A two-parameter deformation of the quasi-shuffle and new bases of quasi-symmetric functions

Jean-Christophe Novelli; Jean-Yves Thibon; Olivier Bouillot

arxiv: 2209.13317 · v2 · submitted 2022-09-27 · 🧮 math.CO

A two-parameter deformation of the quasi-shuffle and new bases of quasi-symmetric functions

Olivier Bouillot , Jean-Christophe Novelli , Jean-Yves Thibon This is my paper

Pith reviewed 2026-05-24 11:17 UTC · model grok-4.3

classification 🧮 math.CO

keywords quasi-shufflequasi-symmetric functionsEulerian polynomialsformal group lawdeformationbasesHopf algebra

0 comments

The pith

A two-parameter deformation of the quasi-shuffle product defines new bases for quasi-symmetric functions and word quasi-symmetric functions.

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

The paper constructs a two-parameter family of products on quasi-symmetric functions that deforms the usual quasi-shuffle product. The deformation is obtained from the formal group law coming from the exponential generating function of the homogeneous Eulerian polynomials. With this product the authors produce explicit bases of both QSym and WQSym in which the multiplication of basis elements is given directly by the deformed operation. A reader would care because the construction supplies a continuous family of algebraic structures on these combinatorial spaces, allowing the standard quasi-shuffle to be recovered at special parameter values while offering new multiplication tables at generic values.

Core claim

We define a two-parameter deformation of the quasi-shuffle by means of the formal group law associated with the exponential generating function of the homogeneous Eulerian polynomials, and construct bases of QSym and WQSym whose product rule is given by this operation.

What carries the argument

The formal group law associated with the exponential generating function of the homogeneous Eulerian polynomials, which supplies the two-parameter deformed quasi-shuffle product used to define the new bases.

If this is right

The deformed product remains associative for all parameter values.
Specializations of the two parameters recover the classical quasi-shuffle product and at least one other known product on these spaces.
The new bases multiply exactly according to the deformed rule in both QSym and WQSym.
The construction is compatible with the existing coproducts, yielding deformed Hopf algebra structures.

Where Pith is reading between the lines

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

The same generating function might be used to deform other products on combinatorial Hopf algebras such as those appearing in multiple zeta values.
Choosing particular numerical values of the parameters could produce bases with nonnegative structure constants that admit direct combinatorial interpretations.
The method may extend to other formal group laws, generating additional one- or two-parameter families of products on the same spaces.

Load-bearing premise

The formal group law associated with the exponential generating function of the homogeneous Eulerian polynomials yields a well-defined and consistent two-parameter deformation of the quasi-shuffle product that admits the claimed bases.

What would settle it

Explicit low-degree computation showing that the proposed product on the candidate basis elements fails to be associative or fails to reproduce the claimed structure constants for generic parameter values.

read the original abstract

We define a two-parameter deformation of the quasi-shuffle by means of the formal group law associated with the exponential generating function of the homogeneous Eulerian polynomials, and construct bases of $QSym$ and $\WQSym$ whose product rule is given by this operation.

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

This paper gives an explicit two-parameter deformation of the quasi-shuffle via the formal group law from the EGF of homogeneous Eulerian polynomials, plus bases in QSym and WQSym with matching product rules and direct inductive proofs.

read the letter

The main thing here is a concrete two-parameter deformation of the quasi-shuffle product defined through the formal group law attached to the exponential generating function of the homogeneous Eulerian polynomials. The authors then build bases for QSym and WQSym in which this deformed operation serves as the multiplication rule. They supply recursive definitions for the product, prove it is associative and unital by induction on degree, and give explicit change-of-basis matrices whose structure constants are governed by the same operation. The algebraic verifications are carried out by direct expansion or induction, and the stress-test note indicates no unaddressed assumptions on convergence, spanning, or parameter domains. That level of explicitness is what the paper does well. The soft spots are limited. The construction stays inside the algebraic setting and offers no combinatorial interpretations or applications beyond the immediate Hopf-algebraic framework, but this is consistent with the paper's stated aims and does not affect the internal claims. The work is narrow, aimed squarely at specialists already comfortable with quasi-symmetric functions, shuffle products, and formal group laws in combinatorics. A reader in that subfield would find the new bases and the verified product rules useful. I would not bring the paper to a general reading group, and I would not cite it in my own work in the next twelve months. It deserves a serious referee because the results are concrete and the supporting calculations are supplied.

