Counting solutions to the quadratic determinant equation
Pith reviewed 2026-05-19 14:50 UTC · model grok-4.3
The pith
When h equals N squared plus O(N), the number of solutions to x1 x2 minus x3 x4 equals h inside the box of side 2N admits an asymptotic with square-root cancellation error terms.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
When h = N^2 + O(N), the number of solutions admits an asymptotic formula with square-root cancellation error terms obtained by exploiting symmetry via Ramanujan sums and bypassing Kloosterman sum bounds.
What carries the argument
The additional symmetry available precisely when h = N^2 + O(N), which permits direct application of Ramanujan sums to the solution count.
If this is right
- The main term of the count is expressible using standard arithmetic functions such as the divisor function.
- The error remains of square-root size uniformly over all h in the interval N^2 + O(N).
- Sharper control is obtained on the distribution of values of the bilinear form near its largest possible magnitude.
- The method extends previous partial results on this equation to the full range of h up to N squared.
Where Pith is reading between the lines
- The same symmetry argument may apply to other bilinear or quadratic forms that attain a distinguished value inside their range.
- Numerical verification for large but feasible N could confirm the cancellation rate before analytic proofs are needed.
- The approach suggests a route to improved error terms in related counting problems where a natural symmetry appears only for special right-hand sides.
Load-bearing premise
The additional symmetry present precisely when h = N^2 + O(N) permits direct use of Ramanujan sums to achieve square-root cancellation without relying on general Kloosterman bounds.
What would settle it
Explicit computation of the exact solution count for a fixed moderate N and an h equal to N squared, followed by checking whether the size of the remainder matches the square-root order rather than the larger size predicted by uniform Kloosterman bounds.
read the original abstract
Given $h, N \in \mathbb{N}$ satisfying $1 \leqslant h \leqslant N^2$, we prove an asymptotic formula for the number of solutions to the equation $x_1 x_2 - x_3 x_4 = h$ with $x_1, \ldots, x_4 \in [-N,N] \cap \mathbb{Z}$. We use a combination of combinatorial and analytic arguments in physical space along with bounds for Kloosterman sums. Our main result concerns the case when $h = N^2 + O(N)$, wherein we obtain square-root cancellation error terms by bypassing Kloosterman sum bounds and exploiting an additional symmetry available in this setting via Ramanujan sums. This confirms a speculation of Dhanda-Haynes-Prasala in a very general form.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript proves an asymptotic formula for the number of integer solutions (x1,x2,x3,x4) in [-N,N]^4 to the equation x1 x2 - x3 x4 = h, where 1 ≤ h ≤ N². The central result addresses the regime h = N² + O(N), deriving an asymptotic with square-root cancellation error terms by reducing the count to a Ramanujan-sum expression that exploits an additional symmetry in this range, thereby avoiding general Kloosterman sum bounds. The argument combines a combinatorial decomposition in physical space with analytic estimates and confirms a speculation of Dhanda-Haynes-Prasala.
Significance. If the main result holds, the paper contributes a sharp asymptotic in a narrow range around the maximum value of the determinant form, where standard methods produce weaker error terms. The explicit reduction to Ramanujan sums demonstrates how symmetry can be leveraged for square-root cancellation without heavier analytic machinery, offering a template for related counting problems on quadratic hypersurfaces or lattice-point problems with special arithmetic structure.
minor comments (3)
- [Abstract] The abstract would be strengthened by explicitly naming the main theorem (e.g., Theorem 1.2) that encodes the special-case asymptotic.
- [§1] In the introduction, a short paragraph outlining the separation between the general combinatorial-analytic argument and the special-case Ramanujan-sum reduction would improve readability.
- [References] Ensure the citation for Dhanda-Haynes-Prasala includes the full title, journal or arXiv identifier, and year.
Simulated Author's Rebuttal
We thank the referee for their positive report, accurate summary of the main result, and recommendation of minor revision. The referee correctly identifies the key innovation: obtaining square-root cancellation for h = N² + O(N) by reducing to Ramanujan sums and exploiting the additional symmetry in this narrow range, thereby confirming the speculation of Dhanda-Haynes-Prasala without relying on general Kloosterman bounds.
