A study of perfectoid rings via Galois cohomology
Abstract
In his foundational study of p-adic Hodge theory, Faltings introduced the method of almost \'etale extensions to establish fundamental comparison results of various p-adic cohomology theories. Scholze introduced the tilting operations to study algebraic objects arising from p-adic Hodge theory in mixed characteristic via the Frobenius map. In this article, we prove a few results which clarify certain ring-theoretic or homological properties of the tilt of an extension between perfectoid rings treated in the construction of big Cohen-Macaulay algebras.
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