On 2-connected graphs without cycles of length 1 modulo 3

Binlong Li; Boram Park; Hojin Chu; Homoon Ryu; Yandong Bai

arxiv: 2606.02356 · v2 · pith:HFH4JUKAnew · submitted 2026-06-01 · 🧮 math.CO

On 2-connected graphs without cycles of length 1 modulo 3

Yandong Bai , Hojin Chu , Binlong Li , Boram Park , Homoon Ryu This is my paper

Pith reviewed 2026-06-28 13:53 UTC · model grok-4.3

classification 🧮 math.CO

keywords extremal graph theorycycle lengths modulo k2-connected graphsforbidden cyclesPetersen graphedge extremal function

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The pith

The maximum number of edges in a 2-connected graph without cycles of length 1 modulo 3 is determined with a complete characterization of the extremal graphs.

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

The authors determine the largest possible number of edges in an n-vertex 2-connected graph that contains no cycle whose length is congruent to 1 modulo 3. They give both the sharp upper bound on the edge count and identify all graphs that meet it. This reveals that the extremal 2-connected graphs have structures unlike the ones built from Petersen graph blocks in the general case. Combining the new result with the earlier general-case bound produces a full description of every extremal graph, even when 9 does not divide n-1. The paper also settles the corresponding problem for graphs avoiding cycles of length 2 modulo 4 in the 2-connected setting.

Core claim

In the 2-connected setting, the extremal number of edges in an n-vertex graph with no cycle of length 1 modulo 3 is determined exactly, and the graphs attaining this number are completely characterized. These extremal graphs differ structurally from those in the non-2-connected case. The same determination is made for the 2-connected graphs without cycles of length 2 modulo 4. As a consequence, the extremal numbers for 2-connected graphs without cycles of a fixed length modulo k are now known for every k at most 4.

What carries the argument

The extremal function for the number of edges in 2-connected graphs forbidding cycles of length ≡1 mod 3, together with the explicit structural characterization of the graphs attaining the maximum.

Load-bearing premise

That every extremal graph on more than 18 vertices in the general setting must contain a cut-vertex.

What would settle it

A single 2-connected graph on n vertices for some n > 18 with no cycle of length congruent to 1 modulo 3 and strictly more edges than the maximum stated by the characterization would disprove the claimed bound.

Figures

Figures reproduced from arXiv: 2606.02356 by Binlong Li, Boram Park, Hojin Chu, Homoon Ryu, Yandong Bai.

**Figure 2.** Figure 2: Graph L2(H6). Recall that H10 is the Petersen graph. We denote by H − 10 the graph obtained from H10 by removing an arbitrary edge. Fact 2.5. If H ∈ H3 ∪ S15 n=5 Hn ∪ H′ 10 ∪ {H − 10}, then {x, y} is a 2-extendable pair if and only if H has an (x, y)-3-thread, unless H ∼= H8 and x, y have distance 2 in H and both have degree 2. Proof. The assertion can be proved by checking the graphs in H3 ∪ S15 n=5 Hn ∪ … view at source ↗

**Figure 3.** Figure 3: All non-isomorphic graphs in the class H′ 10 [PITH_FULL_IMAGE:figures/full_fig_p006_3.png] view at source ↗

**Figure 4.** Figure 4: All non-isomorphic graphs in the class H12. 6 [PITH_FULL_IMAGE:figures/full_fig_p006_4.png] view at source ↗

**Figure 5.** Figure 5: The unique graph in Hn, n ≥ 13 is odd and k = 1 2 (n − 11). Proof. We denote by Πk the graph obtained from a Petersen graph P with an edge xy by adding a new vertex z, the edge xz, and k internally vertex-disjoint (y, z)-3-threads whose internal vertices are disjoint from P. Let H be a graph in Hn. We will show that H ∼= Πk. If n = 13, then H is a 3-extension of the Petersen graph H10. Note that H10 is edg… view at source ↗

**Figure 6.** Figure 6: Graphs K∗ 4 , Wˆ 4, K′ 3,3 and Kˆ (0) 3,3 . Lemma 3.4. Let G be an essentially 3-connected graph without (1 mod 3)-cycles. If G does not contain two vertex-disjoint cycles, then G is isomorphic to one of the following graphs, H7, H8, H9, H11, K∗ 4 , Wˆ 4, K′ 3,3 , Kˆ (i) 3,p with p ≥ 3 and i ∈ [0, 3]. (1) The proof of Lemma 3.4 will be given in Subsection 4.2. 4 Proofs An inner-vertex in a block is a verte… view at source ↗

