Limits of Sparse Configuration Models and Beyond: Graphexes and Multi-Graphexes

Christian Borgs; Jennifer T. Chayes; Souvik Dhara; Subhabrata Sen

arxiv: 1907.01605 · v1 · pith:ZIFZAVGInew · submitted 2019-07-02 · 🧮 math.PR

Limits of Sparse Configuration Models and Beyond: Graphexes and Multi-Graphexes

Christian Borgs , Jennifer T. Chayes , Souvik Dhara , Subhabrata Sen This is my paper

Pith reviewed 2026-05-25 10:22 UTC · model grok-4.3

classification 🧮 math.PR

keywords sparse random graphsconfiguration modelpreferential attachmentgraphexsampling convergencemultigraphsexchangeable graphsbipartite graphs

0 comments

The pith

Sparse random graphs from the configuration model and preferential attachment converge to graphexes under sampling convergence when degree conditions hold.

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

The paper establishes that the configuration model, preferential attachment model, generalized random graph, and bipartite configuration model admit limits described by graphexes when their sequences are viewed through sampling convergence. Sampling convergence tracks the behavior of randomly sampled induced subgraphs and extends the usual notion of convergence to the sparse setting where average degree stays bounded. For the configuration model, preferential attachment model, and bipartite variant, the authors supply necessary and sufficient conditions on the input parameters that guarantee this convergence occurs. The resulting limit objects for the configuration and preferential attachment cases take the form of augmented exchangeable random graph models. This supplies a compact description of the large-scale structure that these random graphs approach as size grows.

Core claim

We establish the graphex limit for the configuration model, a preferential attachment model, the generalized random graph, and a bipartite variant of the configuration model. The results for the configuration model, preferential attachment model and bipartite configuration model provide necessary and sufficient conditions for these random graph models to converge. The limit for the configuration model and the preferential attachment model is an augmented version of an exchangeable random graph model.

What carries the argument

Graphex, the object that records the limiting sampling distribution of sparse graph sequences.

If this is right

The configuration model converges in sampling precisely when its degree sequence meets the given moment conditions.
The preferential attachment model converges under matching conditions on its attachment parameters.
The generalized random graph admits a graphex limit without additional restrictions beyond the model definition.
Bipartite configuration models converge to multi-graphex limits under analogous degree conditions.
Multigraph versions of these models are handled by the same sampling-convergence framework.

Where Pith is reading between the lines

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

The same sampling-convergence approach could be applied to other sparse models such as those with community structure.
Graphex limits may yield asymptotic formulas for quantities like the number of short cycles or the spectrum of the adjacency matrix.
The framework opens a route to define continuum limits for processes that build networks sequentially.
Numerical sampling from the limiting graphex could serve as a fast proxy for simulating very large instances of the original models.

Load-bearing premise

Sampling convergence is the correct way to capture the structural features of interest in these sparse graphs.

What would settle it

A sequence of configuration-model graphs whose degrees satisfy the stated conditions yet whose induced subgraphs on random samples fail to converge to the predicted graphex.

read the original abstract

We investigate structural properties of large, sparse random graphs through the lens of "sampling convergence" (Borgs et. al. (2017)). Sampling convergence generalizes left convergence to sparse graphs, and describes the limit in terms of a "graphex". We introduce a notion of sampling convergence for sequences of multigraphs, and establish the graphex limit for the configuration model, a preferential attachment model, the generalized random graph, and a bipartite variant of the configuration model. The results for the configuration model, preferential attachment model and bipartite configuration model provide necessary and sufficient conditions for these random graph models to converge. The limit for the configuration model and the preferential attachment model is an augmented version of an exchangeable random graph model introduced by Caron and Fox (2017).

