Sharp iteration asymptotics for transfer operators induced by greedy β-expansions
Pith reviewed 2026-05-23 02:37 UTC · model grok-4.3
The pith
For algebraic β solving a quadratic with integer coefficients, the transfer operator iterates equal an invariant density u plus a β^{-k} correction term (F(1)-F(0))v plus smaller error.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We explicitly construct two piecewise affine functions u and v with P u = u and P v = β^{-1} v such that for every sufficiently smooth F which is supported in [0,1] and satisfies ∫F dx=1, we have P^k F = u + β^{-k}(F(1)-F(0))v + o(β^{-k}) in L^∞. This is also compared with the case of integer bases, where more refined asymptotic formulas are possible.
What carries the argument
The pair of piecewise affine eigenfunctions u (eigenvalue 1) and v (eigenvalue β^{-1}) of the transfer operator P for the β-transformation under the stated quadratic condition on β.
If this is right
- The leading correction to the invariant density u is proportional to β^{-k} and its size is controlled by the difference of the initial density at the endpoints 0 and 1.
- The construction works only when β satisfies the given quadratic relation, which permits the affine pieces of u and v to be written explicitly.
- For integer bases the same operator admits further terms in the expansion beyond the order shown here.
- The o(β^{-k}) remainder is uniform over all sufficiently smooth unit-integral initial densities F.
Where Pith is reading between the lines
- The boundary term (F(1)-F(0)) may reflect a conserved quantity or flux that persists under iteration for these maps.
- The same eigenfunction pair could be used to derive explicit bounds on correlation decay for observables that are not constant on the partition induced by the β-map.
- Numerical verification on the golden-ratio map would immediately test whether the coefficient of the correction term is indeed F(1)-F(0).
- Relaxing the quadratic condition on β would likely require different techniques to obtain any explicit rate, even if the spectral gap itself persists.
Load-bearing premise
The assumption that β is the positive root of the quadratic β² = a0 β + a1 with integers a0 ≥ a1 ≥ 1 and a0 < β < a0+1 is needed so the eigenfunctions can be written down explicitly as piecewise affine maps.
What would settle it
For the golden ratio β, pick a smooth test density F with integral 1, compute the L^∞ difference between P^k F and u + β^{-k}(F(1)-F(0))v for successively larger k, and check whether that difference divided by β^{-k} tends to zero.
Figures
read the original abstract
We consider base-$\beta$ expansions of Parry's type, where $a_0 \geq a_1 \geq 1$ are integers and $a_0<\beta <a_0+1$ is the positive solution to $\beta^2 = a_0\beta + a_1$ (the golden ratio corresponds to $a_0=a_1=1$). The map $x\mapsto \beta x-\lfloor \beta x\rfloor$ induces a discrete dynamical system on the interval $[0,1)$ and we study its associated transfer (Perron-Frobenius) operator $\mathscr{P}$. Our main result can be roughly summarized as follows: we explicitly construct two piecewise affine functions $u$ and $v$ with $\mathscr{P}u=u$ and $\mathscr{P}v=\beta^{-1} v$ such that for every sufficiently smooth $F$ which is supported in $[0,1]$ and satisfies $\int_0^1 F \; \mathrm{d} x=1$, we have $\mathscr{P}^kF= u +\beta^{-k}\big ( F(1)-F(0)\big )v +o(\beta^{-k})$ in $L^\infty$. This is also compared with the case of integer bases, where more refined asymptotic formulas are possible.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript considers the transfer operator P induced by the greedy β-expansion map on [0,1) for β the positive root of β² = a₀β + a₁ (a₀ ≥ a₁ ≥ 1 integers). It explicitly constructs two piecewise-affine functions u and v satisfying Pu = u and Pv = β^{-1}v, then proves that for sufficiently smooth F supported in [0,1] with ∫F dx = 1 one has P^k F = u + β^{-k}(F(1)-F(0))v + o(β^{-k}) in L^∞. The result is compared with the integer-base case.
Significance. If the explicit construction holds, the result supplies a sharp, explicit asymptotic for iterates of the transfer operator in this quadratic-irrational family, with a concrete coefficient (F(1)-F(0)) and remainder that is stronger than generic bounds. The piecewise-affine eigenfunctions are a concrete strength that permits direct verification and potential numerical checks.
major comments (2)
- [§3] §3 (construction of u and v): the claim that the quadratic relation β² = a₀β + a₁ closes all affine pieces under the preimage branches and yields exact eigen-relations Pu = u, Pv = β^{-1}v must be verified interval-by-interval on the partition; any mismatch on a single branch would invalidate the exact coefficient of v and the o(β^{-k}) remainder.
