|  |  7.10.3.3 lpIsPrime Procedure from libraryfpaprops.lib(see  fpaprops_lib).
 
Example:Usage:
lpIsPrime(G); G an ideal in a Letterplace ring
Return:
boolean
Purpose:
Check whether A/<LM(G)> is prime ring,
alternatively whether <LM(G)> is a prime ideal in A.
 
Assume:
- basering is a Letterplace ring
- G is a Groebner basis
 
Theory:
A (two-sided) ideal I in the ring A is prime, if for any a,b in A one has
aAb subseteq I implies a in I or b in I.
Note:
lpIsPrime works with the monomial algebra A/<LM(G)>.
A positive answer holds for both A/<LM(G)> and A/<G>, while
a negative answer applies only to A/<LM(G)> and not necessarily to A/<G>.
 
 |  | LIB "fpaprops.lib";
ring r = 0,(x,y),dp;
def R = freeAlgebra(r, 5);
setring R;
ideal G = x*x, y*y; // K<x,y>/<xx,yy> is prime
lpIsPrime(G);
==> 1
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