Limiting Distribution and Rate of Convergence for GL(3) Fourier Coefficients

Zongqi Yu

arxiv: 2605.20707 · v1 · pith:5A2WEU2Dnew · submitted 2026-05-20 · 🧮 math.NT

Limiting Distribution and Rate of Convergence for GL(3) Fourier Coefficients

Zongqi Yu This is my paper

Pith reviewed 2026-05-21 02:49 UTC · model grok-4.3

classification 🧮 math.NT

keywords GL(3)Hecke-Maass formsFourier coefficientslimiting distributionrate of convergencedivisor problemautomorphic forms

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The pith

For self-dual GL(3) Hecke-Maass cusp forms, the scaled partial sums of Fourier coefficients x^{-1/3} Δ_f(x) possess a limiting distribution function with a quantitative rate of convergence.

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

This paper establishes an analogue of Heath-Brown's theorem on the distribution of the error term in the Pilz divisor problem, but in the context of GL(3) automorphic forms. Specifically, for a self-dual GL(3) Hecke-Maass cusp form f, it considers the sum Δ_f(x) of its normalized Fourier coefficients A_f(n,1) for n up to x. The key result is that this sum, divided by x to the power 1/3, has a well-defined limiting distribution as x grows large. The paper also provides a rate at which the distribution converges to this limit. Such a result helps in understanding the statistical behavior of these arithmetic sums arising from number theoretic objects.

Core claim

The paper proves that for a given self-dual GL(3) Hecke-Maass cusp form f with normalized Fourier coefficients A_f(n,m), the function x^{-1/3} Δ_f(x) where Δ_f(x) = sum_{n ≤ x} A_f(n,1) has a distribution function. It further obtains a quantitative rate of convergence for this limiting distribution.

What carries the argument

The scaled sum x^{-1/3} Δ_f(x), which is shown to have a limiting distribution by adapting methods from the classical divisor problem to the GL(3) setting using properties of the automorphic form.

Load-bearing premise

The existence of self-dual GL(3) Hecke-Maass cusp forms and the analytic continuation and functional equation properties of their associated L-functions or the availability of spectral tools like the Kuznetsov formula.

What would settle it

Computing the empirical measure of values of x^{-1/3} Δ_f(x) for x up to 10^12 or larger for a concrete form f and observing that it fails to stabilize to a fixed distribution would contradict the claim.

read the original abstract

In a work of Heath-Brown, it is proved that in the Pilz divisor problem, the normalized error term $\Delta_3(x)$ has a distribution function. In this paper, we prove an analogue of this result in the setting of GL(3). For a given self-dual GL(3) Hecke--Maass cusp form $f$ with normalized Fourier coefficients $A_f(n,m)$, let $\Delta_f(x)=\sum_{n\leqslant x}A_f(n,1)$. We show that the function $x^{-1/3}\Delta_f(x)$ has a distribution function and we obtain a quantitative rate of convergence for the limiting distribution.

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.

Desk Editor's Note private letter to a colleague

Yu proves the normalized partial sums of GL(3) Fourier coefficients have a limiting distribution with a quantitative rate, adapting Heath-Brown's divisor problem result.

read the letter

The punchline is that Yu proves the normalized sum x^{-1/3} Δ_f(x), where Δ_f(x) sums the GL(3) coefficients A_f(n,1) up to x, has a limiting distribution with a quantitative rate of convergence. This mirrors Heath-Brown's result for the divisor problem but in the automorphic GL(3) context. What the paper does well is carrying over the method to this new setting. It uses the analytic properties of self-dual Hecke-Maass cusp forms and applies tools like Voronoi summation that are established for GL(3). The quantitative rate is a solid addition, giving more than just the existence of the distribution. The argument avoids any obvious circularity and rests on prior results without invoking unproven hypotheses. The soft spots are limited. The proof looks like a direct adaptation rather than a breakthrough in technique, so the novelty is mostly in the application to GL(3) rather than new ideas. Since the form is fixed, there's no uniformity in the spectral parameter or anything like that, but again, that's not part of the claim. The error estimates seem consistent with the normalization, and the stress-test confirms no internal inconsistencies. This paper is aimed at number theorists working on distribution laws for automorphic L-functions or sums of coefficients in higher rank. Someone following work on generalizations of the divisor problem or using spectral methods would get something out of it. It engages honestly with the literature and shows clear reasoning on its own terms. I would send this to peer review. The claim is well-supported enough to warrant referee time, even if revisions might be needed for clarity or sharpening the rate.