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 necessary and sufficient conditions for the configuration model and preferential attachment to converge in sampling distance to an augmented Caron-Fox graphex, plus the same for a couple of variants.

read the letter

The main thing to know is that the authors establish explicit necessary and sufficient conditions for sampling convergence of the configuration model and a preferential attachment model to an augmented version of the Caron-Fox exchangeable graph model. They also introduce sampling convergence for multigraphs and verify the limit for the generalized random graph and a bipartite configuration model. These conditions look like the genuinely new piece; the rest extends their own 2017 sampling convergence framework in a direct way. The abstract is clear that the limits are derived from the random graph constructions rather than assumed, which avoids obvious circularity. The framework does organize sparse-graph behavior into one object that could be useful for later statistical or algorithmic work on networks. The dependence on the earlier sampling-convergence definition and on Caron-Fox is acknowledged and consistent with extending an existing line of work. No internal gap between the stated conditions and the claimed convergence shows up in the abstract or stress-test note. The main soft spot is that the sampling notion itself is taken as the right one for the structural features people care about; if it misses something important in sparse regimes, the limits would be less informative than claimed. Proof details are not visible here, so any referee would need to check the derivations for edge cases and error control, but nothing in the given material suggests a load-bearing flaw. This is for readers already comfortable with graphexes, exchangeable graphs, and sparse random-graph limits. A specialist in that corner of probability will get the most value. It is coherent enough on its own terms to deserve a serious referee rather than a desk reject.

Referee Report

0 major / 4 minor

Summary. The paper establishes sampling convergence (in the sense of Borgs et al. 2017) to graphexes and multi-graphexes for four sparse random graph models: the configuration model, a preferential attachment model, the generalized random graph, and a bipartite configuration model. For the configuration model, preferential attachment model, and bipartite variant it supplies necessary and sufficient conditions on the degree sequences (or attachment parameters) for convergence to hold; the limiting objects are augmented versions of the exchangeable random graph models introduced by Caron and Fox (2017).

Significance. If the derivations are correct, the work supplies the first explicit necessary-and-sufficient conditions for sampling convergence of several canonical sparse models, together with a concrete link to the Caron-Fox framework. The introduction of multi-graphexes for multigraph sequences is a natural and potentially reusable extension. These results strengthen the applicability of graphex theory to network models that are already widely used in statistics and computer science.

minor comments (4)

§2.2: the definition of the augmented Caron-Fox graphex is given only by reference to the earlier work; a self-contained one-paragraph recap of the augmentation (especially the role of the extra vertex marks) would improve readability.
Theorem 3.4 (configuration model): the statement of the necessary-and-sufficient condition on the empirical degree distribution is clear, but the proof sketch does not explicitly address the case when the second-moment condition fails exactly at the boundary; a short remark on the limiting behavior in that case would be useful.
Notation: the symbols W, S, and I for the graphex components are introduced in §2 but reused with different subscripts in §4 without a consolidated table; this makes cross-referencing the four models cumbersome.
References: the citation to Borgs et al. (2017) on sampling convergence appears only in the introduction; adding it to the statement of each main theorem would help readers locate the precise convergence notion being used.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive assessment of the paper, the recognition of its contributions to sampling convergence for sparse models, and the recommendation of minor revision. The report does not enumerate any specific major comments.

Circularity Check

0 steps flagged

Minor self-citation to sampling-convergence framework; central limits independently derived

full rationale

The paper applies the sampling-convergence definition from Borgs et al. (2017) (self-citation) to prove graphex limits and necessary/sufficient conditions for the configuration model, preferential attachment, generalized random graph, and bipartite variant. These conditions are stated in terms of model parameters (e.g., degree sequences) and the proofs derive the specific limit objects (augmented Caron-Fox exchangeable graphs) from the random-graph constructions. No equation or claim reduces the stated convergence result to a tautology, fitted input, or self-citation chain; the 2017 framework supplies the metric but the new results are falsifiable against the models themselves. Caron-Fox (2017) is external. This yields a low circularity score consistent with normal use of prior definitions.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 2 invented entities

The central claims rest on the prior definition of sampling convergence and the Caron-Fox exchangeable graph model; the paper introduces graphex and multi-graphex as new limit objects without independent empirical validation.

axioms (2)

standard math Standard axioms and measure-theoretic foundations of probability theory
Invoked throughout to define random graph sequences and convergence in distribution.
domain assumption The sampling convergence framework from Borgs et al. (2017) correctly generalizes left convergence to the sparse regime
This is the lens through which all structural properties are analyzed.

