An Improved Upper Bound for the Dirichlet Spectrum in Diophantine Approximation
Pith reviewed 2026-05-21 04:02 UTC · model grok-4.3
The pith
The ray-origin constant δ in the Dirichlet spectrum satisfies δ ≤ 111(397 + √26565)/65522 ≈ 0.94866
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We introduce the Cantor-type set F4* defined by certain restrictions on partial quotients. Proving that the thickness τ(log(F4*)) > 1 allows us to apply sum-set results and conclude that F4* · F4* is an interval. This establishes the new upper bound δ ≤ 111(397 + √26565)/65522 ≈ 0.94866 for the ray-origin constant in the Dirichlet spectrum.
What carries the argument
The Cantor-type set F4* defined by restrictions on partial quotients, whose log-thickness greater than 1 forces the product set F4* · F4* to be an interval via sum-set theorems
If this is right
- The continuous part of the Dirichlet spectrum is contained in a strictly smaller interval than before
- The refined Cantor set construction improves the bound obtained by earlier applications of Ivanov's method
- The same thickness-plus-sum-set strategy can be reused with different partial-quotient restrictions to seek further improvements
Where Pith is reading between the lines
- If the thickness condition can be verified for even more restrictive families of partial quotients, the resulting upper bound on δ could be lowered still further
- The interval-product technique may transfer to other metric problems in Diophantine approximation that involve products or sums of Cantor sets
- Numerical computation of the thickness for this explicit F4* could give an independent check on the analytic proof
Load-bearing premise
The central argument depends on proving that the thickness τ(log(F4*)) > 1 for the specific Cantor-type set F4*
What would settle it
Finding a concrete irrational number whose associated Diophantine constant lies strictly above 0.94866 but below the prior published bound would disprove the new upper bound
read the original abstract
We study the continuous part of the Dirichlet spectrum $\mathbb{D}$ and improve the best previously published upper bound for the ray-origin constant $\delta$. Building on and refining V. A. Ivanov's approach, we introduce a Cantor-type set $F_4^*$ defined by certain restrictions on partial quotients. For its thickness, we prove $\tau(\log(F_4^*))>1$, and apply sum-set results for Cantor sets to prove that the set $F_4^* \cdot F_4^*$ is an interval. Finally, we establish a new upper bound $\delta\le \frac{111(397+\sqrt{26565})}{65522}\approx0.94866$.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper improves the upper bound on the ray-origin constant δ in the Dirichlet spectrum by constructing a Cantor-type set F_4^* restricted by partial quotients, proving its log-thickness exceeds 1, applying sum-set theorems to establish that the product F_4^* · F_4^* is an interval, and deriving the bound δ ≤ 111(397+√26565)/65522 ≈ 0.94866.
Significance. This provides a better explicit upper bound for δ, building on Ivanov's approach. The use of thickness to guarantee an interval via sumsets is a standard technique in Diophantine approximation, and confirming the thickness >1 would make this a solid contribution to bounding the spectrum.
major comments (1)
- [Section proving thickness of log(F_4^*)] The central claim rests on τ(log(F_4^*)) > 1. The manuscript estimates gap ratios in the Cantor construction; the infimum must be shown >1. Please provide the explicit value of the minimal ratio and confirm the length calculations for the intervals and gaps at the level where the smallest ratio occurs, as this directly determines whether the sum-set theorem applies to conclude that the product set is an interval.
minor comments (1)
- [Abstract] It would be helpful to state the previous best known upper bound for comparison.
Simulated Author's Rebuttal
We thank the referee for their careful reading and constructive feedback on our manuscript. We address the major comment point by point below and are prepared to revise the paper to incorporate the requested clarifications.
read point-by-point responses
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Referee: [Section proving thickness of log(F_4^*)] The central claim rests on τ(log(F_4^*)) > 1. The manuscript estimates gap ratios in the Cantor construction; the infimum must be shown >1. Please provide the explicit value of the minimal ratio and confirm the length calculations for the intervals and gaps at the level where the smallest ratio occurs, as this directly determines whether the sum-set theorem applies to conclude that the product set is an interval.
