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arxiv: 2407.16666 · v2 · submitted 2024-07-23 · 🧮 math.CO · cs.DM

Polynomial-time recognition and maximum independent set in Burling graphs

Pawe{\l} Rz\k{a}\.zewski , Bartosz Walczak This is my paper

Pith reviewed 2026-05-23 22:54 UTC · model grok-4.3

classification 🧮 math.CO cs.DM
keywords Burling graphsstrict frame representationpolynomial-time recognitionmaximum independent sethereditary graph classestriangle-free graphs
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The pith

Burling graphs can be recognized in polynomial time and their maximum independent set solved in polynomial time using a strict frame representation.

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

The paper gives a polynomial-time algorithm that takes an arbitrary graph and either determines it is not a Burling graph or produces a strict frame representation of it. Once the representation is in hand, the same paper shows that the size of a maximum independent set can also be computed in polynomial time. Burling graphs are hereditary, triangle-free, and can require arbitrarily many colors, so the result separates polynomial-time solvability of maximum independent set from the chi-boundedness property in hereditary classes.

Core claim

A Burling graph is an induced subgraph of a graph arising in Burling's triangle-free high-chromatic construction, equivalently a graph that admits a strict frame representation. The central claim is that there exists a polynomial-time algorithm which, given any graph, decides whether it is a Burling graph and, if so, constructs a strict frame representation; the representation in turn yields a polynomial-time algorithm for maximum independent set. As a direct consequence, Burling graphs become the first known hereditary class that admits polynomial-time maximum independent set yet is not chi-bounded.

What carries the argument

strict frame representation, the geometric object equivalent to membership in the Burling class and the structure that directly supplies the polynomial-time recognition and independent-set algorithms.

If this is right

  • Burling graphs admit a polynomial-time recognition algorithm.
  • Maximum independent set is solvable in polynomial time on every Burling graph.
  • Burling graphs supply the first hereditary class that is not chi-bounded yet has polynomial-time maximum independent set.

Where Pith is reading between the lines

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

  • The same recognition technique might be adaptable to decide membership in other geometrically defined hereditary classes built from similar frame or interval constructions.
  • If the frame representation also encodes clique or coloring information efficiently, it could separate additional optimization problems from chi-boundedness.
  • The result suggests that hereditary classes defined by forbidden induced subgraphs arising from geometric constructions may systematically admit efficient independent-set algorithms even when chromatic number is unbounded.

Load-bearing premise

Every Burling graph possesses a strict frame representation that can be constructed in polynomial time.

What would settle it

A concrete Burling graph on which the recognition procedure either fails to terminate in polynomial time or returns a representation that does not allow polynomial-time computation of the maximum independent set.

Figures

Figures reproduced from arXiv: 2407.16666 by Bartosz Walczak, Pawe{\l} Rz\k{a}\.zewski.

Figure 1
Figure 1. Figure 1: Strict family of frames: (a) required configuration of every intersecting pair of frames; (b)–(d) disallowed configurations. particular imply their χ-boundedness. Thomassé, Trotignon, and Vušković [16] asked whether every hereditary class of graphs that admits a polynomial-time algorithm for the maximum independent set problem is χ-bounded. Being able to construct a strict frame representation, we can solv… view at source ↗
Figure 2
Figure 2. Figure 2: Correspondence between the relations ≺ and ↷ in a Burling set and configurations of pairs of frames in its strict frame representation. a strict frame graph) and triangle-free (that is, no strict frame graph contains three pairwise adjacent vertices). A relation on a set S is a set R ⊆ S × S. We write x R y to denote that (x, y) ∈ R, and we write R|U for the relation R ∩ (U × U) on a subset U of S. A cycle… view at source ↗
Figure 3
Figure 3. Figure 3: Distinguished elements of a Burling set in a frame representation: a is a root, b and f are probes, and all three are exposed; c and d are exposed but neither roots not probes; e is not exposed. We complete this section with auxiliary definitions and lemmas on Burling sets. Lemma 4 ([12, Lemma 5.3]). In a Burling set (S, ≺, ↷), the relation ≺ ∪ ↷ is acyclic. Proof. Let R = ≺ ∪ ↷. Suppose R is not acyclic. … view at source ↗
Figure 4
Figure 4. Figure 4: The second condition in the algorithm for B(X, S) with C1 and C2 the components of S − {r}. consult [PITH_FULL_IMAGE:figures/full_fig_p007_4.png] view at source ↗
Figure 5
Figure 5. Figure 5: A solution to a subproblem R(X, r, S). The graph induced by S−N(r) has six components C1, . . . , C6, of which C1 and C2 are inner while C3, . . . , C6 are outer. Gray areas are where particular components are represented. assume the former, without loss of generality. By Lemma 5, since r ⊀ x2, a path from x1 to r in C1 ∪ {r} must contain a vertex x such that x ↷ x2. This is a contradiction, because neithe… view at source ↗
read the original abstract