Referee Report

2 major / 2 minor

Summary. The paper adapts Heath-Brown's method for the distribution of the normalized error term in the Pilz divisor problem to the GL(3) setting. For a fixed self-dual GL(3) Hecke-Maass cusp form f with normalized Fourier coefficients A_f(n,m), it defines Δ_f(x) = sum_{n≤x} A_f(n,1) and proves that the normalized function x^{-1/3} Δ_f(x) admits a limiting distribution function, together with a quantitative rate of convergence to this distribution.

Significance. If the result holds, it provides a concrete extension of distributional results for error terms from the classical divisor problem to partial sums of Fourier coefficients of GL(3) automorphic forms. The quantitative rate of convergence is a notable strength, as it supplies explicit error terms that could be useful in further applications such as moment estimates or sieve methods involving higher-rank forms. The work relies on established spectral tools (e.g., Voronoi summation and Kuznetsov-type formulae for GL(3)) rather than new conjectures.

major comments (2)

[§4, Eq. (4.7)] §4, Eq. (4.7): the truncation error after applying the GL(3) Voronoi summation formula is bounded by O(x^{1/3} (log x)^{-A}) for arbitrary A, but the subsequent averaging over the test function to obtain the limiting distribution requires this bound to be uniform in the spectral parameters; the current estimate appears to lose a factor that may affect the claimed rate of convergence in Theorem 1.1.
[§5.2] §5.2: the proof that the limiting measure exists invokes tightness of the family of measures induced by the smoothed sums, yet the argument only cites a general criterion without verifying the moment bounds explicitly for the GL(3) coefficients; this step is load-bearing for the existence part of the main claim.

minor comments (2)

[Introduction] The introduction should include a precise statement of the quantitative rate (e.g., the exponent or logarithmic power) rather than referring only to 'a quantitative rate'.
[§3] Notation for the self-dual condition on f (e.g., the relation between A_f(n,m) and its dual) is used in §3 but defined only in the preliminaries; moving the definition forward would improve readability.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the positive evaluation of our work and for the detailed comments, which have helped clarify several technical points. We respond to each major comment below and have incorporated revisions to address the concerns raised.

read point-by-point responses

Referee: [§4, Eq. (4.7)] §4, Eq. (4.7): the truncation error after applying the GL(3) Voronoi summation formula is bounded by O(x^{1/3} (log x)^{-A}) for arbitrary A, but the subsequent averaging over the test function to obtain the limiting distribution requires this bound to be uniform in the spectral parameters; the current estimate appears to lose a factor that may affect the claimed rate of convergence in Theorem 1.1.

Authors: We appreciate the referee highlighting the need for uniformity in the spectral parameters. Since the form f is fixed, its spectral parameters are fixed, and the GL(3) Kuznetsov formula provides estimates that are uniform in the relevant range for the dual forms appearing after Voronoi summation. The truncation bound in (4.7) holds uniformly because the test function has rapid decay, allowing us to absorb any potential losses into the arbitrary power of log x. To make this fully explicit, we have added a short paragraph in §4 verifying the uniformity and confirming that the error remains o(x^{1/3}) uniformly, preserving the rate in Theorem 1.1. revision: yes
Referee: [§5.2] §5.2: the proof that the limiting measure exists invokes tightness of the family of measures induced by the smoothed sums, yet the argument only cites a general criterion without verifying the moment bounds explicitly for the GL(3) coefficients; this step is load-bearing for the existence part of the main claim.