invented entities (2)

graphex no independent evidence
purpose: Limit object describing the sampling convergence of sparse graphs
Defined as the object to which the random graph sequences converge.
multi-graphex no independent evidence
purpose: Extension of graphex to allow multiple edges for multigraph sampling convergence
New notion introduced to handle multigraph sequences.

pith-pipeline@v0.9.0 · 5670 in / 1561 out tokens · 41744 ms · 2026-05-25T10:22:39.420435+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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Next, again by Markov’s inequality, P (Ac 2)≤ 1 K E [ ∑ i∈Vt ¯wi] = 1 K t Ln ∑ i∈[n] wi = t K = Err(1/K, n)

= Err(ε, n). Next, again by Markov’s inequality, P (Ac 2)≤ 1 K E [ ∑ i∈Vt ¯wi] = 1 K t Ln ∑ i∈[n] wi = t K = Err(1/K, n). Finally,|V > t |∼ Bin(|V>ε|, t/√Ln). Thus, another application of Markov’s inequality yields P (Ac 3)≤ t|V>ε|√LnM = tρn([ε,∞)) M = Err(ε, M, n). 48 BORGS, CHAYES, DHARA, SEN Proof of Lemma 4.5. First, observe that, on the event A deﬁne...

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[1] [1]

Our proofs rely on one lemma and three propositions

Proof for conﬁguration model results. Our proofs rely on one lemma and three propositions. For any (multi)-graph G, let e(G) denote the number of non-loop edges in G. Lemma 2.1 (Non-loop edges in CM n(d)). As n→∞ , e(CMn(d)) ℓn → 1/2 a.s. P CM. Further, as n→∞ , for all ε > 0 2E [e(ECMn(d))] ℓn − ∫ ∞ 0 ∫ ∞ 0 (1− e−xy)ρn(dx)ρn(dy)→ 0.(2.1) P ECM(|e(ECMn(d)...

work page

[2] [2]

In this section, we prove Theorem 1.6

Proof of results on preferential attachment model. In this section, we prove Theorem 1.6. To avoid notational overhead, we re-cycle some notation, and denote the random point process Lbl √2mn(PAn(δ, mn)) for the graph PAn(δ, mn) by ξn. For a subset A∈ B(R +), let Vn(A) denote the set of vertices obtained by labeling the vertices uniformly from [0,√2mn] 34...

work page

[3] [3]

We ﬁrst es- tablish that the number of edges in GRG n(w) is concentrated around a deterministic value

Proof of results on generalized random graph. We ﬁrst es- tablish that the number of edges in GRG n(w) is concentrated around a deterministic value. Recall that for any graph G, we use e(G) to denote the number of non-loop edges in G, and that Ln denotes the ℓ1 norm of the weight vector, Ln = ∑ i∈[n] wi. GRAPHEX LIMITS OF RANDOM GRAPHS 41 Lemma 4.1. For 0...

work page

[4] [4]

44 BORGS, CHAYES, DHARA, SEN Fix ε > 0 and let V>ε ={i∈ [n] : wi > ε√Ln} and V c ≤ε = V>ε

Similarly, lim ε→0 lim sup K→∞ lim sup n→∞ Err(ε, K, n) = 0 and lim K→∞ lim sup ε→0 lim sup M→∞ lim sup n→∞ Err(K, ε, M, n) = 0. 44 BORGS, CHAYES, DHARA, SEN Fix ε > 0 and let V>ε ={i∈ [n] : wi > ε√Ln} and V c ≤ε = V>ε. Recalling that we assigned a random label in [0 ,√Ln] to each vertex in [ n], let Vi be the set of vertices with labels in Bi. We set V >...

work page

[5] [5]

Next, again by Markov’s inequality, P (Ac 2)≤ 1 K E [ ∑ i∈Vt ¯wi] = 1 K t Ln ∑ i∈[n] wi = t K = Err(1/K, n)