**Figure 7.** Figure 7: Constructions of G in Fact 4.1 (2) Suppose first that τ = 0. If there are two edges incident to x2 that are not subdivided, say x2y1, x2y2, then x1y1x2y2x1 converts to a 4-cycle, a contradiction. It follows that at least two edges incident to x2 14 [PITH_FULL_IMAGE:figures/full_fig_p014_7.png] view at source ↗

**Figure 8.** Figure 8: Constructions of G in Case 1 Suppose first that τ = 0. Then both H − v1 and H − v2 convert to an H7, implying that all edges between {v1, v2} and {v3, v4, v5} are subdivided. That is, G ∼= H11, as desired. Suppose second that τ = 2. Then both H − v1 and H − v2 convert to an H7 or H8. In each case τ (v3v1v4) = τ (v4v2v5) = 1. Now v3v1v4v2v5v3 converts to a 7-cycle, a contradiction. 15 [PITH_FULL_IMAGE:figu… view at source ↗

**Figure 9.** Figure 9: Constructions of G in Case 3 Suppose first that τ = 0. If τ (uv2v1) = 0, then uvpv1v2u converts to a 4-cycle; if τ (uv2v1) = 1, then uv1v2u converts to a 4-cycle, both contradictions. So we conclude that τ (uv2v1) = 2, and similarly, τ (uvp−1vp) = 2. That is, all four edges uv2, v1v2, uvp−1, vp−1vp are subdivided. Now vp−1uv2, vp−1vpv1v2, vp−1vpuv1v2 convert to three (vp−1, v2)-paths of length 4, 5, 6, res… view at source ↗

**Figure 10.** Figure 10: Graph Fk. Theorem 5.3. For n ≥ 3, ex2(n, C2 mod 4) =    [PITH_FULL_IMAGE:figures/full_fig_p018_10.png] view at source ↗

read the original abstract

Burr and Erd\H{o}s conjectured in 1976 that for all integers $k>\ell\geq 0$ such that $k\mathbb{Z}+\ell$ contains an even integer, every $n$-vertex graph without cycles of length $\ell$ modulo $k$ has at most a linear number of edges in $n$. Bollob\'{a}s confirmed the conjecture in 1977, and Erd\H{o}s further asked for the exact extremal number. To the best of our knowledge, this problem has been solved only for all residues when $k\leq 4$, and for $\ell\in \{0,2\}$ when $k\geq 5$ is odd. In particular, Bai {\it et al.} [arXiv:2503.03504] proved that if $G$ is an $n$-vertex graph with no cycles of length $1$ modulo $3$, then $e(G)\le \frac{5}{3}(n-1)$, and when $9\mid (n-1)$ the equality holds if and only if each block of $G$ is isomorphic to the Petersen graph. Note that for $n> 18$ every extremal graph contains a cut-vertex. In this paper, we investigate the 2-connected setting and determine the maximum number of edges in a 2-connected graph with no cycles of length $1$ modulo $3$. Our results provide a sharp extremal bound and a complete characterization of the extremal graphs, revealing structural differences from the general case. Combining this with the result of Bai {\it et al.}, we also obtain a complete characterization of all extremal graphs in the general setting, including the cases where $9\nmid (n-1)$. Finally, we determine the maximum number of edges in a $2$-connected graph with no cycles of length $2$ modulo $4$, whose extremal graphs differ substantially from those in the general setting. Consequently, the extremal numbers for $2$-connected graphs with no cycle of a fixed length modulo $k$ are now determined for all $k\leq 4$.

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 claims to settle the 2-connected extremal number for no 1-mod-3 cycles and finish the general characterization, but the argument leans on an un-rederived cut-vertex fact from Bai et al.

read the letter

The core advance is a sharp bound plus full structural description for 2-connected n-vertex graphs with no cycle length ≡1 mod 3. They also combine this with the earlier Bai et al. result to handle the remaining cases where 9 does not divide n-1, and they give a parallel result for the 2-mod-4 condition under 2-connectivity. That completes the k≤4 picture for 2-connected graphs.

