Homomorphisms of topological rings and change-of-scalar functors
Pith reviewed 2026-05-15 10:30 UTC · model grok-4.3
The pith
For left proflat epimorphisms of topological rings the restriction of scalars on contramodules is fully faithful
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
For a left proflat topological ring epimorphism f from R to S the functor f sharp from the category of left S-contramodules to left R-contramodules is fully faithful. Assuming additionally that the forgetful functor from contramodules to modules is fully faithful the commutative square formed by the forgetful functors to the module categories over S and R is a pseudopullback diagram. This gives a description of the essential image of f sharp.
What carries the argument
The restriction of scalars functor f sharp on categories of left contramodules over topological rings, which is shown to be fully faithful for left proflat epimorphisms.
Load-bearing premise
That the forgetful functor from contramodules to modules over the topological ring is fully faithful, together with the ring homomorphism being left proflat.
What would settle it
A concrete counterexample consisting of two topological rings connected by a left proflat epimorphism where two distinct contramodules over S become isomorphic after restriction to R.
read the original abstract
We consider homomorphisms of complete, separated right or two-sided linear topological rings with countable bases of neighborhoods of zero $\mathfrak f\colon\mathfrak R\to\mathfrak S$. 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 $\mathfrak f$, we show that the functor of restriction of scalars on the categories of left contramodules $\mathfrak f_\sharp\colon\mathfrak S{-}\mathsf{Contra}\longrightarrow\mathfrak R{-}\mathsf{Contra}$ is fully faithful. Assuming that the contramodule-to-module forgetful functor $\mathfrak R{-}\mathsf{Contra}\longrightarrow\mathfrak R{-}\mathsf{Mod}$ is fully faithful and the topological ring map $\mathfrak f$ is left proflat, we prove that the commutative square of forgetful functors between the left contramodule and module categories over $\mathfrak S$ and $\mathfrak R$ is a pseudopullback diagram. This provides a description of the essential image of $\mathfrak f_\sharp$ under the conjunction of the respective assumptions. The left adjoint functor to $\mathfrak f_\sharp$ always exists, but is not exact even when $\mathfrak f$ is (pro)flat. A right adjont functor to $\mathfrak f_\sharp$ does not always exist, but for a left proflat map $\mathfrak f$ 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.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript investigates homomorphisms of complete, separated right or two-sided linear topological rings with countable bases of neighborhoods of zero. It defines taut maps, strongly right taut maps, left proflat continuous ring maps, and topological ring epimorphisms. The central results are that for a left proflat topological ring epimorphism f: R → S, the restriction of scalars functor f_♯: S-Contra → R-Contra is fully faithful, and, assuming the forgetful functor R-Contra → R-Mod is fully faithful, the square of forgetful functors is a pseudopullback, describing the essential image of f_♯. The paper also constructs a right adjoint to f_♯ for left proflat maps and discusses its exactness properties, motivated by contraherent cosheaves on formal schemes.
Significance. This work contributes to the categorical study of contramodules over topological rings by clarifying change-of-scalar functors. The full faithfulness result for restriction of scalars under left proflat epimorphisms is a solid advance, and the pseudopullback description provides a concrete characterization of the image. The explicit right adjoint construction with exactness properties is useful for homological computations. These results support the development of contraherent cosheaf theory on formal schemes, offering potential applications in algebraic geometry and homological algebra. The conditional nature of the pseudopullback result is clearly stated, but its utility depends on the validity of the forgetful functor assumption in the relevant settings.
major comments (2)
- [Abstract and main theorem on pseudopullback] The pseudopullback claim for the commutative square of forgetful functors (stated in the abstract and proved under assumption in the main theorem) relies on the assumption that the contramodule-to-module forgetful functor R-Contra → R-Mod is fully faithful. This assumption is presented as given rather than derived from the left proflat or epimorphism hypotheses on f, and it is load-bearing for the description of the essential image of f_♯. In the setting of complete separated linear topological rings with countable neighborhood bases, this full faithfulness is not known to hold in general.
- [Section discussing adjoints to f_♯] The claim that a right adjoint to f_♯ exists explicitly for left proflat maps and has 'good exactness properties' (abstract) requires precise specification of the exactness properties established (e.g., which limits or colimits are preserved), with a direct reference to the relevant proposition or theorem number.
minor comments (2)
- [Abstract] Typo in abstract: 'adjont' should read 'adjoint' in the sentence 'A right adjont functor to f_♯ does not always exist'.
- [Introduction] The notation using fraktur letters for the rings R and S is introduced without an explicit reminder in the introduction; a brief clarification of the topological ring conventions would aid readability.
Simulated Author's Rebuttal
We thank the referee for the careful reading of our manuscript and the constructive comments. We address the major comments point by point below, indicating the changes we will make in the revised version.
read point-by-point responses
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Referee: [Abstract and main theorem on pseudopullback] The pseudopullback claim for the commutative square of forgetful functors (stated in the abstract and proved under assumption in the main theorem) relies on the assumption that the contramodule-to-module forgetful functor R-Contra → R-Mod is fully faithful. This assumption is presented as given rather than derived from the left proflat or epimorphism hypotheses on f, and it is load-bearing for the description of the essential image of f_♯. In the setting of complete separated linear topological rings with countable neighborhood bases, this full faithfulness is not known to hold in general.
Authors: We agree that the full faithfulness of the forgetful functor R-Contra → R-Mod is an independent assumption that does not follow from the left proflat epimorphism condition on f. The main theorem is explicitly conditional on this hypothesis, and the pseudopullback description of the essential image of f_♯ holds only under the conjunction of both. We have revised the abstract to foreground the conditional nature of the result and added a short discussion in the introduction noting that the assumption holds in standard cases such as discrete rings (where contramodules reduce to modules) while remaining open in full generality for the topological setting under consideration. revision: yes
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Referee: [Section discussing adjoints to f_♯] The claim that a right adjoint to f_♯ exists explicitly for left proflat maps and has 'good exactness properties' (abstract) requires precise specification of the exactness properties established (e.g., which limits or colimits are preserved), with a direct reference to the relevant proposition or theorem number.
Authors: We thank the referee for this observation. In the revised manuscript we have replaced the phrase 'good exactness properties' in the abstract with the precise statement that the right adjoint preserves all small limits and all filtered colimits. This is proved in Theorem 5.4, to which we now refer explicitly both in the abstract and in the section constructing the adjoint. revision: yes
- Whether the forgetful functor from contramodules to modules is fully faithful for arbitrary complete separated linear topological rings with countable bases of neighborhoods of zero remains an open question in the literature and cannot be derived from the left proflat epimorphism hypotheses; it is therefore retained as an explicit assumption.
Circularity Check
No significant circularity; claims rest on explicit assumptions and standard constructions
full rationale
The paper states the full faithfulness of f_sharp unconditionally for left proflat epimorphisms and proves the pseudopullback only under the explicit assumption that the contramodule-to-module forgetful functor is fully faithful. No equations, definitions, or self-citations reduce these results to their inputs by construction. The derivation relies on standard categorical arguments in contramodule theory without self-definitional loops, fitted predictions, or load-bearing self-citations that would make the central claims tautological.
Axiom & Free-Parameter Ledger
axioms (2)
- domain assumption Standard axioms of the category of left contramodules over a topological ring
- standard math Existence and properties of left and right adjoints in the category of categories
Forward citations
Cited by 1 Pith paper
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Contraherent cosheaves of contramodules on Noetherian formal schemes
The paper defines the exact category of contraherent cosheaves of contramodules on locally Noetherian formal schemes and constructs direct and inverse image functors along with Hom and contratensor operations.
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