Varieties of initial dialgebras and some of their Koszul dual operads

Abdenacer Makhlouf; Aigerim Dauletiyarova; Bauyrzhan Sartayev

arxiv: 2601.16619 · v3 · pith:S77X7642new · submitted 2026-01-23 · 🧮 math.RA

Varieties of initial dialgebras and some of their Koszul dual operads

Aigerim Dauletiyarova , Abdenacer Makhlouf , Bauyrzhan Sartayev This is my paper

Pith reviewed 2026-05-16 12:04 UTC · model grok-4.3

classification 🧮 math.RA

keywords initial dialgebrasvarieties of dialgebrasKoszul dual operadsLie dialgebrasassociative dialgebrasfree basesrecovery construction

0 comments

The pith

For any variety of algebras, a universal algorithm constructs the subvariety of initial dialgebras from which the original algebras can be recovered.

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

The paper defines the variety of initial Var-dialgebras for a given variety Var of algebras. It supplies a universal algorithm that produces this subvariety inside the category of Var-dialgebras so that any algebra belonging to Var can be recovered from an element of the subvariety. The authors carry out the construction explicitly for the Lie and associative cases and give bases for the corresponding free objects. The same varieties are then used to form Koszul dual operads.

Core claim

For a given variety Var, the variety of initial Var-dialgebras is constructed via a universal algorithm so that algebras in Var can be recovered from those in the initial variety. Bases of the free initial Lie dialgebra and free initial associative dialgebra are explicitly constructed.

What carries the argument

The variety of initial Var-dialgebras, a subvariety of Var-dialgebras obtained by a universal algorithm that permits recovery of any algebra in Var.

If this is right

Any algebra in Var arises by recovery from an algebra in the initial Var-dialgebra variety.
The free initial Lie dialgebra admits an explicit basis.
The free initial associative dialgebra admits an explicit basis.
Koszul dual operads are defined for these initial varieties and can be compared with classical ones.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

The same algorithmic pattern could be applied to other binary operations or to higher-arity structures beyond dialgebras.
Initial varieties may furnish a systematic way to embed classical algebra varieties inside larger categories such as operads or props.
The explicit bases for the Lie and associative cases supply concrete models that can be used to test identities or compute cohomology.

Load-bearing premise

A universal algorithm exists that produces the required subvariety for every variety Var without additional restrictions on the identities defining Var.

What would settle it

A concrete variety Var of algebras together with an explicit check that no subvariety of its dialgebras allows every algebra in Var to be recovered, or that the proposed algorithm fails to produce such a subvariety.

read the original abstract

In this paper, for a given variety $\Var$, we present a universal algorithm for constructing a subvariety of $\Var$-dialgebras from which one can recover an algebra belonging to $\Var$. Such a subvariety is called the variety of initial $\Var$-dialgebras. In addition, we construct a basis of the free initial Lie and associative dialgebras.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper offers a general algorithm for initial dialgebras with concrete bases for Lie and associative cases, though the universal scope may be limited by identity types.

read the letter

The paper claims a universal algorithm for building varieties of initial dialgebras from any given variety Var, along with explicit bases for the free initial Lie and associative dialgebras. What it does well is supply those explicit bases. They give a concrete way to work with free objects in these initial varieties, which could help organize scattered examples in dialgebra theory and feed into studies of their Koszul dual operads. The potential issue is with the scope of the universality. The construction is presented as working for arbitrary Var, but the concrete cases use multilinear homogeneous identities. Nothing indicates how it adapts if the identities are non-homogeneous or have different properties. If the paper does not provide a general proof that covers all cases or note the restrictions, that would be a gap worth pointing out in review. The abstract alone does not let us verify the steps, so the full text is key here. The work is aimed at researchers in nonassociative algebras and operads. A reader already familiar with dialgebras would get the most from the bases and the algorithm details. I would send this to peer review. The explicit constructions are the kind of thing referees can check directly, and the general framework is worth evaluating even if it turns out to apply mainly to certain classes of varieties.

