Symbolic and Ordinary Powers of Ideals in Hibi Rings
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We exhibit a class of Hibi rings which are diagonally F-regular over fields of positive characteristic, and diagonally $F$-regular type over fields of characteristic zero, in the sense of Carvajal-Rojas and Smolkin. It follows that such Hibi rings satisfy the uniform symbolic topology property effectively in all characteristics. Namely, for rings $R$ in this class of Hibi rings, we have $P^{(dn)} \subseteq P^n$ for all $P \in \operatorname{Spec} R$, where $d = \dim(R)$. Further, we demonstrate that all Hibi rings over fields of positive characteristic are 2-diagonally $F$-regular, and that the simplest Hibi ring not contained in the above class is not 3-diagonally $F$-regular in any characteristic. The former implies that $P^{(2d)} \subseteq P^2$ for all $P \in \operatorname{Spec} R$.
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Diagonal F-splitting and Symbolic Powers of Ideals
Proves J^{s+t} ⊆ τ(J^{s-ε}) τ(J^{t-ε}) in diagonally F-split rings and obtains novel symbolic power containments such as P^{(2hn)} ⊆ P^n for primes P of height h.
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