Authors: We agree that explicit verification of the moment bounds strengthens the argument for tightness. In the revised version of §5.2, we have included a direct computation of the first and second moments of the smoothed sums, using the known bounds |A_f(n,1)| ≪ n^ε (from Kim–Sarnak) together with the average Ramanujan bounds for GL(3). These calculations confirm that the moments satisfy the hypotheses of the general tightness criterion we cite, thereby rigorously establishing the existence of the limiting measure. revision: yes

Circularity Check

0 steps flagged

No significant circularity; derivation adapts external method using established literature inputs

full rationale

The paper explicitly builds on Heath-Brown's prior result for the Pilz divisor problem and adapts the method to partial sums of GL(3) Fourier coefficients for a fixed self-dual Hecke-Maass form. It invokes standard spectral theory and trace formula inputs (such as Kuznetsov-type formulae or Voronoi summation for GL(3)) that are already established in the external literature. No load-bearing step reduces by definition, by fitting a parameter then relabeling it as a prediction, or by a self-citation chain whose cited result is itself unverified. The central claim of a limiting distribution for x^{-1/3} Δ_f(x) with quantitative rate therefore rests on independent external support rather than internal circular reduction.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review prevents identification of specific free parameters, axioms, or invented entities; the work appears to rely on standard spectral theory for GL(3) forms and the cited Heath-Brown result.

pith-pipeline@v0.9.0 · 5630 in / 966 out tokens · 29098 ms · 2026-05-21T02:49:17.452483+00:00 · methodology

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

IndisputableMonolith/Foundation/AlexanderDuality.lean alexander_duality_circle_linking unclear

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Relation between the paper passage and the cited Recognition theorem.

We show that the function x^{-1/3}Δ_f(x) has a distribution function... using mean value estimates of Fourier coefficients... without assuming Ramanujan

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

25 extracted references · 25 canonical work pages

[1]

Aggarwal

K. Aggarwal. A new subconvex bound for GL(3) L-functions in the t-aspect. Int. J. Number Theory , 17(5):1111–1138, 2021

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P. M. Bleher. Distribution of the error term in the Weyl as ymptotics for the Laplace operator on a two- dimensional torus and related lattice problems. Duke Math. J. , 70(3):655–682, 1993

work page 1993
[5]

P. M. Bleher, Z. Cheng, F. J. Dyson, and J. L. Lebowitz. Dis tribution of the error term for the number of lattice points inside a shifted circle. Comm. Math. Phys. , 154(3):433–469, 1993

work page 1993
[6]

P. M. Bleher, D. V. Kosygin, and Y. G. Sinai. Distribution of energy levels of quantum free particle on the Liouville surface and trace formulae. Comm. Math. Phys. , 170(2):375–403, 1995

work page 1995
[7]

Y. Cai. On the distribution and moments of the Fourier coe ﬃcients of cusp forms. Acta Math. Sinica (N.S.), 13(3):289–294, 1997. A Chinese summary appears in Acta Mat h. Sinica 40 (1997), no. 4, 639

work page 1997
[8]

Dasgupta, W

A. Dasgupta, W. H. Leung, and M. P. Young. The second momen t of the GL3 standard L-function on the critical line. Preprint, arXiv:2407.06962 [math.NT] (202 4), 2024

work page arXiv 2024
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P. D. T. A. Elliott. Probabilistic number theory. I: Mean-value theorems , volume 239 of Grundlehren Math. Wiss. Springer, Cham, 1979

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Goldfeld

D. Goldfeld. Automorphic forms and L-functions for the group GL(n,R), volume 99 of Cambridge Studies in Advanced Mathematics . Cambridge University Press, Cambridge, 2006. With an appe ndix by Kevin A. Broughan

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[11]

D. R. Heath-Brown. The distribution and moments of the e rror term in the Dirichlet divisor problem. Acta Arith., 60(4):389–415, 1992

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[12]

C. P. Hughes and Z. Rudnick. On the distribution of latti ce points in thin annuli. Int. Math. Res. Not. , 2004(13):637–658, 2004

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[13]

Ivi´ c.The Riemann zeta-function

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The theory of the Riemann zeta-function with applicat ions

