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For symmetric algebras, Hochschild homology of the dg-enhanced singularity category equals singular Hochschild homology.

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2026-06-27 08:07 UTC pith:LNPOZQJZ

load-bearing objection Paper gives two precise equivalences for symmetric and basic algebras plus counterexamples showing failure for general Frobenius algebras.

arxiv 2606.11641 v1 pith:LNPOZQJZ submitted 2026-06-10 math.RT math.CTmath.KTmath.RA

Singular Hochschild complex and Cartan matrix

classification math.RT math.CTmath.KTmath.RA
keywords Hochschild homologysingularity categoryCartan matrixsymmetric algebraFrobenius algebramixed complexdg enhancement
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved

The pith

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper proves that when an algebra A is symmetric, the Hochschild homology obtained from the dg enhancement of its singularity category coincides exactly with the singular Hochschild homology of A. It further shows that, for basic finite-dimensional algebras over a field, the Cartan matrix of A is symmetric if and only if the k-dual of the mixed complex attached to that dg enhancement is isomorphic to its own shift by minus one. The authors supply two explicit counterexamples demonstrating that both statements fail when the algebra is only Frobenius rather than symmetric. These identifications link a classical matrix invariant of the algebra to homological data carried by its singularity category.

Core claim

If A is a symmetric algebra, then Hochschild homology of the dg enhancement of the singularity category of A agrees with singular Hochschild homology of A. For a basic finite dimensional k algebra A, the Cartan matrix of A is symmetric if and only if the k dual of the mixed complex of the dg enhancement of its singularity category is isomorphic to its shift by -1.

What carries the argument

The dg enhancement of the singularity category of A together with its mixed complex.

Load-bearing premise

The standard definitions and constructions of the dg enhancement of the singularity category and the associated mixed complex behave as expected for the algebras considered.

What would settle it

An explicit symmetric algebra for which the two homologies differ, or a basic finite-dimensional algebra whose Cartan matrix is symmetric yet the dual mixed complex fails to be isomorphic to its negative shift.

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Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit.

Referee Report

0 major / 3 minor

Summary. The paper proves that if A is a symmetric algebra then the Hochschild homology of the dg enhancement of its singularity category coincides with the singular Hochschild homology of A. It further shows that, for a basic finite-dimensional k-algebra A, the Cartan matrix of A is symmetric if and only if the k-dual of the mixed complex of the dg enhancement of the singularity category is isomorphic to its shift by -1. Two explicit counterexamples demonstrate that neither statement holds for general Frobenius algebras.

Significance. If the proofs are correct, the results give a precise dictionary between classical invariants (Cartan matrix symmetry) and homological data attached to the dg enhancement of the singularity category, together with a clear demarcation of the symmetric versus Frobenius setting. The explicit counterexamples are a positive feature that makes the scope of the claims falsifiable and concrete.

minor comments (3)
  1. The abstract and introduction should explicitly state the base field k and the standing assumptions on A (finite-dimensional, basic) at the first appearance of each theorem, rather than deferring them to later sections.
  2. Notation for the mixed complex and its dual should be introduced once in a dedicated subsection or table, with consistent symbols across the two main theorems.
  3. The counterexamples in the final section would benefit from a short table summarizing the algebras, their Cartan matrices, and the computed homology groups to make the failure of the statements immediately visible.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the accurate summary of our results and the positive assessment of their significance. The recommendation for minor revision is noted, but no specific issues or comments were raised in the major comments section.

Circularity Check

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No significant circularity detected

full rationale

The paper states two conditional theorems (agreement of homologies for symmetric algebras; Cartan matrix symmetry iff dual mixed complex isomorphism for basic finite-dimensional algebras) and supplies explicit counterexamples showing failure for general Frobenius algebras. These rest on standard definitions of dg enhancements of singularity categories, mixed complexes, and singular Hochschild homology, with no reduction of any claimed result to a fitted parameter, self-definition, or load-bearing self-citation chain. The derivation is self-contained against external benchmarks and does not invoke uniqueness theorems or ansatzes from prior author work.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The paper relies on standard definitions from homological algebra and representation theory for symmetric algebras, Frobenius algebras, singularity categories, and mixed complexes; no free parameters, invented entities, or ad-hoc axioms are visible in the abstract.

axioms (2)
  • domain assumption Standard properties of symmetric and Frobenius algebras over a field k
    The statements are conditioned on these classes of algebras as defined in the literature.
  • domain assumption Existence and basic properties of the dg enhancement of the singularity category and its mixed complex
    The claims invoke these constructions without re-deriving them.

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read the original abstract

If A is a symmetric algebra, then Hochschild homology of the dg enhancement of the singularity category of A agrees with singular Hochschild homology of A. For a basic finite dimensional k algebra A, the Cartan matrix of A is symmetric if and only if the k dual of the mixed complex of the dg enhancement of its singularity category is isomorphic to its shift by -1. We provide two counterexamples to show that neither result holds for general Frobenius algebras.

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Works this paper leans on

11 extracted references · 1 canonical work pages

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