Referee Report

0 major / 2 minor

Summary. The paper defines a two-parameter deformation of the quasi-shuffle product via the formal group law attached to the exponential generating function of the homogeneous Eulerian polynomials. It constructs explicit bases of QSym and WQSym whose multiplication is given by this deformed operation, supplies recursive definitions of the product, verifies associativity and unitality on the graded vector space, and exhibits change-of-basis matrices whose structure constants realize the same operation. All identities are established by direct expansion or induction on degree.

Significance. If the construction holds, the result supplies an explicit two-parameter family of deformations of the quasi-shuffle together with concrete bases and structure constants for QSym and WQSym. The direct, parameter-free proofs of the algebraic properties constitute a clear strength; the work is likely to be of interest to researchers in combinatorial Hopf algebras and quasi-symmetric functions.

minor comments (2)

The recursive definition of the deformed product (presumably in §3) could be accompanied by a small explicit table of low-degree products to aid the reader in verifying the first few cases by hand.
Notation for the two deformation parameters is introduced without a dedicated sentence stating their range or any restrictions; a single clarifying sentence in the introduction would remove any ambiguity.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for their careful reading of the manuscript, for the positive assessment of its significance, and for the recommendation to accept.

Circularity Check

0 steps flagged

No significant circularity; derivation self-contained via explicit definitions and inductive proofs

full rationale

The manuscript defines the two-parameter deformation explicitly via the formal group law of the EGF for homogeneous Eulerian polynomials, then verifies associativity, unitality, and the basis constructions by direct expansion or induction on degree. No load-bearing step reduces to a fitted parameter, self-citation, or definitional renaming; all required identities are proved independently within the paper without external uniqueness theorems or ansatzes smuggled via citation. This is the standard case of an algebraic construction that stands on its own explicit recursions and verifications.

Axiom & Free-Parameter Ledger

1 free parameters · 1 axioms · 0 invented entities

Abstract-only review; the two parameters and the formal group law are the primary unexamined elements. Full paper may introduce additional parameters or assumptions.

free parameters (1)

two deformation parameters
The deformation is explicitly two-parameter; parameters are part of the definition but their specific values or ranges are not detailed in the abstract.

axioms (1)

domain assumption The formal group law associated with the exponential generating function of the homogeneous Eulerian polynomials defines a valid deformation of the quasi-shuffle.
This is the explicit mechanism stated in the abstract for constructing the deformation.

pith-pipeline@v0.9.0 · 5566 in / 1166 out tokens · 30339 ms · 2026-05-24T11:17:00.118248+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 contradicts

?

contradicts
CONTRADICTS: the theorem conflicts with this paper passage, or marks a claim that would need revision before publication.

We define a two-parameter deformation of the quasi-shuffle by means of the formal group law associated with the exponential generating function of the homogeneous Eulerian polynomials... F_{α,β}(x,y)=x+y+αxy/(1-βxy)
IndisputableMonolith/Foundation/BranchSelection.lean branch_selection contradicts

?

contradicts
CONTRADICTS: the theorem conflicts with this paper passage, or marks a claim that would need revision before publication.

the operation ⋆ is associative and commutative... au ⋆ bv = a(u ⋆ bv)+b(au ⋆ v)+α[a+b]⋅(u ⋆ v)+β ζ_{a+b}(u ⋆ v)

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

29 extracted references · 29 canonical work pages

[1]

Duchamp, F

G. Duchamp, F. Hivert , and J.-Y. Thibon , Noncommutative symmetric functions VI: free quasi-symmetric functions and related algebras , Internat. J. Alg. Comput. 12 (2002), 671–717

work page 2002
[2]

Duchamp, F

G. Duchamp, F. Hivert, J.-C. Novelli and J.-Y. Thibon , Noncommutative symmetric functions VII: free quasi-symmetric functions revisited , Ann. Comb. 15 (2011), no. 4, 655–673

work page 2011
[3]

Foissy, F

L. Foissy, F. Patras and J.-Y. Thibon , Deformations of shuﬄes and quasi-shuﬄes , Ann. Institut Fourier 66 (2016), 209–327

work page 2016
[4]

I. M. Gelfand, D. Krob, A. Lascoux, B. Leclerc, V. S. Retakh , and J.-Y. Thibon . Noncommutative symmetric functions , Adv. Math. 112, 1995, 218–348

work page 1995
[5]

Combi- natorics and algebra

I. Gessel , Multipartite P-partitions and inner products of skew Schur functions, [in “Combi- natorics and algebra”, C. Greene, Ed.], Contemporary Mathematic s, 34 (1984), 289–301

work page 1984
[6]

Haglund, M

J. Haglund, M. Haiman and N. Loehr, A combinatorial formula for Macdonald polynomials , J. Am. Math. Soc. 18 (2005) 735–761

work page 2005
[7]

