A Buchsbaum theory for Frobenius closure
Abstract
We give a partial characterization for when the difference e(q)-R(R/qF) is independent of the choice of parameter ideal q⊂eq R in an excellent equidimensional local ring (R,m) of prime characteristic p>0. Here, qF is the Frobenius closure of q and e(q) denotes the Hilbert--Samuel multiplicity of q. In addition to ideal-theoretic equivalences, our characterization involves the derived category and is motivated by Schenzel's criterion of the Buchsbaum property as well as similar results of Ma-Quy in the setting of tight closure.
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