Homomorphisms of topological rings and change-of-scalar functors

Abstract

We consider homomorphisms of complete, separated right or two-sided linear topological rings with countable bases of neighborhoods of zero f R S. Taut maps of right linear topological rings, strongly right taut maps of two-sided linear topological rings, left proflat continuous ring maps, and topological ring epimorphisms are discussed. For a left proflat topological ring epimorphism f, we show that the functor of restriction of scalars on the categories of left contramodules f S-Contra R-Contra is fully faithful. Assuming that the contramodule-to-module forgetful functor R-Contra R-Mod is fully faithful and the topological ring map f is left proflat, we prove that the commutative square of forgetful functors between the left contramodule and module categories over S and R is a pseudopullback diagram. This provides a description of the essential image of f under the conjunction of the respective assumptions. The left adjoint functor to f always exists, but is not exact even when f is (pro)flat. A right adjont functor to f does not always exist, but for a left proflat map f we construct it explicitly and show that it has good exactness properties. This work is motivated by the theory of contraherent cosheaves of contramodules on formal schemes.

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