Difference between revisions of "ApCoCoA-1:BBSGen.TraceSyzFull"

From ApCoCoAWiki
Line 38: Line 38:
 
OO:=BB.Box([1,1]);
 
OO:=BB.Box([1,1]);
 
BO:=BB.Border(OO);
 
BO:=BB.Border(OO);
 +
N:=Len(Indets());
 
  W:=BBSGen.Wmat(OO,BO,N);
 
  W:=BBSGen.Wmat(OO,BO,N);
 
Mu:=Len(OO);
 
Mu:=Len(OO);
 
Nu:=Len(BO);
 
Nu:=Len(BO);
N:=Len(Indets());
+
 
  
 
Use XX::=QQ[c[1..Mu,1..Nu],t[1..N,1..N,1..Mu,1..Mu]];  
 
Use XX::=QQ[c[1..Mu,1..Nu],t[1..N,1..N,1..Mu,1..Mu]];  

Revision as of 14:15, 14 June 2012

BBSGen.TraceSyzFull

This function computes the trace polynomials.


Syntax

TraceSyzFull(OO,BO,N);
TraceSyzFull(OO:LIST,BO:LIST,N:INTEGER):LIST

Description

Let l,k_{1},....,k_{s}\in {1,...,n} with s\in N^{+} and

    Pi=x_{k_{1}}...x_{k_{s}}x_{l}

a term (or power product) from the given Ring K[x_1,...,x_N]. Let the generic multiplication matrices A_{k_{1}},...,A_{k_{s}},A_{l}\in Mat(K[c]) be associated to the indeterminates in \Pi. We shall name the polynomial

   Trace([A_{k_{1}}...A_{k_{s}},A_{l}])\in K[c] 

as the trace polynomial with respect to Pi and variable x_{l}. We shall denote it by

 T_{Pi,x_{l}}}.  

This function computes every trace polynomial with respect to every Pi that is equal to a non-standard degree of an element from \tau and every variable from {x_1,...,x_N}.

NOTE: This function due to the growth of polynomials during the matrix multiplication, may not give result for every ring and order ideal. In that case we recommend

BBSGen.TraceSyzStep

and

BBSGen.TraceSyzLin

.



  • @param The order ideal OO, border BO, the number of Indeterminates of the Polynomial.(see <commandref>BB.Box</commandref>, <commandref>BB.Border</commandref> in package borderbasis)

  • @return The list of Trace Syzygy polynomials.


Example

    
Use R::=QQ[x[1..2]];
OO:=BB.Box([1,1]);
BO:=BB.Border(OO);
N:=Len(Indets());
 W:=BBSGen.Wmat(OO,BO,N);
Mu:=Len(OO);
Nu:=Len(BO);


Use XX::=QQ[c[1..Mu,1..Nu],t[1..N,1..N,1..Mu,1..Mu]]; 


BBSGen.TraceSyzFull(OO,BO,N);

[c[1,2]t[1,2,3,1] + c[2,2]t[1,2,3,2] + c[3,2]t[1,2,3,3] + c[4,2]t[1,2,3,4] +
 c[1,4]t[1,2,4,1] + c[2,4]t[1,2,4,2] + c[3,4]t[1,2,4,3] + c[4,4]t[1,2,4,4] + 
t[1,2,1,3] + t[1,2,2,4],
  2c[1,1]t[1,2,2,1] + 2c[2,1]t[1,2,2,2] + 2c[3,1]t[1,2,2,3] + 2c[4,1]t[1,2,2,4]+ 
2c[1,3]t[1,2,4,1] + 2c[2,3]t[1,2,4,2] + 2c[3,3]t[1,2,4,3] + 2c[4,3]t[1,2,4,4] 
+ 2t[1,2,1,2] + 2t[1,2,3,4],
  c[1,2]t[1,2,3,1] + c[2,2]t[1,2,3,2] + c[3,2]t[1,2,3,3] + c[4,2]t[1,2,3,4] + 
c[1,4]t[1,2,4,1] + c[2,4]t[1,2,4,2] + c[3,4]t[1,2,4,3] + c[4,4]t[1,2,4,4] + 
t[1,2,1,3] + t[1,2,2,4],
  2c[1,2]c[3,1]t[1,2,2,1] + 2c[1,4]c[4,1]t[1,2,2,1] + 2c[2,2]c[3,1]t[1,2,2,2] +
 2c[2,4]c[4,1]t[1,2,2,2] + 2c[3,1]c[3,2]t[1,2,2,3] + 2c[3,4]c[4,1]t[1,2,2,3] +
 2c[3,1]c[4,2]t[1,2,2,4] + 2c[4,1]c[4,4]t[1,2,2,4] + 2c[1,2]c[3,3]t[1,2,4,1] +
 2c[1,4]c[4,3]t[1,2,4,1] + 2c[2,2]c[3,3]t[1,2,4,2] + 2c[2,4]c[4,3]t[1,2,4,2] +
 2c[3,2]c[3,3]t[1,2,4,3] + 2c[3,4]c[4,3]t[1,2,4,3] + 2c[3,3]c[4,2]t[1,2,4,4] + 
2c[4,3]c[4,4]t[1,2,4,4] + 2c[1,1]t[1,2,2,3] + 2c[2,1]t[1,2,2,4] + 2c[1,4]t[1,2,3,1] + 
2c[2,4]t[1,2,3,2] + 2c[3,4]t[1,2,3,3] + 2c[4,4]t[1,2,3,4] + 2c[1,3]t[1,2,4,3] +
 2c[2,3]t[1,2,4,4] + 2t[1,2,1,4]]


BBSGen.Wmat

BBSGen.TraceSyzStep

BBSGen.TraceSyzLin