On transitive sets of derangements in primitive groups
Pith reviewed 2026-05-24 09:10 UTC · model grok-4.3
The pith
The group ^3D_4(2) has a primitive action of degree 4064256 in which two points are not joined by any derangement.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We construct a primitive permutation action of the Steinberg triality group ^3D_4(2) of degree 4064256 and show that there are distinct points α,β such that there is no derangement g∈^3D_4(2) with α^g=β. This answers a question by John G. Thompson (Problem 8.75 in the Kourovka Notebook) in the negative.
What carries the argument
The explicit construction of the faithful primitive action of ^3D_4(2) of degree 4064256 together with the exhaustive computational verification that no derangement maps one chosen point to the other.
If this is right
- Thompson's question 8.75 in the Kourovka Notebook has a negative answer.
- The derangements in a primitive permutation group need not act transitively on ordered pairs of distinct points.
- The phenomenon occurs for this particular action of ^3D_4(2).
Where Pith is reading between the lines
- Similar explicit constructions for other exceptional groups of Lie type could produce further counterexamples.
- The result indicates that computational enumeration on groups of this size can resolve open questions once an explicit action is available.
Load-bearing premise
The given construction produces a faithful primitive action of the stated degree and the check that no derangement sends α to β is complete and correct.
What would settle it
An explicit derangement in the group that maps the first chosen point to the second chosen point in this action would falsify the claim.
read the original abstract
We construct a primitive permutation action of the Steinberg triality group $^3D_4(2)$ of degree $4064256$ and show that there are distinct points $\alpha,\beta$ such that there is no derangement $g\in{^3D_4}(2)$ with $\alpha^g=\beta$. This answers a question by John G. Thompson (Problem 8.75 in the Kourovka Notebook) in the negative.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper constructs a primitive permutation action of the Steinberg triality group ^3D_4(2) of degree 4064256 and exhibits distinct points α, β such that no derangement in the group maps α to β, thereby giving a negative answer to Thompson's question 8.75 in the Kourovka Notebook.
Significance. If the construction and verification hold, the result resolves an open question on the existence of transitive derangement sets in primitive groups and has implications for the derangement graph and related problems in finite permutation group theory.
major comments (1)
- [Abstract and introductory construction paragraph] The manuscript provides no description of the explicit construction of the degree-4064256 action (e.g., the maximal subgroup whose cosets realize the action), the primitivity test employed, or the algorithm used to certify that the coset representatives or orbit-stabilizer computation yields no derangement sending α to β. Given |G| is too large for exhaustive enumeration, this verification method is load-bearing for the central claim and must be specified for reproducibility.
Simulated Author's Rebuttal
We thank the referee for their report and for highlighting the need for greater detail on the construction and verification. We address the major comment below and will revise the manuscript to incorporate the requested information.
read point-by-point responses
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Referee: [Abstract and introductory construction paragraph] The manuscript provides no description of the explicit construction of the degree-4064256 action (e.g., the maximal subgroup whose cosets realize the action), the primitivity test employed, or the algorithm used to certify that the coset representatives or orbit-stabilizer computation yields no derangement sending α to β. Given |G| is too large for exhaustive enumeration, this verification method is load-bearing for the central claim and must be specified for reproducibility.
Authors: We agree that the manuscript as submitted lacked an explicit description of the construction, the primitivity test, and the verification algorithm. In the revised version we will add a dedicated subsection (likely in Section 2) that specifies: (i) the maximal subgroup M < ^3D_4(2) realizing the action on cosets (including its structure and the source of the embedding, e.g., via the Atlas or computational realization); (ii) the primitivity test, which consists of confirming maximality of M by direct computation of its normalizer and known subgroup lattice data; and (iii) the algorithm used to certify that no derangement sends α to β. The latter proceeds by computing the relevant double coset or by using the orbit-stabilizer theorem together with fixed-point-ratio bounds derived from the character table of ^3D_4(2), avoiding exhaustive enumeration of G. These additions will make the central claim fully reproducible. revision: yes
Circularity Check
Explicit construction with no self-referential or fitted derivation
full rationale
The paper's central result is an explicit construction of a primitive action of ^3D_4(2) on 4064256 points together with a verification that no derangement sends α to β. The abstract states this directly as a construction answering Thompson's question in the negative. No equations, parameters, or claims are shown to reduce to their own inputs by definition, no fitted quantities are relabeled as predictions, and no load-bearing premise rests on a self-citation chain. The derivation is therefore self-contained as a direct existence proof via construction.
Axiom & Free-Parameter Ledger
axioms (2)
- standard math The Steinberg triality group ^3D_4(2) exists as a finite simple group of Lie type with known order and representation theory.
- standard math Primitive permutation actions and derangements are well-defined notions in the theory of finite permutation groups.
Reference graph
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discussion (0)
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