Optimal additive quaternary codes of dimension $3.5$ and $4$

Sascha Kurz

arxiv: 2410.07650 · v4 · submitted 2024-10-10 · 🧮 math.CO · cs.IT· math.IT

Optimal additive quaternary codes of dimension 3.5 and 4

Sascha Kurz This is my paper

Pith reviewed 2026-05-23 18:57 UTC · model grok-4.3

classification 🧮 math.CO cs.ITmath.IT

keywords additive quaternary codesoptimal parametersdimension 3.5dimension 4minimum distancecoding theorycomputer search

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The pith

The optimal parameters of additive quaternary codes are now known for dimensions 3.5 and 4.

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

The paper finishes the determination of the largest possible additive quaternary codes in dimensions 3.5 and 4. Earlier work had already settled all cases through dimension 3, leaving these as the immediate open cases. It further supplies exact optimal parameters that hold for any dimension once the minimum distance is large enough. These optima fix the maximum number of codewords that can be achieved for given length and distance in this alphabet.

Core claim

After the optimal parameters of additive quaternary codes of dimension k≤3 have been determined there is some recent activity to settle the next case of dimension k=3.5. Here we complete dimension k=3.5 and k=4. We also solve the problem of the optimal parameters of additive quaternary codes of arbitrary dimension when assuming a sufficiently large minimum distance.

What carries the argument

Computational enumeration combined with bounding techniques that rule out any larger code in the target dimensions.

If this is right

The table of optimal parameters is complete for every dimension up to 4.
For any dimension, the exact optimum is known whenever the minimum distance is sufficiently large.
Matching upper and lower bounds are now available in all covered cases.
The results supply explicit constructions that achieve the optima for the settled parameters.

Where Pith is reading between the lines

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

The same enumeration methods could in principle be extended to dimension 4.5 if sufficient computational resources become available.
The closed-form solution for large minimum distance hints at a possible general expression that might be proved analytically without search.
These exact values can serve as benchmarks for testing new bounding techniques in related coding problems over other alphabets.

Load-bearing premise

The computational enumeration or bounding technique used to rule out larger codes for dimensions 3.5 and 4 is exhaustive and free of implementation or rounding errors.

What would settle it

Discovery of an additive quaternary code of dimension 3.5 or 4 whose size exceeds the stated optimum, or an error in the enumeration program that permits a larger code.

read the original abstract

After the optimal parameters of additive quaternary codes of dimension $k\le 3$ have been determined there is some recent activity to settle the next case of dimension $k=3.5$. Here we complete dimension $k=3.5$ and $k=4$. We also solve the problem of the optimal parameters of additive quaternary codes of arbitrary dimension when assuming a sufficiently large minimum distance.

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

Kurz completes the optimal parameters for additive quaternary codes in dimensions 3.5 and 4 and resolves the large-distance case for any dimension.

read the letter

This paper settles the optimal parameters for additive quaternary codes in dimensions k=3.5 and k=4. It also gives the optimal size for any dimension provided the minimum distance is sufficiently large. The contribution is incremental but concrete. After earlier papers handled dimensions up to 3, these two cases were the remaining small ones. The general result for large distance probably uses some asymptotic or bounding argument that becomes tight beyond a certain point. That part looks like it could be useful for anyone needing parameters when d is big. The work is presented straightforwardly, with clear statements of what was open and what is now known. It cites the relevant prior results on smaller dimensions and on related bounds. The main thing to check is the computer-assisted part for the non-existence in k=3.5 and 4. The stress test note points out that the enumeration must be complete and bug-free. If the paper includes details on the algorithm, the number of cases checked, and any independent verification, that would strengthen it. Otherwise, the claims rest on trusting the computation, which is standard but not ironclad in this area. There are no obvious circularities or invented entities here. The results are about completing an existing table rather than redefining the problem. This is a paper for people in coding theory who follow the progress on quaternary additive codes. If you work on constant weight codes or design theory that overlaps with this, the completed parameters might be worth noting. A reader who wants the exact best codes for these dimensions will find it directly useful. It shows honest engagement with the open problems in the literature. I think it deserves peer review to have the computational claims examined and the general result checked for any gaps in the proof. So, my recommendation is to send it to referees rather than desk reject.

Referee Report

1 major / 2 minor

Summary. The manuscript completes the determination of optimal parameters for additive quaternary codes of dimension k=3.5 and k=4 (following prior work for k≤3) via explicit constructions and computer-assisted non-existence arguments. It further resolves the optimal parameters for arbitrary dimension k when the minimum distance d is assumed sufficiently large.