- [Theorem 4.1] Theorem 4.1 (asymptotic formula): the coefficient (F(1)-F(0)) is asserted to arise from boundary matching; the proof should explicitly trace how the endpoint values propagate under the branches to produce precisely this factor rather than a different linear functional of F.
minor comments (2)
- [Abstract and Theorem 4.1] The abstract states 'sufficiently smooth'; the precise regularity (e.g., C¹ or C²) required for the o(β^{-k}) estimate should be stated in the theorem statement.
- [Throughout] Notation: the transfer operator is denoted both by P and by script-P; adopt a single symbol throughout.
Simulated Author's Rebuttal
We thank the referee for the careful reading and the detailed major comments. We address each point below.
read point-by-point responses
-
Referee: [§3] §3 (construction of u and v): the claim that the quadratic relation β² = a₀β + a₁ closes all affine pieces under the preimage branches and yields exact eigen-relations Pu = u, Pv = β^{-1}v must be verified interval-by-interval on the partition; any mismatch on a single branch would invalidate the exact coefficient of v and the o(β^{-k}) remainder.
Authors: The explicit construction in §3 proceeds by partitioning [0,1) according to the greedy β-expansion and defining u and v as affine on each subinterval. The parameters of these affine pieces are chosen so that the functional equations hold after summing the contributions from all inverse branches. The quadratic relation β² = a₀β + a₁ is used exactly to guarantee that each preimage of an affine piece lands on another piece in the partition with matching slope and intercept, producing exact cancellation or scaling. This interval-by-interval matching is carried out in the proof; no branch is left unchecked. We can add an appendix tabulating the explicit affine coefficients and the branch-wise verification if the referee finds the current presentation insufficiently transparent. revision: partial
-
Referee: [Theorem 4.1] Theorem 4.1 (asymptotic formula): the coefficient (F(1)-F(0)) is asserted to arise from boundary matching; the proof should explicitly trace how the endpoint values propagate under the branches to produce precisely this factor rather than a different linear functional of F.
Authors: The proof of Theorem 4.1 isolates the projection onto the second eigenfunction v by subtracting the invariant density u and examining the residual. The linear functional that multiplies v is obtained by evaluating the action of P on the boundary values: each application of the transfer operator sums the test function at the preimages, and the only surviving discrepancy after k steps that is not absorbed into u is proportional to the difference F(1)−F(0). This follows because the leftmost and rightmost branches map the endpoints in a manner fixed by the quadratic relation, preserving exactly that combination. The derivation already contains this tracing via the boundary-matching argument; however, we will expand the relevant paragraph in the revised version to display the propagation of the endpoint values step by step. revision: yes
Circularity Check
No circularity; explicit construction of eigenfunctions for quadratic β
full rationale
The paper's main result is an explicit construction of piecewise-affine u and v satisfying Pu = u and Pv = β^{-1}v exactly, using the quadratic relation β² = a0β + a1 to close the affine pieces under the β-map branches and boundary conditions. This yields the stated L^∞ asymptotic for iterates of P applied to normalized smooth F. The derivation is self-contained: the algebraic condition on β is an input hypothesis that enables the construction, not a fitted parameter or self-referential definition. No self-citations, ansatzes smuggled via prior work, or reductions of the asymptotic to a tautology appear in the abstract or described chain. The result is a direct verification for this class of β, independent of the target asymptotic by construction.
Axiom & Free-Parameter Ledger
axioms (1)
- domain assumption The transfer operator P is well-defined and acts on suitable function spaces for the given β-transformation
Lean theorems connected to this paper
-
IndisputableMonolith/Cost/FunctionalEquation.leanwashburn_uniqueness_aczel unclear?
unclearRelation between the paper passage and the cited Recognition theorem.
we explicitly construct two piecewise affine functions u and v with Pu = u and Pv = β^{-1} v such that ... P^k F = u + β^{-k}(F(1)-F(0))v + o(β^{-k}) in L^∞
-
IndisputableMonolith/Foundation/RealityFromDistinction.leanreality_from_one_distinction unclear?
unclearRelation between the paper passage and the cited Recognition theorem.
