On m-adic Continuity of F-Splitting Ratio
Abstract
We investigate the m-adic continuity of Frobenius splitting dimensions and ratios for divisor pairs (R,) in an F-finite local ring (R,m,k) of prime characteristic p>0. Our main result states that if R is an F-finite, Q-Gorenstein, Cohen-Macaulay local ring of prime characteristic p>0, the Frobenius splitting numbers ae(R) remain unchanged under a suitable small perturbation. Moreover, we establish a desirable inequality of Frobenius splitting dimensions under general perturbations. That is, (R/(P(R/(f),|f)))≤ (R/(P(R/(f+),|(f+)))) for all ∈ mN0, providing an example that demonstrates strict improvement can occur.
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