Henselianity in NIP Fp-algebras
Abstract
We prove an assortment of results on (commutative and unital) NIP rings, especially Fp-algebras. Let R be a NIP ring. Then every prime ideal or radical ideal of R is externally definable, and every localization S-1R is NIP. Suppose R is additionally an Fp-algebra. Then R is a finite product of Henselian local rings. Suppose in addition that R is integral. Then R is a Henselian local domain, whose prime ideals are linearly ordered by inclusion. Suppose in addition that the residue field R/m is infinite. Then the Artin-Schreier map R R is surjective (generalizing the theorem of Kaplan, Scanlon, and Wagner for fields).
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