Authors: We appreciate this comment, which correctly identifies that the thickness proof relies on verifying the infimum of the gap ratios exceeds 1. In the current manuscript, the gap ratios are estimated iteratively for the restricted partial quotients defining F_4^*, with the construction ensuring that removed intervals are sufficiently small relative to the remaining components. However, we agree that an explicit statement of the minimal ratio and the precise interval/gap lengths at the critical stage would improve clarity and directly support the application of the sum-set theorem. In the revised version, we will add a dedicated subsection or appendix computing these quantities stage by stage, confirming the infimum is strictly greater than 1 (achieved at an early finite level of the construction) and verifying the length relations. This does not alter the main result but makes the argument fully explicit. revision: yes
Circularity Check
No circularity: derivation uses explicit Cantor-set construction and external sum-set theorems
full rationale
The paper defines F_4^* via explicit restrictions on continued-fraction partial quotients, proves τ(log(F_4^*)) > 1 by direct gap-ratio estimates at each construction level, invokes cited sum-set theorems (independent of the present work) to obtain that F_4^* · F_4^* is an interval, and deduces the numerical upper bound on δ from that interval property. None of these steps reduces by definition or by self-citation to the target bound; the thickness lower bound is obtained from finite forbidden-pattern analysis rather than from fitting or renaming. The cited sum-set results are treated as external benchmarks, satisfying the self-contained criterion.
Axiom & Free-Parameter Ledger
axioms (1)
- standard math Standard properties of continued fraction expansions and metric properties of Cantor sets in Diophantine approximation hold.
Lean theorems connected to this paper
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IndisputableMonolith/Foundation/ArithmeticFromLogic.leanembed_injective, embed_strictMono_of_one_lt echoes?
echoesECHOES: this paper passage has the same mathematical shape or conceptual pattern as the Recognition theorem, but is not a direct formal dependency.
We introduce a Cantor-type set F4* defined by certain restrictions on partial quotients. For its thickness, we prove τ(log(F4*))>1, and apply sum-set results for Cantor sets to prove that the set F4*·F4* is an interval.
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IndisputableMonolith/Foundation/RealityFromDistinction.leanreality_from_one_distinction unclear?
unclearRelation between the paper passage and the cited Recognition theorem.
δ = inf{d : (d,1] ⊂ D} and μ = inf{z : [z,∞) ⊂ Ω} with δ = μ/(1+μ)
What do these tags mean?
- matches
- The paper's claim is directly supported by a theorem in the formal canon.
- supports
- The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
- extends
- The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
- uses
- The paper appears to rely on the theorem as machinery.
- contradicts
- The paper's claim conflicts with a theorem or certificate in the canon.
- unclear
- Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.
Reference graph
Works this paper leans on
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[2]
B. Diviˇ s and B. Nov´ ak,A remark on the theory of diophantine approximations, Comment. Math. Univ. Carolinae, 12, No.1, 127-141 (1971)
work page 1971
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[3]
Hall, Jr.,On the sum and product of continued fractions, Ann
M. Hall, Jr.,On the sum and product of continued fractions, Ann. of Math. (2), 48, 1947, pp. 966–993
work page 1947
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[4]
V. A. Ivanov,Origin of the ray in the Dirichlet spectrum of a problem in the theory of diophantine approximations, J Math. Sci. 19, 1169–1183 (1982)
work page 1982
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[5]
J. Lesca,Sur les approximations diophantiennes a une dimension, L’Universite de Grenoble, PhD Thesis (1968)
work page 1968
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[6]
Morimoto,Zur Theorie der Approximation einer irrationalen Zahl durch rationale Zahlen, Tohoku Math
S. Morimoto,Zur Theorie der Approximation einer irrationalen Zahl durch rationale Zahlen, Tohoku Math. J., 45 (1938), 177—187
work page 1938
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[7]
Pitcyn,On the discrete part of the Dirichlet spectrum, Ramanujan J
S. Pitcyn,On the discrete part of the Dirichlet spectrum, Ramanujan J. 67, No. 4, Paper No. 104, 17 p. (2025)
work page 2025
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[8]
Szekeres,On a problem of the lattice plane, J
G. Szekeres,On a problem of the lattice plane, J. London Math. Soc. 12 (1937), 88 – 93. 15
work page 1937
discussion (0)
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