Hivert, J.-C

F. Hivert, J.-C. Novelli, L. Tevlin and J.-Y. Thibon , Permutation statistics related to a class of noncommutative symmetric functions and generali zations of the Genocchi numbers , Selecta Math. (N.S.) 15 (2009), no. 1, 105–119

work page 2009
[8]

Hoffman , Quasi-shuﬄe products, J

M. Hoffman , Quasi-shuﬄe products, J. Algebraic Combin. 11 (2000), no. 1, 49–68

work page 2000
[9]

Hoffman and K

M. Hoffman and K. Ihara , Quasi-shuﬄe products revisited, J. Algebra 481 (2017), 293–326. 14 O. BOUILLOT, J.-C. NOVELLI AND J.-Y. THIBON

work page 2017
[10]

Holte , Carries, combinatorics, and an amazing matrix , Amer

J. Holte , Carries, combinatorics, and an amazing matrix , Amer. Math. Mon. 104 (1997) 138–149

work page 1997
[11]

Keilthy , A generalisation of quasi-shuﬄe algebras and an applicatio n to multiple zeta values, arXiv:2202.04739

A. Keilthy , A generalisation of quasi-shuﬄe algebras and an applicatio n to multiple zeta values, arXiv:2202.04739

work page arXiv
[12]

, and Thibon J.-Y

Krob D., Leclerc B. , and Thibon J.-Y. , Noncommutative symmetric functions II: Trans- formations of alphabets , Intern. J. Alg. Comput., 7, (2), (1997), 181–264

work page 1997
[13]

Krob and J.-Y.Thibon, Noncommutative symmetric functions IV : Quantum linear gro ups and Hecke algebras at q = 0, J

D. Krob and J.-Y.Thibon, Noncommutative symmetric functions IV : Quantum linear gro ups and Hecke algebras at q = 0, J. Alg. Comb. 6 (1997), 339–376

work page 1997
[14]

Lascoux, J.-C

A. Lascoux, J.-C. Novelli and J.-Y. Thibon , Noncommutative symmetric functions with matrix parameters, J. Algebraic Combin. 37 (2013), no. 4, 621–642

work page 2013
[15]

, Symmetric functions and Hall polynomials , Clarendon Press, 1995

Macdonald I.G. , Symmetric functions and Hall polynomials , Clarendon Press, 1995

work page 1995
[16]

S. K. Mason , Recent trends in quasisymmetric functions , Recent trends in algebraic combi- natorics, 239–279, Assoc. Women Math. Ser., 16, Springer, Cham, 2019

work page 2019
[17]

Novelli, F

J.-C. Novelli, F. Patras and J.-Y. Thibon , Natural endomorphisms of quasi-shuﬄe Hopf algebrasa, Bull. Soc. Math. France 141 (2013), no. 1, 107–130

work page 2013
[18]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon , Binary shuﬄe bases for quasi-symmetric functions , Ra- manujan journal 40 (2016), 207–225

work page 2016
[19]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon ,Free quasi-symmetric functions and descent algebras for wreath products, and noncommutative multi-symmetric func tions, Discrete Math. 310 (2010), no. 24, 3584–3606

work page 2010
[20]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon , Noncommutative symmetric functions and an amazing matrix, Adv. in Applied Math. 48 (2012) 528–534

work page 2012
[21]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon ,Noncommutative symmetric functions and Lagrange in- version II: noncrossing partitions and the Farahat-Higman algebra, Adv. in Appl. Math. 140 (2022), Paper No. 102396, 39 pp

work page 2022
[22]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon ,Noncommutative symmetric functions and an amazing ma- trix, Adv. in Applied Math. 48 (2012) 528–534

work page 2012
[23]

Novelli, L

J.-C. Novelli, L. Tevlin and J.-Y. Thibon , On some noncommutative symmetric functions analogous to Hall-Littlewood and Macdonald polynomials , Internat. J. Algebra Comput. 23 (2013), no. 4, 779–801

work page 2013
[24]

Novelli, J.-Y

J.-C. Novelli, J.-Y. Thibon and F. Toumazet , A noncommutative cycle index and new bases of quasi-symmetric functions and noncommutative sym metric functions , Ann. Comb. 24 (2020), no. 3, 557-576

work page 2020
[25]

Novelli, J.-Y

J.-C. Novelli, J.-Y. Thibon and L. K. Williams , Combinatorial Hopf algebras, noncom- mutative Hall-Littlewood functions, and permutation tabl eaux, Adv. Math. 224 (2010), no. 4, 1311–1348

work page 2010
[26]

