Wikipedia:Reference desk/Archives/Mathematics/2013 July 5
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July 5 edit
prove that not Grobner base edit
Let S = K[r,s,t,u,v,w,x,y} and I the ideal of S generated by f = sy-ux , g = rw-tv , h = rt-su ,Show that there exist no monomial order < o S such that {f,g,h } I a Grobner basis of I with respect to < .
— Preceding unsigned comment added by 182.187.77.255 (talk • contribs) 04:56, 5 July 2013
- If you want some hints, you should present the context more clearly.
- I suppose that you intend K to be a field, and K[r,s,t,u,v,w,x,y} [SIC!] the commutative polynomial ring over that field. Is that correct?
- In what kind of coursis or other context did you get the question? Specifically, have you access to tools to decide whether or not S is a Koszul algebra? (Note, that if the "denominator" ideal for a homogeneous ring of this type has a Gröbner basis with only quadratic (homogeneous) elements, then it is necessarily Koszul.) JoergenB (talk) 21:39, 5 July 2013 (UTC)