the golden ratio corresponds to a0 = a1 = 1
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
-
[1]
Abramowitz, M., Stegun, I.A.: Handbook of Mathematical Functions. New York: Dover (1970)
work page 1970
-
[2]
: β-expansions and symbolic dynamics
Blanchard, F. : β-expansions and symbolic dynamics. Theoret. Comput. Sci. 65(2), 131–141 (1989)
work page 1989
-
[3]
Invariant measures and dynamical systems in one dimension
Boyarsky, A., G´ora, P.: Laws of chaos. Invariant measures and dynamical systems in one dimension. Probability and its Applications. Birkh¨ auser, Boston, MA, 1997.https://link. springer.com/book/10.1007/978-1-4612-2024-4
-
[4]
Brown, J.R.: Approximation Theorems for Markov Operators. Pacific J. Math.16(1), 13-23 (1966) https://doi.org/10.2140/pjm.1966.16.13
-
[5]
: Locating Ruelle-Pollicott resonances
Butterley, O., Kiamari, N., Liverani, C. : Locating Ruelle-Pollicott resonances. Non- linearity 35(1), 513-566 (2022) https://doi.org/10.1088/1361-6544/ac3ad5
-
[6]
Spectral and dynamical results related to certain non-integer base expansions on the unit interval
Cornean, H.D., Herbst, I.W., Marcelli, G. : Spectral and dynamical results related to certain non-integer base expansions on the unit interval. arXiv (2025) https://arxiv.org/ abs/2502.06511
work page internal anchor Pith review Pith/arXiv arXiv 2025
-
[7]
: Char- acterization of Random Variables with Stationary Digits J
Cornean, H.D., Herbst, I.W., Møller, J., Støttrup, B.B., Sørensen, K.S. : Char- acterization of Random Variables with Stationary Digits J. Appl. Probab 59, 931-947 (2022) https://doi.org/10.1017/jpr.2022.6 18
-
[8]
Chapman and Hall/CRC (2021) https://doi.org/10.1201/9780429276019
Dajani, K., Kalle, C.: A First Course in Ergodic Theory. Chapman and Hall/CRC (2021) https://doi.org/10.1201/9780429276019
-
[9]
Dajani, K., Kraaikamp, C.: Random β-expansions. Ergod. Th. & Dyn. Sys.23(2), 461-479 (2003) https://doi.org/10.1017/S0143385702001141
-
[10]
: Fully Chaotic Maps and Broken Time Symmetry
Driebe, D.J. : Fully Chaotic Maps and Broken Time Symmetry. Kluwer Academic (1999) https://doi.org/10.1007/978-94-017-1628-4
-
[11]
Gaspard, P.: r-adic one-dimensional maps and the Euler summation formula. J. Phys. A: Math. Gen. 25, L483-L485 (1992) https://doi.org/10.1088/0305-4470/25/8/017
-
[12]
: Invariant densities for generalized β-maps
G´ora, P. : Invariant densities for generalized β-maps. Ergod. Th. & Dynam. Sys. 27, 1583–1598 (2007) https://doi.org/10.1017/S0143385707000053
-
[13]
: How many digits are needed? Methodol
Herbst, I.W., Møller, J., Svane, A.M. : How many digits are needed? Methodol. Com- put. Appl. Probab. 26(1), Paper No. 5 (2024) https://doi.org/10.1007/s11009-024-10073-2
-
[14]
Herbst, I.W., Møller, J., Svane, A.M. : The asymptotic distribution of the scaled remainder for pseudo golden ratio expansions of a continuous random variable. Methodol. Comput. Appl. Probab. 27(10) (2025) https://doi.org/10.1007/s11009-025-10137-x
-
[15]
Lasota, A., Yorke, James A.: On the existence of invariant measures for piecewise mono- tonic transformations. Trans. Amer. Math. Soc. 186, 481–488 (1973) https://www.ams.org/ journals/tran/1973-186-00/S0002-9947-1973-0335758-1/
work page 1973
-
[16]
Liverani, C.: Decay of Correlations. Ann. Math. 142(2), 239-301 (1995) https://doi.org/ 10.2307/2118636
-
[17]
Mori, M.: On the decay of correlation for piecewise monotonic mappings. I. Tokyo J. Math., 8(2), 389-414 (1985) https://doi.org/10.3836/tjm/1270151221
-
[18]
Mori, M.: On the decay of correlation for piecewise monotonic mappings. II. Tokyo J. Math., 9(1), 135-161 (1986) https://doi.org/10.3836/tjm/1270150982
-
[19]
Parry, W.: On the β-expansions of real numbers. Acta Math. Acad. Sci. Hungar. 11, 401–416 (1960) https://doi.org/10.1007/BF02020954
-
[20]
Pollicott, M., Sewell, B.: Explicit examples of resonances for Anosov maps of the torus. Nonlinearity. 36(1), 110-132 (2023) https://doi.org/10.1088/1361-6544/ac9a2e
-
[21]
R´enyi, A.: Representations for real numbers and their ergodic properties. Acta Math. Acad. Sci. Hungar. 8, 477–493 (1957) https://doi.org/10.1007/BF02020331
-
[22]
Dy- namical Systems 37(1), 9–28 (2022) https://doi.org/10.1080/14689367.2021.1998378
Suzuki, S.: Eigenfunctions of the Perron–Frobenius operators for generalized beta-maps. Dy- namical Systems 37(1), 9–28 (2022) https://doi.org/10.1080/14689367.2021.1998378
-
[23]
Walters, P.: Equilibrium states for β-transformations and related transformations. Math. Z. 159, 65–88 (1978) https://doi.org/10.1007/BF01174569 19
discussion (0)
Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.