Significance. If the computational results are correct and exhaustive, the work supplies the missing entries in the table of optimal additive quaternary codes for small dimensions and yields a general closed-form solution for large d. This constitutes a concrete advance in the classification of additive codes over GF(4), with potential utility for subsequent bounds and constructions in coding theory.

major comments (1)

[Computational enumeration section (likely §4 or §5)] The optimality claims for k=3.5 and k=4 rest on computer enumeration to rule out larger codes. The manuscript must supply a precise description of the search algorithm, isomorphism pruning, distance computation, and any certificates of exhaustiveness (e.g., in the section detailing the computational results) so that the non-existence statements can be independently verified; absent such detail the central claim remains unverifiable from the text alone.

minor comments (2)

[Introduction] Notation for the quaternary alphabet and the precise definition of dimension 3.5 should be restated explicitly in the introduction for readers unfamiliar with the prior literature on additive codes.
[Tables of results] Tables summarizing the new optimal parameters should include both the achieved (n,M,d) values and the previous best known bounds for direct comparison.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for the positive evaluation of our work and the constructive suggestion regarding the computational section. We address the comment below and will prepare a revised manuscript incorporating additional details.

read point-by-point responses

Referee: [Computational enumeration section (likely §4 or §5)] The optimality claims for k=3.5 and k=4 rest on computer enumeration to rule out larger codes. The manuscript must supply a precise description of the search algorithm, isomorphism pruning, distance computation, and any certificates of exhaustiveness (e.g., in the section detailing the computational results) so that the non-existence statements can be independently verified; absent such detail the central claim remains unverifiable from the text alone.

Authors: We agree that a more precise description is needed to enable independent verification of the non-existence results. In the revised manuscript, we will expand the relevant computational section to provide a detailed account of the search algorithm, including the specific isomorphism pruning methods employed, the procedures used for distance computation, and the certificates or arguments establishing exhaustiveness of the enumeration. These additions will directly support the optimality claims for dimensions k=3.5 and k=4. revision: yes

Circularity Check

0 steps flagged

No circularity; computational completion of external table

full rationale

The paper reports exhaustive computational enumeration to settle optimal parameters for additive quaternary codes at k=3.5 and k=4, extending prior results for k≤3. No equations, fitted parameters, self-definitional constructions, or load-bearing self-citations appear in the provided text. The central claims rest on search completeness rather than any derivation that reduces to its own inputs by construction. This is the expected non-finding for a table-completion result in coding theory.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review supplies no explicit free parameters, axioms, or invented entities.

pith-pipeline@v0.9.0 · 5578 in / 995 out tokens · 23846 ms · 2026-05-23T18:57:43.139431+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/Foundation/AlexanderDuality.lean alexander_duality_circle_linking unclear

?

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

We complete dimension k=3.5 and k=4 … using ILP … Griesmer upper bound … vector space partition of type 2t2(r-2)1
IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

?

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

Lemma 2.3 … 2-divisible [3n,r,2(n-s)]2 code … Griesmer bound g(k,d)

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.

Forward citations

Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

Additive codes attaining the Griesmer bound
cs.IT 2024-12 unverdicted novelty 7.0

Additive codes attain the Griesmer bound with equality for sufficiently large minimum distance, giving infinite series of optimal codes superior to linear codes.

Reference graph

Works this paper leans on

26 extracted references · 26 canonical work pages · cited by 1 Pith paper · 1 internal anchor

[1]

S. Ball, M. Lavrauw, and T. Popatia. Griesmer type bounds for additive codes over finite fields, integral and fractional MDS codes. Designs, Codes and Cryptography, 93(1):175–196, 2025

work page 2025
[2]

Bierbrauer, S

J. Bierbrauer, S. Marcugini, and F. Pambianco. Optimal additive quaternary codes of low dimension.IEEE Transactions on Information Theory, 67(8):5116–5118, 2021

work page 2021
[3]

Blokhuis and A

A. Blokhuis and A. E. Brouwer. Small additive quaternary codes. European Journal of Combinatorics, 25(2):161–167, 2004. 16 Sascha Kurz University of Bayreuth, Germany sascha.kurz@uni-bayreuth.de

work page 2004
[4]

Bouyukhev and D

I. Bouyukhev and D. B. Jaffe. Optimal binary linear codes of dimension at most seven. Discrete Mathematics, 226(1-3):51–70, 2001

work page 2001
[5]

Bouyukhev, D

I. Bouyukhev, D. B. Jaffe, and V . Vavrek. The smallest length of eight-dimensional binary linear codes with prescribed minimum distance. IEEE Transactions on Information Theory, 46(4):1539–1544, 2000

work page 2000
[6]

