A characteristic p analog of formal lifting properties

Abstract

A field extension L/K of characteristic p > 0 is formally \'etale if and only if the relative Frobenius of L/K is an isomorphism. Inspired by this classical result, we explore whether the formally \'etale property for a map R S of Fp-algebras is characterized by isomorphism of the relative Frobenius FS/R. While FS/R being an isomorphism implies R S is formally \'etale, the converse fails in the non-Noetherian setting. Thus, following Morrow, we introduce an enhancement of the formally \'etale property that we call b-nil (bounded nil) formally \'etale, and we show that FS/R is an isomorphism precisely when R S is b-nil formally \'etale. We prove this result by first establishing several structural properties of b-nil formally smooth maps, which are defined analogously to the formally smooth case. Our structural results reveal that the b-nil formally smooth (resp. \'etale) property is quite different from the formally smooth (resp. \'etale) property. For instance, we show that any b-nil formally smooth algebra over an F-pure ring is reduced, whereas non-reduced formally \'etale algebras exist over Fp by a construction of Bhatt. We also show that the b-nil formally \'etale property neither implies nor is implied by having a trivial cotangent complex. We explore when formally smooth (resp. \'etale) implies b-nil formally smooth (resp. \'etale) in prime characteristic. A satisfactory picture emerges for ideal adic completions.

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