A Burling graph is an induced subgraph of some graph in Burling's construction of triangle-free high-chromatic graphs. Equivalently, a Burling graph is a graph that admits a so-called strict frame representation. We provide a polynomial-time algorithm to decide whether a given graph is a Burling graph and if it is, to construct its strict frame representation. The representation then enables a polynomial-time algorithm for the maximum independent set problem in Burling graphs. As a consequence, we establish Burling graphs as the first known hereditary class of graphs that admits such an algorithm while not being $\chi$-bounded.

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.

Referee Report

2 major / 0 minor

Summary. The paper claims to provide a polynomial-time algorithm to decide whether a given graph is a Burling graph and, if so, to construct its strict frame representation; this representation then yields a polynomial-time algorithm for the maximum independent set problem on Burling graphs. As a consequence, Burling graphs are presented as the first known hereditary class admitting polynomial-time MIS while not being χ-bounded.

Significance. If the claimed algorithms and their correctness proofs hold, the result would be significant: it supplies the first concrete hereditary class separating polynomial-time MIS from χ-boundedness, sharpening the boundary between structural and algorithmic properties of hereditary classes.

major comments (2)
  1. [Abstract] Abstract: the manuscript supplies no description of the recognition algorithm, no proof outline, no running-time analysis, and no correctness argument, so the support for the central claim of polynomial-time recognition via strict frame construction cannot be assessed.
  2. [Abstract] Abstract: the claim that the representation 'directly enables' a polynomial-time MIS algorithm is stated without any indication of the reduction or subroutine used, leaving the logical chain from representation to MIS unverified.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their report. The two major comments concern the level of detail provided in the abstract. The full manuscript contains the complete algorithms, proofs, running-time analyses, and correctness arguments, but we agree the abstract can be strengthened to better outline these elements and will revise it accordingly.

read point-by-point responses

  1. Referee: [Abstract] Abstract: the manuscript supplies no description of the recognition algorithm, no proof outline, no running-time analysis, and no correctness argument, so the support for the central claim of polynomial-time recognition via strict frame construction cannot be assessed.

    Authors: We agree that the abstract, as a concise summary, omits detailed descriptions of the recognition algorithm, proof outlines, running-time analysis, and correctness arguments. These elements are fully developed in the body of the manuscript. To address the concern, we will revise the abstract to include a brief outline of the recognition procedure via strict frame construction, its polynomial running time, and a high-level correctness sketch. revision: yes

  2. Referee: [Abstract] Abstract: the claim that the representation 'directly enables' a polynomial-time MIS algorithm is stated without any indication of the reduction or subroutine used, leaving the logical chain from representation to MIS unverified.

    Authors: The abstract employs 'directly enables' to signal the logical consequence of the representation for the MIS problem. The manuscript details the specific reduction and dynamic-programming subroutine on the strict frame representation that yields the polynomial-time MIS algorithm. We will revise the abstract to briefly indicate this subroutine, thereby clarifying the chain from representation to MIS. revision: yes

Circularity Check

0 steps flagged

No significant circularity

full rationale

The paper defines Burling graphs equivalently via induced subgraphs of Burling's construction or via admitting a strict frame representation, then claims independent polynomial-time algorithms for recognition (by constructing the representation) and for maximum independent set (using the representation). No step reduces by construction to fitted inputs, self-citations, or renamed known results; the recognition-to-representation-to-MIS chain is presented as a self-contained algorithmic contribution without load-bearing self-referential elements or ansatzes smuggled via citation.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review; no free parameters, axioms, or invented entities are extractable from the provided text.

pith-pipeline@v0.9.0 · 5631 in / 1003 out tokens · 27156 ms · 2026-05-23T22:54:11.800524+00:00 · methodology

discussion (0)

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Reference graph

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