Ideal Containments under Flat Extensions

Abstract: Let $\varphi : S = k[y_0,..., y_n] \to R = k[y_0,...,y_n]$ be given by $y_i \to f_i$ where $f_0,...,f_n$ is an $R$-regular sequence of homogeneous elements of the same degree. A paper shows for ideals, $I_\Delta \subseteq S$, of matroids, $\Delta$, that $I_\Delta^{(m)} \subseteq I^r$ if and only if $\varphi_(I_\Delta)^{(m)} \subseteq \varphi_(I_\Delta)^r$ where $\varphi_*(I_\Delta)$ is the ideal generated in $R$ by $\varphi(I_\Delta)$. We prove this result for saturated homogeneous ideals $I$ of configurations of points in $\mathbb{P}^n$ and use it to obtain many new counterexamples to $I^{(rn - n + 1)} \subseteq I^r$ from previously known counterexamples.