Fat-triangle linkage and kite-linked graphs

Gexin Yu; Martin Rolek; Runrun Liu

arxiv: 1906.09197 · v1 · pith:BLQXYF2Nnew · submitted 2019-06-21 · 🧮 math.CO

Fat-triangle linkage and kite-linked graphs

Runrun Liu , Martin Rolek , Gexin Yu This is my paper

Pith reviewed 2026-05-25 18:48 UTC · model grok-4.3

classification 🧮 math.CO

keywords H-linked graphsfat-trianglekiteconnectivitysubdivisiongraph linkage

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The pith

Any k-connected graph is F_k-linked for a connected k-fat-triangle, and every 8-connected graph is kite-linked.

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

The paper examines how much connectivity a graph needs to guarantee it contains a subdivision of a given multigraph H whenever the vertices of H are mapped injectively into the graph. For the k-fat-triangle, a multigraph on three vertices with exactly k edges, the authors show that k-connectivity is enough whenever the multigraph is connected. They then use this result to prove that 8-connectivity forces a graph to be kite-linked, where the kite is the graph obtained from K4 by deleting two edges at one vertex, thereby bounding the connectivity threshold for kite-linkage between 7 and 8.

Core claim

A graph G is H-linked if every injective map from the vertices of the multigraph H into G extends to an H-subdivision in G. The central result is that every k-connected graph is F_k-linked when F_k is a connected k-fat-triangle. As a direct application, every 8-connected graph is kite-linked.

What carries the argument

The H-linked property, which requires that any vertex mapping from the multigraph H extends to a subdivision of H inside G.

If this is right

k-connectivity suffices for F_k-linkage whenever F_k is connected.
8-connectivity suffices for kite-linkage.
The exact connectivity threshold for kite-linkage lies in {7,8}.
The fat-triangle result provides a tool for proving linkage of other small multigraphs.

Where Pith is reading between the lines

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

The same method may yield connectivity bounds for linkage of other small graphs obtained by edge deletions from complete graphs.
Exact thresholds for other H could be settled by constructing counterexamples at connectivity one less than the bound.
These linkage results may interact with existing theorems on highly connected graphs containing subdivisions of fixed graphs.

Load-bearing premise

The results rest on the precise definitions of the k-fat-triangle as a three-vertex multigraph with k edges and the kite as K4 minus two edges at one vertex.

What would settle it

A single (k-1)-connected graph that is not F_k-linked for some connected F_k, or a single 7-connected graph that is not kite-linked.

Figures

Figures reproduced from arXiv: 1906.09197 by Gexin Yu, Martin Rolek, Runrun Liu.

**Figure 1.** Figure 1: A (u1, u2, u3, u4)-flower. Lemma 4.1. Suppose G is a 7-connected graph such that for some four vertices u2, u1, u3, u4 ∈ V (G), G contains no walk through u2, u1, u3, u2, u4 in order. Further suppose that there exist internally disjoint 7 [PITH_FULL_IMAGE:figures/full_fig_p007_1.png] view at source ↗

**Figure 2.** Figure 2: Intermediate structure used to find a P4-linkage References [1] B. Bollob´as and A. Thomason. Highly linked graphs. Combinatorica, 16(3):313–320, 1996. [2] G. A. Dirac. In abstrakten Graphen vorhandene vollst¨andige 4-Graphen und ihre Unterteilungen. Math. Nachr., 22:61–85, 1960. [3] M. Ellingham, M. P. Plummer, and G. Yu. Diamond-linkage and P4-linkage. J. Graph Theory, 70(3):241–261, 2012. [4] R. J. Faud… view at source ↗

read the original abstract

For a multigraph $H$, a graph $G$ is $H$-linked if every injective mapping $\phi: V(H)\to V(G)$ can be extended to an $H$-subdivision in $G$. We study the minimum connectivity required for a graph to be $H$-linked. A $k$-fat-triangle $F_k$ is a multigraph with three vertices and a total of $k$ edges. We determine a sharp connectivity requirement for a graph to be $F_k$-linked. In particular, any $k$-connected graph is $F_k$-linked when $F_k$ is connected. A kite is the graph obtained from $K_4$ by removing two edges at a vertex. As a nontrivial application of $F_k$-linkage, we then prove that every $8$-connected graph is kite-linked, which shows that the required connectivity for a graph to be kite-linked is $7$ or $8$.

