Difference between revisions of "ApCoCoA-1:SB.IsSagbi"
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+ | <see>ApCoCoA-1:SB.IsSagbiOf|SB.IsSagbiOf</see> | ||
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Latest revision as of 17:42, 27 October 2020
This article is about a function from ApCoCoA-1. If you are looking for the ApCoCoA-2 version of it, see Package sagbi/SB.Interreduced. |
SB.IsSagbi
Checks if a set of polynomials is a SAGBI-basis.
Syntax
SB.IsSagbi(G:LIST of POLY):BOOL
Description
This function checks if the given list of polynomials G is a SAGBI-basis, i.e. if the conditions of a SAGBI-basis are fulfilled. Then the corresponding boolean value will be returned.
@param G A list of polynomials.
@return The corresponding boolean value.
Example
Use R::=QQ[x,y]; G:=[x-y,x+y]; SB.IsSagbi(G); SB.Sagbi(G); ------------------------------------------------------- -- output: FALSE ------------------------------- -- The result is correct, because a SAGBI-basis of G is the following: [ x - y, x + y, y] ------------------------------- -- Done. -------------------------------
Example
Use R::=QQ[x[1..6]]; Generators:=[-x[4] - x[6], -x[1], x[2]^2 + x[3]^2, -4x[4]^2 - 5/2x[5]^2 + 2x[4]x[6] - 4x[6]^2, -2x[2]x[3]x[4] + x[2]^2x[5] - x[3]^2x[5] + 2x[2]x[3]x[6], -x[2]^2x[4] + x[3]^2x[4] - 2x[2]x[3]x[5] + x[2]^2x[6] - x[3]^2x[6]]; SB.IsSagbi(Generators); -- Computation of a SAGBI-basis Basis:=SB.Sagbi(Generators); SB.IsSagbi(Basis); ------------------------------------------------------- -- output: FALSE ------------------------------- -- Of course the test passes now because the computed SAGBI-basis is -- indeed a SAGBI-basis. TRUE ------------------------------- -- Done. -------------------------------
See also