1x2y+151xyz10+169y21;
poly s2=1xz14+6x2y4+3z24;
poly s3=5y10z10x+2y20z10+y10z20+11x3;
ideal i=s1,s2,s3;
ideal j=sba(i,1,0);
// non-incremental F5 computation
ring rhom=32003,(x,y,z,h),dp;
ideal i=homog(imap(r,i),h);
ideal j=sba(i,0,0);
// non-incremental signature-based computation
ring whom=32003,(x,y,z),dp;
ideal i=fetch(r,i);
ideal j=sba(i);
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See
fglm;
groebner;
ideal;
ring;
slimgb;
std.
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