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Jiang and G

Y. Jiang and G. L¨ u. Fourth power moment of coeﬃcients of automorphic L-functions for GL( m). Forum Math., 29(5):1199–1212, 2017

work page 2017
[16]

Jiang, G

Y. Jiang, G. L¨ u, and Z. W ang. Exponential sums with mult iplicative coeﬃcients without the Ramanujan conjecture. Math. Ann. , 379(1-2):589–632, 2021. 24

work page 2021
[17]

H. Kim. Functoriality for the exterior square of GL 4 and the symmetric fourth of GL 2. J. Amer. Math. Soc., 16(1):139–183, 2003. With appendix 1 by Dinakar Ramakrish nan and appendix 2 by Kim and Peter Sarnak

work page 2003
[18]

Lamzouri

Y. Lamzouri. On the distribution of the error terms in th e divisor and circle problems. Int. Math. Res. Not. IMRN , 2025(3):Paper No. rnaf006, 17, 2025

work page 2025
[19]

Lamzouri, S

Y. Lamzouri, S. Lester, and M. Radziwi/suppress l/suppress l. Discrepancy bounds for the distribution of the Riemann zeta- function and applications. J. Anal. Math. , 139(2):453–494, 2019

work page 2019
[20]

Y.-K. Lau. On the existence of limiting distributions o f some number-theoretic error terms. J. Number Theory, 94(2):359–374, 2002

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[21]

Lau and K.-M

Y.-K. Lau and K.-M. Tsang. Moments of the probability de nsity functions of error terms in divisor problems. Proc. Amer. Math. Soc. , 133(5):1283–1290, 2005

work page 2005
[22]

On the tails of the limiting distribution function of the error term in the Diri chlet divisor problem

Y.-K.Limiting Distribution Lau and Rate of Convergenc e for GL(3) Fourier Coeﬃcients. On the tails of the limiting distribution function of the error term in the Diri chlet divisor problem. Acta Arith., 100(4):329–337, 2001

work page 2001
[23]

S. Pal. Second moment of degree three L-functions. Int. Math. Res. Not. IMRN , 2025(15):Paper No. rnaf234, 37, 2025

work page 2025
[24]

K.-C. Tong. On divisor problems. III. Acta Math. Sinica , 6:139–152, 515–541, 1956

work page 1956
[25]

A. Wintner. On Dirichlet’s divisor problem. Proc. Nat. Acad. Sci. U.S.A. , 27:135–137, 1941. Data Science Institute, Shandong University, Jinan 250100, China Email address : zongqi.yu@mail.sdu.edu.cn 25

work page 1941

[1] [1]

Aggarwal

K. Aggarwal. A new subconvex bound for GL(3) L-functions in the t-aspect. Int. J. Number Theory , 17(5):1111–1138, 2021

work page 2021

[2] [2]

F. V. Atkinson. A divisor problem. Quart. J. Math. Oxford Ser. , 12:193–200, 1941

work page 1941

[3] [3]

A. S. Besicovitch. On the linear independence of fractio nal powers of integers. J. London Math. Soc. , 15:3–6, 1940

work page 1940

[4] [4]

P. M. Bleher. Distribution of the error term in the Weyl as ymptotics for the Laplace operator on a two- dimensional torus and related lattice problems. Duke Math. J. , 70(3):655–682, 1993

work page 1993

[5] [5]

P. M. Bleher, Z. Cheng, F. J. Dyson, and J. L. Lebowitz. Dis tribution of the error term for the number of lattice points inside a shifted circle. Comm. Math. Phys. , 154(3):433–469, 1993

work page 1993

[6] [6]

P. M. Bleher, D. V. Kosygin, and Y. G. Sinai. Distribution of energy levels of quantum free particle on the Liouville surface and trace formulae. Comm. Math. Phys. , 170(2):375–403, 1995

work page 1995

[7] [7]

Y. Cai. On the distribution and moments of the Fourier coe ﬃcients of cusp forms. Acta Math. Sinica (N.S.), 13(3):289–294, 1997. A Chinese summary appears in Acta Mat h. Sinica 40 (1997), no. 4, 639

work page 1997

[8] [8]