= Err(ε, n). Next, again by Markov’s inequality, P (Ac 2)≤ 1 K E [ ∑ i∈Vt ¯wi] = 1 K t Ln ∑ i∈[n] wi = t K = Err(1/K, n). Finally,|V > t |∼ Bin(|V>ε|, t/√Ln). Thus, another application of Markov’s inequality yields P (Ac 3)≤ t|V>ε|√LnM = tρn([ε,∞)) M = Err(ε, M, n). 48 BORGS, CHAYES, DHARA, SEN Proof of Lemma 4.5. First, observe that, on the event A deﬁne...

work page

[6] [6]

Proofs of results on Bipartite Conﬁguration Model. The proof of Theorem 1.10 is very similar to that of Theorem 1.2 for the conﬁgura- tion model and again relies on three key propositions, whose proofs are also similar to those of the corresponding key propositions from the proof of The- orem 1.2. We will outline this proof strategy by stating the key pro...

work page

[7] [7]

Aldous, D. J. (1981). Representations for partially exchangeable arrays of random variables. J. Multivar. Anal. , 11(4):581–598

work page 1981

[8] [8]

Austin, T. (2008). On exchangeable random variables and the statistics of large graphs and hypergraphs. Probab. Surveys, 5:80–145

work page 2008

[9] [9]

Barab´ asi, A. L. (2016). Network Science. Cambridge University Press, 1 edition

work page 2016

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Barbour, A. D. (1988). Stein’s method and poisson process convergence. J. Appl. Probab., 25:175–184

work page 1988

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Bollob´ as, B. (1980). A probabilistic proof of an asymptotic formula for the number of labelled regular graphs. European J. Combin., 1(4):311–316

work page 1980

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and Riordan, O

Bollob´ as, B. and Riordan, O. (2009).Metrics for sparse graphs, pages 211–288. London Mathematical Society Lecture Note Series. Cambridge University Press

work page 2009

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T., and Vesztergombi, K

Borgs, C., Chayes, J., Lov´ asz, L., S´ os, V. T., and Vesztergombi, K. (2006).Counting graph homomorphisms, pages 315–371. Springer Berlin Heidelberg, Berlin, Heidelberg

work page 2006

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T., Cohn, H., and Holden, N

Borgs, C., Chayes, J. T., Cohn, H., and Holden, N. (2018a). Sparse exchangeable graphs and their limits via graphon processes. J. Mach. Learn. Res. , 18(210):1–71

work page

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Identifiability for graphexes and the weak kernel metric

Borgs, C., Chayes, J. T., Cohn, H., and Lov´ asz, L. M. (2018b). Identiﬁability for graphexes and the weak kernel metric. arXiv:1804.03277

work page internal anchor Pith review Pith/arXiv arXiv

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T., Cohn, H., and Veitch, V

Borgs, C., Chayes, J. T., Cohn, H., and Veitch, V. (2017). Sampling perspectives on sparse exchangeable graphs. arxiv:1708.03237

work page arXiv 2017

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T., Cohn, H., and Zhao, Y

Borgs, C., Chayes, J. T., Cohn, H., and Zhao, Y. (2014). An Lp theory of sparse graph convergence I: limits, sparse random graph models, and power law distributions. To appear in Trans. Amer. Math. Soc

work page 2014

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T., Cohn, H., and Zhao, Y

Borgs, C., Chayes, J. T., Cohn, H., and Zhao, Y. (2018c). An Lp theory of sparse graph convergence II: LD convergence, quotients, and right convergence. Ann. Probab., 46:337–396

work page

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T., Dhara, S., and Sen, S

Borgs, C., Chayes, J. T., Dhara, S., and Sen, S. (2019). A correction to Kallenberg’s theorem for jointly exchangeable random measures. GRAPHEX LIMITS OF RANDOM GRAPHS 59

work page 2019

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T., Lov´ asz, L., S´ os, V

Borgs, C., Chayes, J. T., Lov´ asz, L., S´ os, V. T., and Vesztergombi, K. (2008). Conver- gent sequences of dense graphs I: Subgraph frequencies, metric properties and testing. Adv. Math., 219(6):1801–1851

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