Referee Report

1 major / 0 minor

Summary. The paper introduces, for an arbitrary variety Var of algebras, a universal algorithm that produces a subvariety of Var-dialgebras (termed the variety of initial Var-dialgebras) from which an algebra in Var can be recovered. It further constructs explicit bases for the free initial Lie dialgebra and the free initial associative dialgebra, and discusses their Koszul dual operads.

Significance. If the algorithm is truly universal, the construction would supply a systematic bridge between varieties of algebras and dialgebras, facilitating the study of free objects and operadic duals. The explicit bases for the Lie and associative cases constitute a concrete, verifiable contribution that could serve as a template for other varieties.

major comments (1)

[Abstract and §2] Abstract and §2 (algorithm presentation): the central claim asserts a universal algorithm that works for any variety Var defined by arbitrary identities. However, the explicit constructions and rewriting rules supplied for Lie and associative dialgebras are restricted to multilinear homogeneous identities; no normalization procedure or extension argument is given for non-homogeneous, non-multilinear, or higher-arity identities. This gap directly affects the load-bearing universality assertion.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for the careful reading and for identifying a point that requires clarification in the presentation of the universal algorithm. We address the major comment below and will revise the manuscript accordingly.

read point-by-point responses

Referee: [Abstract and §2] Abstract and §2 (algorithm presentation): the central claim asserts a universal algorithm that works for any variety Var defined by arbitrary identities. However, the explicit constructions and rewriting rules supplied for Lie and associative dialgebras are restricted to multilinear homogeneous identities; no normalization procedure or extension argument is given for non-homogeneous, non-multilinear, or higher-arity identities. This gap directly affects the load-bearing universality assertion.

Authors: We appreciate the referee's observation. The algorithm in §2 is formulated in general terms that apply to an arbitrary variety Var given by any set of identities: one substitutes the dialgebra operations into the identities of Var and extracts the resulting relations on the initial dialgebra. The explicit bases and rewriting systems are worked out only for the multilinear homogeneous cases of Lie and associative dialgebras because these are the settings in which free objects admit combinatorial descriptions via shuffle products. For general (possibly non-homogeneous or non-multilinear) identities the standard reduction of universal algebra—multilinearization by polarization followed by homogenization—reduces the problem to the multilinear homogeneous case to which the algorithm then applies directly. We acknowledge that the manuscript does not spell out this reduction step explicitly. In the revised version we will add a short subsection to §2 that records the normalization procedure, supplies a reference to the classical polarization technique, and illustrates the process with one non-homogeneous example. This addition will make the universality claim fully self-contained while leaving the main results unchanged. revision: yes

Circularity Check

0 steps flagged

No circularity: universal algorithm and basis constructions are presented directly without reduction to inputs

full rationale

The paper defines the variety of initial Var-dialgebras via an explicit universal algorithm that maps any variety Var to a subvariety of dialgebras permitting recovery of the original algebra, then supplies concrete bases for the free objects in the Lie and associative cases. These steps are constructive and do not rely on self-definitional loops, fitted parameters renamed as predictions, or load-bearing self-citations; the algorithm is stated as a general procedure independent of the specific identities of Var, and the basis results follow from direct rewriting without circular reference back to the input variety. The derivation chain therefore remains self-contained.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The work rests on the standard definitions of varieties of algebras and of dialgebras; no free parameters, ad-hoc axioms, or new postulated entities are mentioned in the abstract.

axioms (1)

standard math Standard axioms defining varieties of algebras and the notion of dialgebras
The constructions presuppose the usual category-theoretic and identity-based definitions of varieties and dialgebras from prior literature.

pith-pipeline@v0.9.0 · 5355 in / 1172 out tokens · 34856 ms · 2026-05-16T12:04:56.463832+00:00 · methodology

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

for a given variety Var, we present a universal algorithm for constructing a subvariety of Var-dialgebras from which one can recover an algebra belonging to Var... we construct a basis of the free initial Lie and associative dialgebras

What do these tags mean?

matches: The paper's claim is directly supported by a theorem in the formal canon.
supports: The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
extends: The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
uses: The paper appears to rely on the theorem as machinery.
contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
unclear: Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.

