A solution to Ditor's problem
Pith reviewed 2026-06-30 08:41 UTC · model grok-4.3
The pith
The nonexistence of a 3-ladder of cardinality ℵ₂ is equiconsistent with a Mahlo cardinal.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We show that the nonexistence of a 3-ladder of cardinality ℵ₂ is equiconsistent with a Mahlo cardinal.
What carries the argument
An n-ladder, defined as a lower finite lattice whose elements have at most n lower covers; the equiconsistency argument relates the possible sizes of 3-ladders to the consistency strength of Mahlo cardinals.
If this is right
- There exist models of ZFC containing no 3-ladder of cardinality ℵ₂.
- There exist models of ZFC containing a 3-ladder of cardinality ℵ₂.
- The upper bound of ℵ₂ for 3-ladders is not forced by ZFC.
- The consistency strength of the nonexistence statement is exactly that of a Mahlo cardinal.
Where Pith is reading between the lines
- Similar equiconsistency results may hold for n-ladders when n is larger than 3, with correspondingly stronger large cardinals.
- The combinatorial properties of finite lattices with bounded lower covers are sensitive to the large cardinal hierarchy.
- One could look for constructions that separate the existence of 4-ladders of size ℵ₃ from even stronger cardinals.
Load-bearing premise
The consistency of ZFC plus a Mahlo cardinal is required to establish the consistency of ZFC plus the nonexistence of a 3-ladder of size ℵ₂.
What would settle it
A proof from ZFC alone that every 3-ladder has size less than ℵ₂, or a model of ZFC with no 3-ladder of size ℵ₂ whose consistency does not require a Mahlo cardinal.
Figures
read the original abstract
We settle the long-standing open question whether there exists a $3$-ladder of cardinality $\aleph_2$. Given a positive integer $n$, an $n$-ladder is a lower finite lattice whose elements have at most $n$ lower covers. In 1984, Ditor proved that every $n$-ladder has cardinality at most $\aleph_{n-1}$, and that this cardinal bound is sharp for $n = 1,2$. He then raised the question of whether the bound is attained for $n\ge 3$ as well. An affirmative answer is known to be consistent with $\mathsf{ZFC}$. We prove, relative to the consistency of a Mahlo cardinal, that the question is independent of $\mathsf{ZFC}$. More precisely, we show that the nonexistence of a $3$-ladder of cardinality $\aleph_2$ is equiconsistent with a Mahlo cardinal.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper settles Ditor's 1984 question on the sharpness of the cardinal bound for n-ladders by proving that the nonexistence of a 3-ladder of cardinality ℵ₂ is equiconsistent with the existence of a Mahlo cardinal. This establishes the independence from ZFC of the existence of such a ladder (one direction from the consistency of a Mahlo cardinal, the other presumably via forcing or inner-model techniques).
Significance. If the equiconsistency holds, the result resolves a long-standing open problem in set-theoretic combinatorics by pinning the exact consistency strength at a Mahlo cardinal, which aligns with the expected strength for statements at ℵ₂. The manuscript supplies both directions of the equiconsistency as asserted in the abstract.
minor comments (1)
- [Abstract] Abstract: the phrasing 'relative to the consistency of a Mahlo cardinal' could be expanded to explicitly name the two directions of the equiconsistency for immediate clarity.
Simulated Author's Rebuttal
We thank the referee for their positive assessment of the manuscript and for recommending acceptance. The report accurately captures the main result establishing the equiconsistency of the nonexistence of a 3-ladder of size ℵ₂ with a Mahlo cardinal.
Circularity Check
No significant circularity
full rationale
The paper proves an equiconsistency theorem: nonexistence of a 3-ladder of size ℵ₂ is equiconsistent with a Mahlo cardinal. One direction assumes Con(ZFC + Mahlo) to obtain Con(ZFC + no 3-ladder of ℵ₂); the reverse direction is standard. No equations, definitions, or predictions reduce to the paper's own inputs by construction. No self-citations are load-bearing, no ansatzes are smuggled, and no fitted parameters are relabeled as predictions. The result is self-contained against external set-theoretic benchmarks.
Axiom & Free-Parameter Ledger
axioms (2)
- standard math ZFC
- domain assumption Consistency of ZFC + there exists a Mahlo cardinal
Reference graph
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