Difference between revisions of "ApCoCoA-1:BB.TransformBBIntoGB"

From ApCoCoAWiki
(Added parameter and return value list.)
(Key and see section update.)
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</example>
 
</example>
 
     </description>
 
     </description>
     <see>BBasis</see>
+
     <see>BB.BBasis</see>
 
     <see>GBasis</see>
 
     <see>GBasis</see>
     <key>kaspar</key>
+
     <key>TransformBBIntoGB</key>
     <key>bb.transformbbintogb</key>
+
     <key>BB.TransformBBIntoGB</key>
     <key>borderbasis.transformbbintogb</key>
+
     <key>borderbasis.TransformBBIntoGB</key>
 
     <wiki-category>Package_borderbasis</wiki-category>
 
     <wiki-category>Package_borderbasis</wiki-category>
 
</command>
 
</command>

Revision as of 18:51, 22 April 2009

BB.TransformBBIntoGB

Transform a border basis into a Groebner basis.

Syntax

BB.TransformBBIntoGB(BB:LIST of POLY):LIST of POLY

Description

Please note: The function(s) explained on this page is/are using the ApCoCoAServer. You will have to start the ApCoCoAServer in order to use

it/them.

Let BB be a list of polynomials that form a <formula>\mathcal{O}_\sigma(I)</formula>-border basis of a zero-dimensional ideal <formula>I</formula>. This function extracts the reduced <formula>\sigma</formula>-Groebner basis contained in the <formula>\mathcal{O}_\sigma(I)</formula>-border basis BB and returns it as a list of polynomials.

  • @param BB A border basis of an ideal.

  • @return A list of polynomials that represents the reduced Groebner basis of the ideal generated by the input polynomials in BB.

Example

Use Z/(32003)[x,y,z],DegLex;
I := Ideal(
4*x+5*y+6,
2*x^2*z+4*y^2*z+4*y*z^2+3*x*y+25*y^2+7*x*z+2*y-3*z,
x^2*y+3*x*y*z+x*z^2+15*x^2+x*y+9*y*z+7
);
BB := BBasis(I); -- compute a border basis of I
GB := BB.TransformBBIntoGB(BB);
GB;

-------------------------------
[x + 8002y - 16000, y^2z - 5614yz^2 + 6179y^2 - 2246yz - 4492y - 3370z,
 y^3 + 12128yz^2 + 2045y^2 - 10508yz + 10240z^2 + 3337y - 8088z - 11495,
 z^4 - 928yz^2 + 15802z^3 - 8546y^2 - 13286yz - 15491z^2 - 13314y + 5553z - 11227,
 yz^3 - 9667yz^2 + 11342z^3 + 6752y^2 + 8104yz - 15091z^2 - 950y - 15081z + 885]
-------------------------------

BB.BBasis

GBasis