On deformation of perfectoid purity in Gorenstein domains

Abstract

If (R,m) is a complete local ring of mixed characteristic (0,p) and R/pR is an F-pure Gorenstein domain, we find a sufficient condition for R to be perfectoid pure. This condition is related to the Cohen-Macaulayness of the absolute integral closures of Gorenstein local domains of mixed characteristic which are not necessarily excellent. Along the way, we show that the problem of lifting F-purity of R/pR to perfectoid purity of R is equivalent to a similar deformation problem for the splinter property.

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