Difference between revisions of "ApCoCoA-1:NCo.KernelOfHomomorphism"
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<example> | <example> | ||
-- Group ring Q<a,b>/<F11,F12,F13> with the triangle group of order 576 | -- Group ring Q<a,b>/<F11,F12,F13> with the triangle group of order 576 | ||
− | F11:=[[1, | + | F11:=[[1,"aa"], [-1,""]]; |
− | F12:=[[1, | + | F12:=[[1,"bbb"], [-1,""]]; |
− | F13:=[[1, | + | F13:=[[1,"abababbabbabababbabb"], [-1,""]]; |
-- Group ring Q<x,y,X,Y>/<F21,F22,F23,F24,F25,F26> with the fundamental group of 3-manifold of order 72 | -- Group ring Q<x,y,X,Y>/<F21,F22,F23,F24,F25,F26> with the fundamental group of 3-manifold of order 72 | ||
− | F21:=[[1, | + | F21:=[[1,"xxx"],[1,"yyy"]]; --x^3=y^3 |
− | F22:=[[1, | + | F22:=[[1,"xxx"],[-1,"yXyX"]]; --x^3p=(yx^-1)^2 |
− | F23:=[[1, | + | F23:=[[1,"Xx"],[-1,""]]; |
− | F24:=[[1, | + | F24:=[[1,"xX"],[-1,"Xx"]]; |
− | F25:=[[1, | + | F25:=[[1,"Yy"],[-1,""]]; |
− | F26:=[[1, | + | F26:=[[1,"yY"],[-1,"Yy"]]; |
-- Q-group algebra homomorphism phi: Q<a,b>/<F11,F12,F13> -->Q<x,y,X,Y>/<F21,F22,F23,F24,F25,F26> | -- Q-group algebra homomorphism phi: Q<a,b>/<F11,F12,F13> -->Q<x,y,X,Y>/<F21,F22,F23,F24,F25,F26> | ||
-- defined by mapping a to x2+1 and b to 0 | -- defined by mapping a to x2+1 and b to 0 | ||
− | D1:=[[1, | + | D1:=[[1,"a"],[-1,"x"]]; -- map a to x |
− | D2:=[[1, | + | D2:=[[1,"b"]]; -- map b to 0 |
G:=[D1,D2,F21,F22,F23,F24,F25,F26]; | G:=[D1,D2,F21,F22,F23,F24,F25,F26]; | ||
− | NCo.SetX( | + | NCo.SetX("xyXYab"); |
− | NCo.SetOrdering( | + | NCo.SetOrdering("ELIM"); -- we want to eliminate x,y,X and Y |
Gb:=NCo.ReducedGB(G); | Gb:=NCo.ReducedGB(G); | ||
− | KGb:=NCo.FindPolynomials( | + | KGb:=NCo.FindPolynomials("ab",Gb); |
Concat(KGb,[F11,F12,F13]); -- a generating system of the ker(phi) | Concat(KGb,[F11,F12,F13]); -- a generating system of the ker(phi) | ||
− | [[[1, | + | [[[1, "b"]], [[1, "aaaaaaaaaaaaaaaaaa"], [-1, ""]], [[1, "aa"], [-1, ""]], [[1, "bbb"], [-1, ""]], |
− | [[1, | + | [[1, "abababbabbabababbabb"], [-1, ""]]] |
------------------------------- | ------------------------------- | ||
</example> | </example> |
Latest revision as of 13:40, 29 October 2020
This article is about a function from ApCoCoA-1. |
NCo.KernelOfHomomorphism
The kernel of an algebra homomorphism.
Syntax
Description
Proposition (Kernel of an Algebra Homomorphism): Let I be a two-sided ideal in the free monoid ring K<x_1,...,x_n>, and let J be a two-sided ideal in the free monoid ring K<y_1,...,y_m>. Moreover, let g_1,...,g_m be polynomials in K<x_1,...,x_n>, and let phi: K<y_1,...,y_m>/J-->K<x_1,...,x_n>/I be a homomorphism of K-algebras defined by phi(y_i+J)=g_i+I for i=1,...,m. We form the free monoid ring K<x_1,...,x_n,y_1,...,y_m>, and let D be the diagonal ideal generated by the set {y_1-g_1,...,y_m-g_m}. Then we have ker(phi)=((D+J) intersets K<y_1,...,y_m>)+I.