Bouyukliev, S

I. Bouyukliev, S. Bouyuklieva, and S. Kurz. Computer classification of linear codes. IEEE Transactions on Information Theory, 67(12):7807– 7814, 2021

work page 2021
[7]

Braun, A

M. Braun, A. Kohnert, and A. Wassermann. Optimal linear codes from matrix groups.IEEE Transactions on Information Theory, 51(12):4247– 4251, 2005

work page 2005
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Dodunekov, S

S. Dodunekov, S. Guritman, and J. Simonis. Some new results on the minimum length of binary linear codes of dimension nine. IEEE Trans- actions on Information Theory, 45(7):2543–2546, 1999

work page 1999
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Dodunekov and J

S. Dodunekov and J. Simonis. Codes and projective multisets. The Electronic Journal of Combinatorics, 5:1–23, 1998

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El-Zanati, G

S. El-Zanati, G. Seelinger, P. Sissokho, L. Spence, and C. V . Eynden. On λ-fold partitions of finite vector spaces and duality. Discrete Mathe- matics, 311(4):307–318, 2011

work page 2011
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Govaerts

P. Govaerts. Classifications of blocking set related structures in Galois geometries. PhD thesis, Ghent University, 2003

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J. H. Griesmer. A bound for error-correcting codes. IBM Journal of Research and Development, 4(5):532–542, 1960

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C. Guan, R. Li, Y . Liu, and Z. Ma. Some quaternary additive codes outperform linear counterparts.IEEE Transactions on Information Theory, 2023

work page 2023
[14]

C. Guan, J. Lv, G. Luo, and Z. Ma. Combinatorial constructions of optimal quaternary additive codes. IEEE Transactions on Information Theory, 70(11):7690–7700, 2024

work page 2024
[15]

J. W. P. Hirschfeld. Projective geometries over finite fields. Oxford University Press, 1998

work page 1998
[16]

D.B. Jaffe. A brief tour of split linear programming. In T. Mora and H. Mattson, editors, International Symposium on Applied Algebra, Algebraic Algorithms, and Error-Correcting Codes, LNCS volume 1255, pages 164–173. Springer, 1997

work page 1997
[17]

D. S. Krotov and I. Y . Mogilnykh. Multispreads.arXiv preprint 2312.07883, 2023

work page arXiv 2023
[18]

S. Kurz. Additive codes attaining the Griesmer bound. arXiv preprint 2412.14615, 2024

work page internal anchor Pith review Pith/arXiv arXiv 2024
[19]

S. Kurz. Computer classification of linear codes based on lattice point enumeration. In International Congress on Mathematical Software , pages 97–105. Springer, 2024

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[20]

F. J. MacWilliams and N. J. A. Sloane. The theory of error-correcting codes, volume 16. Elsevier, 1977

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[21]

Mateva and S.T

Z.T. Mateva and S.T. Topalova. Line spreads of PG(5, 2). Journal of Combinatorial Designs, 17(1):90–102, 2000

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J. Sheekey. MRD codes: constructions and connections. In K.-U. Schmidt and A. Winterhof, editors,Combinatorics and finite fields: Difference sets, polynomials, pseudorandomness and applications, volume 23, pages 255–286. de Gruyter, 2019

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[23]

J. Simonis. MacWilliams identities and coordinate partitions. Linear Algebra and its Applications, 216:81–91, 1995

work page 1995
[24]

Solomon and J

G. Solomon and J. J. Stiffler. Algebraically punctured cyclic codes. Information and Control, 8(2):170–179, 1965

work page 1965
[25]

Tsfasman and S

M. Tsfasman and S. Vl ˘adut ¸.Algebraic-Geometric Codes. Mathematics and its Applications. Springer Dordrecht, 1991

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[26]

H. N. Ward. Divisibility of codes meeting the Griesmer bound. Journal of Combinatorial Theory, Series A, 83(1):79–93, 1998

work page 1998

[1] [1]

S. Ball, M. Lavrauw, and T. Popatia. Griesmer type bounds for additive codes over finite fields, integral and fractional MDS codes. Designs, Codes and Cryptography, 93(1):175–196, 2025

work page 2025

[2] [2]

Bierbrauer, S

J. Bierbrauer, S. Marcugini, and F. Pambianco. Optimal additive quaternary codes of low dimension.IEEE Transactions on Information Theory, 67(8):5116–5118, 2021

work page 2021

[3] [3]

Blokhuis and A

A. Blokhuis and A. E. Brouwer. Small additive quaternary codes. European Journal of Combinatorics, 25(2):161–167, 2004. 16 Sascha Kurz University of Bayreuth, Germany sascha.kurz@uni-bayreuth.de

work page 2004

[4] [4]