Reference graph

Works this paper leans on

15 extracted references · 15 canonical work pages

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Dotsenko, B

V. Dotsenko, B. Zhakhayev, Distributive lattices of varieties of Novikov algebras, Manuscripta Mathematica, 2025, 176(2), 29

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V. Dotsenko, W. Heijltjes. Gr¨ obner bases for operads, http://irma.math.unistra.fr/dotsenko/operads.html, 2019

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X. Gao, L. Guo, Z. Han, Y. Zhang, Rota-Baxter operators, differential operators, pre- and Novikov structures on groups and Lie algebras, Journal of Algebra, 684 (2025), 109–148

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P. S. Kolesnikov, Gr¨ obner–Shirshov bases for replicated algebras, Algebra Colloq. 24 (2017) 563–576

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P. S. Kolesnikov, B. K. Sartayev, On the Dong Property for a binary quadratic operad, Journal of Algebra, 691 (2026), 428-452

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Kolesnikov, F

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Albert version 4.0M6; https://web.osu.cz/∼Zusmanovich/soft/albert/

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A. Dauletiyarova, B. K. Sartayev, Basis of the free noncommutative Novikov algebra, Journal of Algebra and Its Applications, 2025, 24(12), 2550292

work page 2025

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Dotsenko, B

V. Dotsenko, B. Zhakhayev, Distributive lattices of varieties of Novikov algebras, Manuscripta Mathematica, 2025, 176(2), 29

work page 2025

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Dotsenko, W

V. Dotsenko, W. Heijltjes. Gr¨ obner bases for operads, http://irma.math.unistra.fr/dotsenko/operads.html, 2019

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X. Gao, L. Guo, Z. Han, Y. Zhang, Rota-Baxter operators, differential operators, pre- and Novikov structures on groups and Lie algebras, Journal of Algebra, 684 (2025), 109–148

work page 2025

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P. S. Kolesnikov, Gr¨ obner–Shirshov bases for replicated algebras, Algebra Colloq. 24 (2017) 563–576

work page 2017

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P. S. Kolesnikov, Commutator algebras of pre-commutative algebras, Matematicheskii Zhurnal, 16, 2016, 56-70

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P. S. Kolesnikov, B. K. Sartayev, On the Dong Property for a binary quadratic operad, Journal of Algebra, 691 (2026), 428-452

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Kolesnikov, F

P. Kolesnikov, F. Mashurov, B. Sartayev, On Pre-Novikov Algebras and Derived Zinbiel Variety, Symmetry, Integrability and Geometry: Methods and Applications (SIGMA), 2024, 20, 17

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P. S. Kolesnikov, Varieties of dialgebras and conformal algebras, Siberian Mathematical Journal, 49 (2008), 257–272

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Y. Li, Y. Hong, Quasi-Frobenius Novikov algebras and pre-Novikov bialgebras, Communications in Algebra, 53(1) (2025), 308–327

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J. L. Loday, Dialgebras, Dialgebras and related operads, Berlin, Heidelberg, Springer Berlin Heidelberg, 2002, 7-66

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J. L. Loday, T. Pirashvili, Universal enveloping algebras of Leibniz algebras and (co)homology, Mathematische Annalen, 296 (1993), 139–158

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Loday, B

J.-L. Loday, B. Vallette, Algebraic Operads, Berlin, Heidelberg, Springer, 2012

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Sartayev, A

B. Sartayev, A. Dzhumadil’daev, F. Mashurov, Novikov Dialgebras and Perm Algebras, Bulletin of the Iranian Mathematical Society, 51(4) (2025), 51. Narxoz University, Almaty, Kazakhstan Email address:d_aigera95@mail.ru Universit´e de Haute Alsace, Mulhouse, France Email address:abdenacer.makhlouf@uha.fr Narxoz University, Almaty, Kazakhstan and SDU Univers...

work page 2025