Ideal Containments under Flat Extensions

Abstract

Let : S = k[y0,..., yn] R = k[y0,...,yn] be given by yi fi where f0,...,fn is an R-regular sequence of homogeneous elements of the same degree. A recent paper shows for ideals, I ⊂eq S, of matroids, , that I(m) ⊂eq Ir if and only if *(I)(m) ⊂eq *(I)r where *(I) is the ideal generated in R by (I). We prove this result for saturated homogeneous ideals I of configurations of points in Pn and use it to obtain many new counterexamples to I(rn - n + 1) ⊂eq Ir from previously known counterexamples.