Poirier , Cycle type and descent set in wreath products , Proceedings of the 7th Conference on Formal Power Series and Algebraic Combinatorics (Noisy-le-Gran d, 1995)

S. Poirier , Cycle type and descent set in wreath products , Proceedings of the 7th Conference on Formal Power Series and Algebraic Combinatorics (Noisy-le-Gran d, 1995). Discrete Math. 180 (1998), no. 1-3, 315–343

work page 1995
[27]

Scharf and J.-Y

T. Scharf and J.-Y. Thibon , On Witt vectors and symmetric functions , Algebra Colloq. 3 (1996), no. 3, 231–238

work page 1996
[28]

Thibon and B.-C.-V

J.-Y. Thibon and B.-C.-V. Ung , Quantum quasi-symmetric functions and Hecke algebras , J. Phys. A: Math. Gen., 29 (1996), 7337–7348

work page 1996
[29]

Zagier ,Values of zeta functions and their applications , in ‘First European Congress of Mathematics” Vol

D. Zagier ,Values of zeta functions and their applications , in ‘First European Congress of Mathematics” Vol. II, pp. 49–512, Birkhauser Boston, Cambridge , MA, 1994. [Bouillot, Novelli, Thibon] Laboratoire d’informatique G aspard-Monge, Univer- sit´ e Gustave Eiffel, 5, Boulevard Descartes, Champs-sur-Marn e, 77454 Marne-la- V all´ ee cedex 2, France Ema...

work page 1994

[1] [1]

Duchamp, F

G. Duchamp, F. Hivert , and J.-Y. Thibon , Noncommutative symmetric functions VI: free quasi-symmetric functions and related algebras , Internat. J. Alg. Comput. 12 (2002), 671–717

work page 2002

[2] [2]

Duchamp, F

G. Duchamp, F. Hivert, J.-C. Novelli and J.-Y. Thibon , Noncommutative symmetric functions VII: free quasi-symmetric functions revisited , Ann. Comb. 15 (2011), no. 4, 655–673

work page 2011

[3] [3]

Foissy, F

L. Foissy, F. Patras and J.-Y. Thibon , Deformations of shuﬄes and quasi-shuﬄes , Ann. Institut Fourier 66 (2016), 209–327

work page 2016

[4] [4]

I. M. Gelfand, D. Krob, A. Lascoux, B. Leclerc, V. S. Retakh , and J.-Y. Thibon . Noncommutative symmetric functions , Adv. Math. 112, 1995, 218–348

work page 1995

[5] [5]

Combi- natorics and algebra

I. Gessel , Multipartite P-partitions and inner products of skew Schur functions, [in “Combi- natorics and algebra”, C. Greene, Ed.], Contemporary Mathematic s, 34 (1984), 289–301

work page 1984

[6] [6]

Haglund, M

J. Haglund, M. Haiman and N. Loehr, A combinatorial formula for Macdonald polynomials , J. Am. Math. Soc. 18 (2005) 735–761

work page 2005

[7] [7]

Hivert, J.-C

F. Hivert, J.-C. Novelli, L. Tevlin and J.-Y. Thibon , Permutation statistics related to a class of noncommutative symmetric functions and generali zations of the Genocchi numbers , Selecta Math. (N.S.) 15 (2009), no. 1, 105–119

work page 2009

[8] [8]

Hoffman , Quasi-shuﬄe products, J

M. Hoffman , Quasi-shuﬄe products, J. Algebraic Combin. 11 (2000), no. 1, 49–68

work page 2000

[9] [9]

Hoffman and K

M. Hoffman and K. Ihara , Quasi-shuﬄe products revisited, J. Algebra 481 (2017), 293–326. 14 O. BOUILLOT, J.-C. NOVELLI AND J.-Y. THIBON

work page 2017

[10] [10]

Holte , Carries, combinatorics, and an amazing matrix , Amer

J. Holte , Carries, combinatorics, and an amazing matrix , Amer. Math. Mon. 104 (1997) 138–149

work page 1997

[11] [11]

Keilthy , A generalisation of quasi-shuﬄe algebras and an applicatio n to multiple zeta values, arXiv:2202.04739

A. Keilthy , A generalisation of quasi-shuﬄe algebras and an applicatio n to multiple zeta values, arXiv:2202.04739

work page arXiv

[12] [12]

, and Thibon J.-Y

Krob D., Leclerc B. , and Thibon J.-Y. , Noncommutative symmetric functions II: Trans- formations of alphabets , Intern. J. Alg. Comput., 7, (2), (1997), 181–264

work page 1997

[13] [13]