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 pins down that k-connectivity suffices for F_k-linkage whenever the three-vertex multigraph is connected, then uses it to show every 8-connected graph is kite-linked.

read the letter

The core advance is the exact threshold result: any k-connected graph is F_k-linked as long as F_k (three vertices, total k edges) is connected. They then apply this to prove that 8-connectivity guarantees kite-linkage, where a kite is K4 minus two edges incident to one vertex. This leaves the precise kite threshold at either 7 or 8. The F_k statement looks like the main new piece; the kite part is framed as a nontrivial but secondary application. The work sits squarely in the existing literature on H-linked graphs and uses standard linkage techniques without obvious circularity or invented machinery. The abstract states the claims cleanly, and the stress-test note finds no hidden assumptions that would break the thresholds. One minor limitation is that the kite result stops short of deciding between 7 and 8, so it does not fully close the question it raises. That is not a flaw in the argument, just a natural stopping point. The paper is for people already working on linkage problems in structural graph theory. A reader outside that niche will not get much out of it, but inside the subfield the exact bound for this family of H is useful. It is the kind of targeted, technically competent result that belongs in a combinatorics journal and should go to referees rather than be desk-rejected.

Referee Report

0 major / 2 minor

Summary. The manuscript studies H-linkage for multigraphs H. It proves that any k-connected graph is F_k-linked whenever the multigraph F_k (three vertices, total of k edges) is connected. As a nontrivial application, it shows every 8-connected graph is kite-linked (kite obtained from K_4 by deleting two incident edges), implying the minimum connectivity guaranteeing kite-linkage lies between 7 and 8.

Significance. If the proofs hold, the results give sharp connectivity thresholds for a family of linkage problems and demonstrate a useful reduction from kite-linkage to fat-triangle linkage. The explicit connectivity bounds and the application to a concrete non-multigraph H advance the literature on subdivision and linkage properties in highly connected graphs.

minor comments (2)

[Abstract] Abstract: the phrase 'removing two edges at a vertex' for the kite would be clearer if accompanied by a small diagram or explicit edge list in the introduction.
[Introduction] The manuscript would benefit from an explicit statement of the lower-bound example showing that 7-connectivity is insufficient for kite-linkage (if such an example is present).

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the careful reading of the manuscript, the positive evaluation of its contributions, and the recommendation to accept.

Circularity Check

0 steps flagged

No significant circularity; derivation is self-contained

full rationale

The paper states two main theorems: any k-connected graph is F_k-linked (when F_k connected) and every 8-connected graph is kite-linked. These are presented as proved results using standard linkage definitions and connectivity arguments. No self-definitional steps, fitted inputs renamed as predictions, or load-bearing self-citations appear in the abstract or stated claims. The kite result is described as a nontrivial application of the fat-triangle result rather than an identity or renaming. The derivation chain relies on external graph-theoretic machinery without reducing to its own inputs by construction. This is the expected honest non-finding for a standard linkage paper.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The paper introduces no free parameters, new axioms beyond standard math, or invented entities; it works within established graph theory framework.

axioms (1)

standard math Standard definitions and properties of graphs, multigraphs, connectivity, and subdivisions.
These are invoked throughout the definitions and results in the abstract.

pith-pipeline@v0.9.0 · 5692 in / 1065 out tokens · 71739 ms · 2026-05-25T18:48:51.463343+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

25 extracted references · 25 canonical work pages

[1]

Bollob´ as and A

B. Bollob´ as and A. Thomason. Highly linked graphs. Combinatorica, 16(3):313–320, 1996

work page 1996
[2]

G. A. Dirac. In abstrakten Graphen vorhandene vollst¨ an dige 4-Graphen und ihre Unterteilungen. Math. Nachr. , 22:61–85, 1960

work page 1960
[3]

Ellingham, M

M. Ellingham, M. P. Plummer, and G. Yu. Diamond-linkage a nd P4-linkage. J. Graph Theory , 70(3):241–261, 2012

work page 2012
[4]

R. J. Faudree. Survery on results on k-ordered graphs. Discrete Math , 229:73–87, 2001

work page 2001
[5]