What they do cleanly is separate the 2-connected setting from the block-graph constructions that achieve the general bound when equality holds. The abstract indicates the extremal 2-connected graphs are different in structure, which is the kind of distinction that matters for these problems.

The soft spot is the reliance on the prior note that every extremal graph for n>18 has a cut-vertex. This paper uses that fact to justify treating the 2-connected case separately and to claim the full classification. No independent argument for the cut-vertex property appears in the abstract, and the full proofs are not supplied here, so the case analysis and base cases cannot be checked. If a 2-connected extremal example with more edges exists for some n, both the bound and the separation fail.

This is narrow extremal graph theory. A reader already working on modular cycle conditions or on the Burr-Erdős conjecture will get direct value from the characterizations. It is not a broad-interest paper.

It deserves a serious referee. The claims are internally consistent with the cited literature and the problem is well-posed, even if the proofs need verification.

Referee Report

1 major / 0 minor

Summary. The paper determines the maximum number of edges in a 2-connected n-vertex graph with no cycles of length 1 modulo 3, provides a sharp extremal bound together with a complete characterization of the extremal graphs, and combines the new 2-connected results with Bai et al. to obtain a complete characterization of all extremal graphs in the general (not necessarily 2-connected) setting, including the cases where 9 does not divide (n-1). It also determines the extremal number and extremal graphs for 2-connected graphs with no cycles of length 2 modulo 4.

Significance. If the results hold, the work completes the extremal function and structural classification for forbidden cycle lengths 1 mod 3 and 2 mod 4, both in the general and 2-connected settings, for all k ≤ 4. The explicit contrast between 2-connected and general extremal graphs supplies concrete structural information and falsifiable predictions.

major comments (1)

[Introduction] Introduction (paragraph citing Bai et al.): the separation of the 2-connected analysis and the claimed completion of the general characterization when 9 does not divide (n-1) rest on the statement that 'for n>18 every extremal graph contains a cut-vertex.' This structural fact is attributed to Bai et al. but is neither re-derived nor given a precise theorem citation inside the manuscript; because the fact is load-bearing for both the separation and the completeness claim, an independent verification or explicit reference to the exact result in Bai et al. is required.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for the careful reading and for identifying the need for a more precise citation in the introduction. We address the major comment below.

read point-by-point responses

Referee: [Introduction] Introduction (paragraph citing Bai et al.): the separation of the 2-connected analysis and the claimed completion of the general characterization when 9 does not divide (n-1) rest on the statement that 'for n>18 every extremal graph contains a cut-vertex.' This structural fact is attributed to Bai et al. but is neither re-derived nor given a precise theorem citation inside the manuscript; because the fact is load-bearing for both the separation and the completeness claim, an independent verification or explicit reference to the exact result in Bai et al. is required.

Authors: We agree that a precise theorem citation is needed for this load-bearing structural fact. In the revised manuscript we will add an explicit reference to the specific theorem in Bai et al. [arXiv:2503.03504] establishing that for n>18 every extremal graph contains a cut-vertex. This will clarify the separation of cases and support the completeness claim for all n without requiring re-derivation in the present paper. revision: yes

Circularity Check

0 steps flagged

No significant circularity; 2-connected analysis is independent

full rationale

The paper derives a sharp extremal bound and complete characterization for 2-connected graphs without 1 mod 3 cycles through new combinatorial arguments, as stated in the abstract. It cites Bai et al. (arXiv:2503.03504) for the general-case bound and the note on cut-vertices for n>18 solely to separate the 2-connected case and extend the general characterization to when 9 does not divide (n-1). No equation, parameter, or prediction in the text reduces by construction to a fit or self-definition within this paper; the cited prior result functions as external support rather than a load-bearing reduction of the new claims. The derivation chain for the 2-connected results remains self-contained against the provided source text.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The paper is a pure proof paper in extremal graph theory. It relies on background theorems rather than introducing fitted parameters or new entities.

axioms (2)

standard math Standard results on blocks, cut-vertices, and 2-connectivity in graphs
Invoked to relate 2-connected graphs to their block decompositions and to separate the 2-connected case from the general case.
domain assumption The extremal result of Bai et al. (arXiv:2503.03504) for arbitrary graphs
Combined with the new 2-connected result to obtain the complete general-case characterization.

