Graded Algebras over Polynomial Rings

Abstract

Given a trivially graded polynomial ring A=K[a1,…,am] over a field K and a positively graded polynomial ring P=A[x1,…,xk], we study graded rings R=P/I, where I is a homogeneous ideal in P such that I A = \0\. The corresponding morphism : Spec(R) → Spec(A) = AmK is used to prove that Spec(R) is connected. Then we characterize and compute the following loci in AmK: the set Sing0() of all points such that the corresponding point in the zero section of is singular in Spec(R), the set Singv() of all points such that the origin of the fiber F of is singular, and the set Sings() of all points such that ( Sing(F)) 1. These results are then used to study MaxDeg border basis schemes, as their coordinate rings are non-negatively graded by the total arrow degree and they have the required structure. In particular, we explicitly determine the singular loci for the O-border basis schemes with O=\1,x,y,z,z2\ and O = \1,x,y,z,yz\.