Ferrara, R

M. Ferrara, R. Gould, G. Tansey, and T. Whalen. On H-linked graphs. Graphs Combin. , 22(2):217–224, 2006

work page 2006
[6]

R. J. Gould, A. V. Kostochka, and G. Yu. On minimum degree i mplying that a graph is H-linked. SIAM J. Discrete Math. , 20(4):829–840 (electronic), 2006

work page 2006
[7]

H. A. Jung. Eine Verallgemeinerung des n-fachen Zusammenhangs f¨ ur Graphen.Math. Ann. , 187:95–103, 1970

work page 1970
[8]

Kawarabayashi, A

K. Kawarabayashi, A. V. Kostochka, and G. Yu. On suﬃcient degree conditions for a graph to be k-linked. Combin. Probab. Comput., 15(5):685–694, 2006

work page 2006
[9]

A. V. Kostochka and G. Yu. An extremal problem for H-linked graphs. J. Graph Theory , 50(4):321–339, 2005

work page 2005
[10]

A. V. Kostochka and G. Yu. Minimum degree conditions for H-linked graphs. Discrete Appl. Math. , 156(9):1542–1548, 2008

work page 2008
[11]

A. V. Kostochka and G. Yu. Ore-type degree conditions fo r a graph to be H-linked. J. Graph Theory , 58(1):14–26, 2008

work page 2008
[12]

D. G. Larman and P. Mani. On the existence of certain conﬁ gurations within graphs and the 1-skeletons of polytopes. Proc. London Math. Soc. (3) , 20:144–160, 1970

work page 1970
[13]

Q. Liu, D. B. W est, and G. Yu. Implications among linkage properties in graphs. J. Graph Theory , 60(4):327–337, 2009

work page 2009
[14]

W. Mader. Homomorphieeigenschaften und mittlere Kant endichte von Graphen. Math. Ann. , 174:265–268, 1967

work page 1967
[15]

W. Mader. ¨Uber die Maximalzahl kreuzungsfreier H-Wege. Arch. Math. (Basel) , 31:387–402, 1978

work page 1978
[16]

McCarty, Y

R. McCarty, Y. W ang, and X. Yu. 7-connected graphs are 4- ordered. https://arxiv.org/abs/1808.05124v2, 2018+

work page arXiv 2018
[17]

Robertson, P

N. Robertson, P. Seymour, and R. Thomas. Hadwiger’s con jecture for K6-free graphs. Combinatorica, 13(3):279–361, 1993

work page 1993
[18]

Robertson and P

N. Robertson and P. D. Seymour. Graph minors. XIII. The d isjoint paths problem. J. Combin. Theory Ser. B , 63(1):65–110, 1995

work page 1995
[19]

Schrijver

A. Schrijver. A short proof of Mader’s S-paths theorem. J. Combin. Theory, Ser. B , 82:319–321, 2001

work page 2001
[20]

P. D. Seymour. Disjoint paths in graphs. Discrete Math. , 29(3):293–309, 1980

work page 1980
[21]

Thomas and P

R. Thomas and P. W ollan. An improved linear edge bound fo r graph linkages. European J. Combin. , 26(3-4):309–324, 2005

work page 2005
[22]

Thomas and P

R. Thomas and P. W ollan. The extremal function for 3-lin ked graphs. J. Combin. Theory Ser. B , 98(5):939–971, 2008

work page 2008
[23]

Thomassen

C. Thomassen. 2-linked graphs. European J. Combin. , 1(4):371–378, 1980

work page 1980
[24]

M. E. W atkins and D. M. Mesner. Cycles and connectivity i n graphs. Canad. J. Math. , 19:1319–1328, 1967

work page 1967
[25]

X. Yu. Disjoint paths in graphs. III. Characterization . Ann. Comb. , 7(2):229–246, 2003. 13

work page 2003

[1] [1]

Bollob´ as and A

B. Bollob´ as and A. Thomason. Highly linked graphs. Combinatorica, 16(3):313–320, 1996

work page 1996

[2] [2]

G. A. Dirac. In abstrakten Graphen vorhandene vollst¨ an dige 4-Graphen und ihre Unterteilungen. Math. Nachr. , 22:61–85, 1960

work page 1960

[3] [3]