Example
-- Group ring Q<a,b>/<F11,F12,F13> with the triangle group of order 576 F11:=[[1,"aa"], [-1,""]]; F12:=[[1,"bbb"], [-1,""]]; F13:=[[1,"abababbabbabababbabb"], [-1,""]]; -- Group ring Q<x,y,X,Y>/<F21,F22,F23,F24,F25,F26> with the fundamental group of 3-manifold of order 72 F21:=[[1,"xxx"],[1,"yyy"]]; --x^3=y^3 F22:=[[1,"xxx"],[-1,"yXyX"]]; --x^3p=(yx^-1)^2 F23:=[[1,"Xx"],[-1,""]]; F24:=[[1,"xX"],[-1,"Xx"]]; F25:=[[1,"Yy"],[-1,""]]; F26:=[[1,"yY"],[-1,"Yy"]]; -- Q-group algebra homomorphism phi: Q<a,b>/<F11,F12,F13> -->Q<x,y,X,Y>/<F21,F22,F23,F24,F25,F26> -- defined by mapping a to x2+1 and b to 0 D1:=[[1,"a"],[-1,"x"]]; -- map a to x D2:=[[1,"b"]]; -- map b to 0 G:=[D1,D2,F21,F22,F23,F24,F25,F26]; NCo.SetX("xyXYab"); NCo.SetOrdering("ELIM"); -- we want to eliminate x,y,X and Y Gb:=NCo.ReducedGB(G); KGb:=NCo.FindPolynomials("ab",Gb); Concat(KGb,[F11,F12,F13]); -- a generating system of the ker(phi) [[[1, "b"]], [[1, "aaaaaaaaaaaaaaaaaa"], [-1, ""]], [[1, "aa"], [-1, ""]], [[1, "bbb"], [-1, ""]], [[1, "abababbabbabababbabb"], [-1, ""]]] -------------------------------
Corollary (Minimal Polynomial): Let phi: K[y]-->K<X>/I be a K-algebra homomorphism given by phi(y)=g+I. Then g+I is algebraic over K if and only if ker(phi) is not zero. Moreover, if g+I is algebraic over K, then the unique monic generating polynomial of the ideal ker(phi) is the minimal polynomial of g+I over K.
Example
-- The following example shows that a is transcendental over Q in the algebra Q<a,b>/<b^2-1,(ab)^2-1>, -- hence the group <a,b: b^2=(ab)^2=1> is infinite. F1:=[[1,"bb"],[-1,""]]; -- b^2-1 F2:=[[1,"abab"],[-1,""]]; -- (ab)^2-1 -- Construct a Q-algebra homomorphism phi: Q[y]--> Q<a,b>/<b^2-1,(ab)^2-1> -- defined by mapping y to a D:=[[1,"y"],[-1,"a"]]; -- y-a G:=[D,F1,F2]; NCo.SetX("aby"); NCo.SetOrdering("ELIM"); -- we want to eliminate a and b Gb:=NCo.GB(G); Gb; NCo.FindPolynomials("y",Gb); [[[1, "a"], [-1, "y"]], [[1, "bb"], [-1, ""]], [[1, "yby"], [-1, "b"]]] ------------------------------- [ ] ------------------------------- -- The following example computes the order of bab in the group <a,b: a^3=b^2=(ab)^2=1>. G1:=[[1,"aaa"],[-1,""]]; -- a^3-1 G2:=[[1,"bb"],[-1,""]]; -- b^2-1 G3:=[[1,"abab"],[-1,""]]; -- (ab)^2-1 -- Construct a Q-algebra homomorphism phi: Q[y]--> Q<a,b>/<a^3-1,b^2-1,(ab)^2-1> -- defined by mapping y to bab D:=[[1,"y"],[-1,"bab"]]; -- y-bab G:=[D,G1,G2,G3]; NCo.SetX("aby"); NCo.SetOrdering("ELIM"); -- we want to eliminate a and b Gb:=NCo.GB(G); NCo.FindPolynomials("y",Gb); [[[1, "yyy"], [-1, ""]]] -- thus the order of bab is 3 -------------------------------
See also