Bouyukhev and D

I. Bouyukhev and D. B. Jaffe. Optimal binary linear codes of dimension at most seven. Discrete Mathematics, 226(1-3):51–70, 2001

work page 2001

[5] [5]

Bouyukhev, D

I. Bouyukhev, D. B. Jaffe, and V . Vavrek. The smallest length of eight-dimensional binary linear codes with prescribed minimum distance. IEEE Transactions on Information Theory, 46(4):1539–1544, 2000

work page 2000

[6] [6]

Bouyukliev, S

I. Bouyukliev, S. Bouyuklieva, and S. Kurz. Computer classification of linear codes. IEEE Transactions on Information Theory, 67(12):7807– 7814, 2021

work page 2021

[7] [7]

Braun, A

M. Braun, A. Kohnert, and A. Wassermann. Optimal linear codes from matrix groups.IEEE Transactions on Information Theory, 51(12):4247– 4251, 2005

work page 2005

[8] [8]

Dodunekov, S

S. Dodunekov, S. Guritman, and J. Simonis. Some new results on the minimum length of binary linear codes of dimension nine. IEEE Trans- actions on Information Theory, 45(7):2543–2546, 1999

work page 1999

[9] [9]

Dodunekov and J

S. Dodunekov and J. Simonis. Codes and projective multisets. The Electronic Journal of Combinatorics, 5:1–23, 1998

work page 1998

[10] [10]

El-Zanati, G

S. El-Zanati, G. Seelinger, P. Sissokho, L. Spence, and C. V . Eynden. On λ-fold partitions of finite vector spaces and duality. Discrete Mathe- matics, 311(4):307–318, 2011

work page 2011

[11] [11]

Govaerts

P. Govaerts. Classifications of blocking set related structures in Galois geometries. PhD thesis, Ghent University, 2003

work page 2003

[12] [12]

J. H. Griesmer. A bound for error-correcting codes. IBM Journal of Research and Development, 4(5):532–542, 1960

work page 1960

[13] [13]

C. Guan, R. Li, Y . Liu, and Z. Ma. Some quaternary additive codes outperform linear counterparts.IEEE Transactions on Information Theory, 2023

work page 2023

[14] [14]

C. Guan, J. Lv, G. Luo, and Z. Ma. Combinatorial constructions of optimal quaternary additive codes. IEEE Transactions on Information Theory, 70(11):7690–7700, 2024

work page 2024

[15] [15]

J. W. P. Hirschfeld. Projective geometries over finite fields. Oxford University Press, 1998

work page 1998

[16] [16]

D.B. Jaffe. A brief tour of split linear programming. In T. Mora and H. Mattson, editors, International Symposium on Applied Algebra, Algebraic Algorithms, and Error-Correcting Codes, LNCS volume 1255, pages 164–173. Springer, 1997

work page 1997

[17] [17]

D. S. Krotov and I. Y . Mogilnykh. Multispreads.arXiv preprint 2312.07883, 2023

work page arXiv 2023

[18] [18]

S. Kurz. Additive codes attaining the Griesmer bound. arXiv preprint 2412.14615, 2024

work page internal anchor Pith review Pith/arXiv arXiv 2024

[19] [19]

S. Kurz. Computer classification of linear codes based on lattice point enumeration. In International Congress on Mathematical Software , pages 97–105. Springer, 2024

work page 2024

[20] [20]

F. J. MacWilliams and N. J. A. Sloane. The theory of error-correcting codes, volume 16. Elsevier, 1977

work page 1977

[21] [21]

Mateva and S.T

Z.T. Mateva and S.T. Topalova. Line spreads of PG(5, 2). Journal of Combinatorial Designs, 17(1):90–102, 2000

work page 2000

[22] [22]

J. Sheekey. MRD codes: constructions and connections. In K.-U. Schmidt and A. Winterhof, editors,Combinatorics and finite fields: Difference sets, polynomials, pseudorandomness and applications, volume 23, pages 255–286. de Gruyter, 2019

work page 2019

[23] [23]

J. Simonis. MacWilliams identities and coordinate partitions. Linear Algebra and its Applications, 216:81–91, 1995

work page 1995

[24] [24]

Solomon and J

G. Solomon and J. J. Stiffler. Algebraically punctured cyclic codes. Information and Control, 8(2):170–179, 1965

work page 1965

[25] [25]

Tsfasman and S

M. Tsfasman and S. Vl ˘adut ¸.Algebraic-Geometric Codes. Mathematics and its Applications. Springer Dordrecht, 1991

work page 1991

[26] [26]

H. N. Ward. Divisibility of codes meeting the Griesmer bound. Journal of Combinatorial Theory, Series A, 83(1):79–93, 1998

work page 1998