Ellingham, M

M. Ellingham, M. P. Plummer, and G. Yu. Diamond-linkage a nd P4-linkage. J. Graph Theory , 70(3):241–261, 2012

work page 2012

[4] [4]

R. J. Faudree. Survery on results on k-ordered graphs. Discrete Math , 229:73–87, 2001

work page 2001

[5] [5]

Ferrara, R

M. Ferrara, R. Gould, G. Tansey, and T. Whalen. On H-linked graphs. Graphs Combin. , 22(2):217–224, 2006

work page 2006

[6] [6]

R. J. Gould, A. V. Kostochka, and G. Yu. On minimum degree i mplying that a graph is H-linked. SIAM J. Discrete Math. , 20(4):829–840 (electronic), 2006

work page 2006

[7] [7]

H. A. Jung. Eine Verallgemeinerung des n-fachen Zusammenhangs f¨ ur Graphen.Math. Ann. , 187:95–103, 1970

work page 1970

[8] [8]

Kawarabayashi, A

K. Kawarabayashi, A. V. Kostochka, and G. Yu. On suﬃcient degree conditions for a graph to be k-linked. Combin. Probab. Comput., 15(5):685–694, 2006

work page 2006

[9] [9]

A. V. Kostochka and G. Yu. An extremal problem for H-linked graphs. J. Graph Theory , 50(4):321–339, 2005

work page 2005

[10] [10]

A. V. Kostochka and G. Yu. Minimum degree conditions for H-linked graphs. Discrete Appl. Math. , 156(9):1542–1548, 2008

work page 2008

[11] [11]

A. V. Kostochka and G. Yu. Ore-type degree conditions fo r a graph to be H-linked. J. Graph Theory , 58(1):14–26, 2008

work page 2008

[12] [12]

D. G. Larman and P. Mani. On the existence of certain conﬁ gurations within graphs and the 1-skeletons of polytopes. Proc. London Math. Soc. (3) , 20:144–160, 1970

work page 1970

[13] [13]

Q. Liu, D. B. W est, and G. Yu. Implications among linkage properties in graphs. J. Graph Theory , 60(4):327–337, 2009

work page 2009

[14] [14]

W. Mader. Homomorphieeigenschaften und mittlere Kant endichte von Graphen. Math. Ann. , 174:265–268, 1967

work page 1967

[15] [15]

W. Mader. ¨Uber die Maximalzahl kreuzungsfreier H-Wege. Arch. Math. (Basel) , 31:387–402, 1978

work page 1978

[16] [16]

McCarty, Y

R. McCarty, Y. W ang, and X. Yu. 7-connected graphs are 4- ordered. https://arxiv.org/abs/1808.05124v2, 2018+

work page arXiv 2018

[17] [17]

Robertson, P

N. Robertson, P. Seymour, and R. Thomas. Hadwiger’s con jecture for K6-free graphs. Combinatorica, 13(3):279–361, 1993

work page 1993

[18] [18]

Robertson and P

N. Robertson and P. D. Seymour. Graph minors. XIII. The d isjoint paths problem. J. Combin. Theory Ser. B , 63(1):65–110, 1995

work page 1995

[19] [19]

Schrijver

A. Schrijver. A short proof of Mader’s S-paths theorem. J. Combin. Theory, Ser. B , 82:319–321, 2001

work page 2001

[20] [20]

P. D. Seymour. Disjoint paths in graphs. Discrete Math. , 29(3):293–309, 1980

work page 1980

[21] [21]

Thomas and P

R. Thomas and P. W ollan. An improved linear edge bound fo r graph linkages. European J. Combin. , 26(3-4):309–324, 2005

work page 2005

[22] [22]

Thomas and P

R. Thomas and P. W ollan. The extremal function for 3-lin ked graphs. J. Combin. Theory Ser. B , 98(5):939–971, 2008

work page 2008

[23] [23]

Thomassen

C. Thomassen. 2-linked graphs. European J. Combin. , 1(4):371–378, 1980

work page 1980

[24] [24]

M. E. W atkins and D. M. Mesner. Cycles and connectivity i n graphs. Canad. J. Math. , 19:1319–1328, 1967

work page 1967

[25] [25]

X. Yu. Disjoint paths in graphs. III. Characterization . Ann. Comb. , 7(2):229–246, 2003. 13

work page 2003