Krob and J.-Y.Thibon, Noncommutative symmetric functions IV : Quantum linear gro ups and Hecke algebras at q = 0, J

D. Krob and J.-Y.Thibon, Noncommutative symmetric functions IV : Quantum linear gro ups and Hecke algebras at q = 0, J. Alg. Comb. 6 (1997), 339–376

work page 1997

[14] [14]

Lascoux, J.-C

A. Lascoux, J.-C. Novelli and J.-Y. Thibon , Noncommutative symmetric functions with matrix parameters, J. Algebraic Combin. 37 (2013), no. 4, 621–642

work page 2013

[15] [15]

, Symmetric functions and Hall polynomials , Clarendon Press, 1995

Macdonald I.G. , Symmetric functions and Hall polynomials , Clarendon Press, 1995

work page 1995

[16] [16]

S. K. Mason , Recent trends in quasisymmetric functions , Recent trends in algebraic combi- natorics, 239–279, Assoc. Women Math. Ser., 16, Springer, Cham, 2019

work page 2019

[17] [17]

Novelli, F

J.-C. Novelli, F. Patras and J.-Y. Thibon , Natural endomorphisms of quasi-shuﬄe Hopf algebrasa, Bull. Soc. Math. France 141 (2013), no. 1, 107–130

work page 2013

[18] [18]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon , Binary shuﬄe bases for quasi-symmetric functions , Ra- manujan journal 40 (2016), 207–225

work page 2016

[19] [19]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon ,Free quasi-symmetric functions and descent algebras for wreath products, and noncommutative multi-symmetric func tions, Discrete Math. 310 (2010), no. 24, 3584–3606

work page 2010

[20] [20]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon , Noncommutative symmetric functions and an amazing matrix, Adv. in Applied Math. 48 (2012) 528–534

work page 2012

[21] [21]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon ,Noncommutative symmetric functions and Lagrange in- version II: noncrossing partitions and the Farahat-Higman algebra, Adv. in Appl. Math. 140 (2022), Paper No. 102396, 39 pp

work page 2022

[22] [22]

Novelli and J.-Y

J.-C. Novelli and J.-Y. Thibon ,Noncommutative symmetric functions and an amazing ma- trix, Adv. in Applied Math. 48 (2012) 528–534

work page 2012

[23] [23]

Novelli, L

J.-C. Novelli, L. Tevlin and J.-Y. Thibon , On some noncommutative symmetric functions analogous to Hall-Littlewood and Macdonald polynomials , Internat. J. Algebra Comput. 23 (2013), no. 4, 779–801

work page 2013

[24] [24]

Novelli, J.-Y

J.-C. Novelli, J.-Y. Thibon and F. Toumazet , A noncommutative cycle index and new bases of quasi-symmetric functions and noncommutative sym metric functions , Ann. Comb. 24 (2020), no. 3, 557-576

work page 2020

[25] [25]

Novelli, J.-Y

J.-C. Novelli, J.-Y. Thibon and L. K. Williams , Combinatorial Hopf algebras, noncom- mutative Hall-Littlewood functions, and permutation tabl eaux, Adv. Math. 224 (2010), no. 4, 1311–1348

work page 2010

[26] [26]

Poirier , Cycle type and descent set in wreath products , Proceedings of the 7th Conference on Formal Power Series and Algebraic Combinatorics (Noisy-le-Gran d, 1995)

S. Poirier , Cycle type and descent set in wreath products , Proceedings of the 7th Conference on Formal Power Series and Algebraic Combinatorics (Noisy-le-Gran d, 1995). Discrete Math. 180 (1998), no. 1-3, 315–343

work page 1995

[27] [27]

Scharf and J.-Y

T. Scharf and J.-Y. Thibon , On Witt vectors and symmetric functions , Algebra Colloq. 3 (1996), no. 3, 231–238

work page 1996

[28] [28]

Thibon and B.-C.-V

J.-Y. Thibon and B.-C.-V. Ung , Quantum quasi-symmetric functions and Hecke algebras , J. Phys. A: Math. Gen., 29 (1996), 7337–7348

work page 1996

[29] [29]

Zagier ,Values of zeta functions and their applications , in ‘First European Congress of Mathematics” Vol

D. Zagier ,Values of zeta functions and their applications , in ‘First European Congress of Mathematics” Vol. II, pp. 49–512, Birkhauser Boston, Cambridge , MA, 1994. [Bouillot, Novelli, Thibon] Laboratoire d’informatique G aspard-Monge, Univer- sit´ e Gustave Eiffel, 5, Boulevard Descartes, Champs-sur-Marn e, 77454 Marne-la- V all´ ee cedex 2, France Ema...

work page 1994