pith-pipeline@v0.9.1-grok · 5942 in / 1495 out tokens · 39006 ms · 2026-06-28T13:53:24.175246+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

16 extracted references

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J. Gao, B. Li, J. Ma, and T. Xie , On two cycles of consecutive even lengths, J. Graph Theory 106(2) (2024):225--238

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Gy o ri, B

E. Gy o ri, B. Li, N. Salia, C. Tompkins, K. Varga, and M. Zhu , On graphs without cycles of length 0 modulo 4 , J. Combin. Theory Ser. B 176 (2026):7--29

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B. Li, Y. Pan, and L. Shi , A note on two cycles of consecutive even lengths in graphs, Discrete Math. 349(3) (2026):114820

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Lov\' a sz , On graphs not containing independent circuits, Mat

L. Lov\' a sz , On graphs not containing independent circuits, Mat. Lapok 16 (1965):289--299

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[16]

Saito , Cycles of length 2 modulo 3 in graphs, Discrete Math

A. Saito , Cycles of length 2 modulo 3 in graphs, Discrete Math. 101(1-3) (1992):285--289

1992

[1] [1]

Y. Bai, A. Grzesik, B. Li, and M. Prorok , Cycle lengths in graphs of given minimum degree, arXiv :2511.03085

arXiv

[2] [2]

Y. Bai, B. Li, Y. Pan, and S. Zhang , On graphs without cycles of length 1 modulo 3 , arXiv :2503.03504

arXiv

[3] [3]

Bollob\' a s , Cycles modulo k , Bull

B. Bollob\' a s , Cycles modulo k , Bull. London Math. Soc. 9(1) (1977):97--98

1977

[4] [4]

Chen and A

G. Chen and A. Saito , Graphs with a cycle of length divisible by three, J. Combin. Theory Ser. B 60(2) (1994):277--292

1994

[5] [5]

H. Chu, B. Park, and H. Ryu , On 2 -connected graphs avoiding cycles of length 0 modulo 4 , arXiv :2507.12798

arXiv

[6] [6]

C. R. J. Clapham, A. Flockhart, and J. Sheehan , Graphs without four-cycles, J. Graph Theory 13(1) (1989):29--47

1989

[7] [7]

N. Dean, A. Kaneko, K. Ota, and B. Toft , Cycles modulo 3 , Dimacs Technical Report 91(32) (1991)

1991

[8] [8]

N. Dean, L. Lesniak, and A. Saito , Cycles of length 0 modulo 4 in graphs, Discrete Math. 121(1--3) (1993):37--49

1993

[9] [9]

Erd o s , Some recent problems and results in graph theory, combinatorics, and number theory, In Proc

P. Erd o s , Some recent problems and results in graph theory, combinatorics, and number theory, In Proc. Seventh SE Conf. Combinatorics, Graph Theory and Computing, Utilitas Math. (1976):3--14

1976

[10] [10]

Fan , New sufficient conditions for cycles in graphs, J

G. Fan , New sufficient conditions for cycles in graphs, J. Combin. Theory Ser. B 37(3) (1984):221--227

1984

[11] [11]

J. Gao, Q. Huo, C. Liu, and J. Ma , A unified proof of conjectures on cycle lengths in graphs, Int. Math. Res. Not. IMRN 2022(10) (2022):7615--7653

2022

[12] [12]

J. Gao, B. Li, J. Ma, and T. Xie , On two cycles of consecutive even lengths, J. Graph Theory 106(2) (2024):225--238

2024

[13] [13]

Gy o ri, B

E. Gy o ri, B. Li, N. Salia, C. Tompkins, K. Varga, and M. Zhu , On graphs without cycles of length 0 modulo 4 , J. Combin. Theory Ser. B 176 (2026):7--29

2026

[14] [14]

B. Li, Y. Pan, and L. Shi , A note on two cycles of consecutive even lengths in graphs, Discrete Math. 349(3) (2026):114820

2026

[15] [15]

Lov\' a sz , On graphs not containing independent circuits, Mat

L. Lov\' a sz , On graphs not containing independent circuits, Mat. Lapok 16 (1965):289--299

1965

[16] [16]

Saito , Cycles of length 2 modulo 3 in graphs, Discrete Math

A. Saito , Cycles of length 2 modulo 3 in graphs, Discrete Math. 101(1-3) (1992):285--289

1992