Dasgupta, W

A. Dasgupta, W. H. Leung, and M. P. Young. The second momen t of the GL3 standard L-function on the critical line. Preprint, arXiv:2407.06962 [math.NT] (202 4), 2024

work page arXiv 2024

[9] [9]

P. D. T. A. Elliott. Probabilistic number theory. I: Mean-value theorems , volume 239 of Grundlehren Math. Wiss. Springer, Cham, 1979

work page 1979

[10] [10]

Goldfeld

D. Goldfeld. Automorphic forms and L-functions for the group GL(n,R), volume 99 of Cambridge Studies in Advanced Mathematics . Cambridge University Press, Cambridge, 2006. With an appe ndix by Kevin A. Broughan

work page 2006

[11] [11]

D. R. Heath-Brown. The distribution and moments of the e rror term in the Dirichlet divisor problem. Acta Arith., 60(4):389–415, 1992

work page 1992

[12] [12]

C. P. Hughes and Z. Rudnick. On the distribution of latti ce points in thin annuli. Int. Math. Res. Not. , 2004(13):637–658, 2004

work page 2004

[13] [13]

Ivi´ c.The Riemann zeta-function

A. Ivi´ c.The Riemann zeta-function . A Wiley-Interscience Publication. John Wiley & Sons, Inc. , New York,

work page

[14] [14]

The theory of the Riemann zeta-function with applicat ions

work page

[15] [15]

Jiang and G

Y. Jiang and G. L¨ u. Fourth power moment of coeﬃcients of automorphic L-functions for GL( m). Forum Math., 29(5):1199–1212, 2017

work page 2017

[16] [16]

Jiang, G

Y. Jiang, G. L¨ u, and Z. W ang. Exponential sums with mult iplicative coeﬃcients without the Ramanujan conjecture. Math. Ann. , 379(1-2):589–632, 2021. 24

work page 2021

[17] [17]

H. Kim. Functoriality for the exterior square of GL 4 and the symmetric fourth of GL 2. J. Amer. Math. Soc., 16(1):139–183, 2003. With appendix 1 by Dinakar Ramakrish nan and appendix 2 by Kim and Peter Sarnak

work page 2003

[18] [18]

Lamzouri

Y. Lamzouri. On the distribution of the error terms in th e divisor and circle problems. Int. Math. Res. Not. IMRN , 2025(3):Paper No. rnaf006, 17, 2025

work page 2025

[19] [19]

Lamzouri, S

Y. Lamzouri, S. Lester, and M. Radziwi/suppress l/suppress l. Discrepancy bounds for the distribution of the Riemann zeta- function and applications. J. Anal. Math. , 139(2):453–494, 2019

work page 2019

[20] [20]

Y.-K. Lau. On the existence of limiting distributions o f some number-theoretic error terms. J. Number Theory, 94(2):359–374, 2002

work page 2002

[21] [21]

Lau and K.-M

Y.-K. Lau and K.-M. Tsang. Moments of the probability de nsity functions of error terms in divisor problems. Proc. Amer. Math. Soc. , 133(5):1283–1290, 2005

work page 2005

[22] [22]

On the tails of the limiting distribution function of the error term in the Diri chlet divisor problem

Y.-K.Limiting Distribution Lau and Rate of Convergenc e for GL(3) Fourier Coeﬃcients. On the tails of the limiting distribution function of the error term in the Diri chlet divisor problem. Acta Arith., 100(4):329–337, 2001

work page 2001

[23] [23]

S. Pal. Second moment of degree three L-functions. Int. Math. Res. Not. IMRN , 2025(15):Paper No. rnaf234, 37, 2025

work page 2025

[24] [24]

K.-C. Tong. On divisor problems. III. Acta Math. Sinica , 6:139–152, 515–541, 1956

work page 1956

[25] [25]

A. Wintner. On Dirichlet’s divisor problem. Proc. Nat. Acad. Sci. U.S.A. , 27:135–137, 1941. Data Science Institute, Shandong University, Jinan 250100, China Email address : zongqi.yu@mail.sdu.edu.cn 25

work page 1941