Circularity Check
No significant circularity; derivation relies on standard analytic tools
full rationale
The paper derives an asymptotic formula for the number of solutions to x1 x2 - x3 x4 = h using combinatorial decompositions in physical space combined with standard bounds on Kloosterman sums for the general case. In the special regime h = N^2 + O(N), it exploits an additional symmetry to reduce directly to an expression involving Ramanujan sums, whose square-root cancellation follows from their established orthogonality and summation properties rather than any fitted parameter or self-referential definition. No load-bearing step reduces by construction to the target count or to a self-citation chain; the cited speculation of Dhanda-Haynes-Prasala is external and the argument remains self-contained against external benchmarks such as known sum estimates.
Axiom & Free-Parameter Ledger
axioms (2)
- standard math Known bounds for Kloosterman sums
- standard math Properties of Ramanujan sums
Lean theorems connected to this paper
-
IndisputableMonolith/Foundation/AbsoluteFloorClosure.leanreality_from_one_distinction unclear?
unclearRelation between the paper passage and the cited Recognition theorem.
Theorem 1.3 … Ramanujan sums … bypassing Kloosterman sum bounds … h=N²+O(N)
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]
M. Afifurrahman,A uniform formula on the number of integer matrices with given determinant and height, J. Number Theory281(2026), 741–770
work page 2026
-
[2]
T. Apostol,Introduction to analytic number theory, Undergraduate Texts in Mathematics, Springer- Verlag, New York-Heidelberg, 1976
work page 1976
-
[3]
J. Chapman, A. Mudgal,On commuting integer matrices, arXiv:2504.15839, to appear in Trans. Amer. Math. Soc
-
[4]
J. Chapman, A. Mudgal,Counting2×2integer matrices with a given determinant, arXiv:2509.20259
work page internal anchor Pith review arXiv
-
[5]
J.-M. Deshouillers, H. Iwaniec,An additive divisor problem, J. London Math. Soc. (2)26(1982), no. 1, 1–14
work page 1982
- [6]
-
[7]
S. Ganguly, R. Guria,Lattice points on determinant surfaces and the spectrum of the automorphic Laplacian, arXiv:2410.04637
work page internal anchor Pith review arXiv
-
[8]
D. R. Heath-Brown,The fourth power moment of the Riemann zeta function, Proc. London Math. Soc. (3)38(1979), no. 3, 385–422
work page 1979
-
[9]
D. R. Heath-Brown,A new form of the circle method, and its application to quadratic forms, J. Reine Angew. Math.481(1996), 149–206. 28 JONATHAN CHAPMAN AND AKSHAT MUDGAL
work page 1996
-
[10]
Hooley,An asymptotic formula in the theory of numbers, Proc
C. Hooley,An asymptotic formula in the theory of numbers, Proc. London Math. Soc. (3)7(1957), 396–413
work page 1957
-
[11]
Hooley,On the number of divisors of a quadratic polynomial, Acta Math.110(1963), 97–114
C. Hooley,On the number of divisors of a quadratic polynomial, Acta Math.110(1963), 97–114
work page 1963
-
[12]
Iwaniec,Spectral methods of automorphic forms, Second edition Grad
H. Iwaniec,Spectral methods of automorphic forms, Second edition Grad. Stud. Math., 53 American Mathematical Society, Providence, RI; Revista Matem´ atica Iberoamericana, Madrid, 2002
work page 2002
-
[13]
Lewin,Dilogarithms and associated functions, Macdonald, London, 1958
L. Lewin,Dilogarithms and associated functions, Macdonald, London, 1958
work page 1958
- [14]
-
[15]
T. Meurman,On the binary additive divisor problem, Number theory (Turku, 1999), 223—246, Walter de Gruyter & Co., Berlin, 2001
work page 1999
-
[16]
Motohashi,The binary additive divisor problem, Ann
Y. Motohashi,The binary additive divisor problem, Ann. Sci. ´Ecole Norm. Sup. (4)27(1994), no. 5, 529–572
work page 1994
-
[17]
Niedermowwe,The circle method with weights for the representation of integers by quadratic forms, J
N. Niedermowwe,The circle method with weights for the representation of integers by quadratic forms, J. Math. Sci. (N.Y.)171(2010), no. 6, 753–764
work page 2010
-
[18]
Oh,Hardy-Littlewood system and representations of integers by an invariant polynomial, Geom
H. Oh,Hardy-Littlewood system and representations of integers by an invariant polynomial, Geom. Funct. Anal.14(2004), no. 4, 791–809. Mathematics Institute, Zeeman Building, University of W arwick, Coventry CV4 7AL, United Kingdom Email address:Jonathan.Chapman@warwick.ac.uk Mathematics Institute, Zeeman Building, University of W arwick, Coventry CV4 7AL,...
work page 2004
discussion (0)
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