Difference between revisions of "Package sagbi/SB.IsInSA"

Latest revision as of 13:22, 29 October 2020

This article is about a function from ApCoCoA-2. If you are looking for the ApCoCoA-1 version of it, see ApCoCoA-1:SB.IsInSubalgebra.

This function tests whether a polynomial is in a given Subalgebra.

SB.IsInSA(f: RINGELEM,S: TAGGED("$apcocoa/sagbi.Subalgebra")): BOOL

This function takes a polynomial f and a subalgebra S and tests whether f is an element of S using implicitization.

Use R ::= QQ[x,y,z];
S := SB.Subalgebra(R,[x^2,y+z]);
f := x^4 +2*x^3*y +x^2*y^2 +x^2 +2*x*y +y^2;
SB.IsInSA(f,S); -- true

@@ Line 1: / Line 1: @@
-{{Version|2}}
+{{Version|2|[[ApCoCoA-1:SB.IsInSubalgebra]]}}
 <command>
    <title>SB.IsInSA</title>
    <short_description>This function tests whether a polynomial is in a given Subalgebra.</short_description>
-   <syntax>
+   <syntax>SB.IsInSA(f: RINGELEM,S: TAGGED("$apcocoa/sagbi.Subalgebra")): BOOL</syntax>
-SB.IsInSA(f: RINGELEM,S: TAGGED("$apcocoa/sagbi.Subalgebra")): BOOL
-  </syntax>
    <description>
 This function takes a polynomial <tt>f</tt> and a subalgebra <tt>S</tt> and tests whether <tt>f</tt> is an element of <tt>S</tt> using implicitization.
@@ Line 19: / Line 17: @@
 S := SB.Subalgebra(R,[x^2,y+z]);
 f := x^4 +2*x^3*y +x^2*y^2 +x^2 +2*x*y +y^2;
-SB.IsInSA(f,S); -- true
+SB.IsInSA(f,S); -- true</example>
-    </example>
    </description>
    <seealso>
+    <see>Package sagbi/SB.Subalgebra</see>
      <see>Package sagbi/SB.IsInSA_SAGBI</see>
      <see>Package sagbi/SB.IsInSubalgebra</see>