Waring and Waring-Goldbach subbases with prescribed representation function
Pith reviewed 2026-05-23 05:00 UTC · model grok-4.3
The pith
Subbases of k-th powers realize every regularly varying representation growth above logarithmic when h meets a k-dependent threshold.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
Assuming an asymptotic for a weighted h-fold representation sum over a basis B, there exist subbases A ⊆ B whose representation function r_{A,h}(n) has prescribed regularly varying growth. We apply this to k-th powers N^k and to k-th powers of primes P^k. For h ≥ k² - k + O(√k), every regularly varying function F with F(x)/log x → ∞ in the admissible range is realized, with the expected singular series factor. In particular, there exists A ⊆ N^k such that r_{A,h}(n) ∼ S_{k,h}(n) F(n). Moreover, in the prime setting we obtain thin subbases A ⊆ P^k with r_{A,h}(n) ≍ log n for n in the admissible congruence classes.
What carries the argument
The general probabilistic subbasis principle, which selects A randomly from B using the assumed asymptotic on weighted representations to force the target growth on r_{A,h}.
If this is right
- Every admissible regularly varying F is realized by some A ⊆ N^k with the singular series factor when h meets the stated bound.
- Thin subbases A ⊆ P^k exist with r_{A,h}(n) ≍ log n in admissible congruence classes.
- The construction works for any basis B that possesses the required weighted representation asymptotic.
- The growth of r_{A,h} can be prescribed freely inside the regularly varying class above logarithmic growth.
Where Pith is reading between the lines
- The same selection method could be applied to other additive bases known to possess representation asymptotics.
- Refinements to the probabilistic estimates might lower the threshold on h relative to k.
- The constructed subbases may inherit additional additive properties from the ambient basis beyond the prescribed representation growth.
Load-bearing premise
An asymptotic formula holds for the weighted h-fold representation sums over the full basis B.
What would settle it
An explicit regularly varying F with F(x)/log x → ∞ for which no subbasis A of the k-th powers satisfies r_{A,h}(n) ∼ S_{k,h}(n) F(n) when h exceeds k² - k + O(√k).
read the original abstract
Let $h\geq 2$. For $A\subseteq \mathbb{N}$ write \[ r_{A,h}(n) := \#\{(x_1,\ldots,x_h)\in A^h ~|~ x_1+\cdots+x_h=n\}. \] We prove a general probabilistic subbasis principle: assuming an asymptotic for a weighted $h$-fold representation sum over a basis $B$, there exist subbases $A\subseteq B$ whose representation function $r_{A,h}(n)$ has prescribed regularly varying growth. We apply this to $k$-th powers $\mathbb{N}^k$ and to $k$-th powers of primes $\mathbb{P}^k$. For $h \geq k^2-k+O(\sqrt{k})$, we show that every regularly varying function $F$ with $F(x)/\log x\to\infty$ in the admissible range is realized, with the expected singular series factor. In particular, there exists $A\subseteq \mathbb{N}^k$ such that \[ r_{A,h}(n)\sim \mathfrak{S}_{k,h}(n) F(n). \] Moreover, in the prime setting we obtain thin subbases $A\subseteq \mathbb{P}^k$ with $r_{A,h}(n)\asymp \log n$ for $n$ in the admissible congruence classes.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript establishes a general probabilistic subbasis principle: assuming an asymptotic for a weighted h-fold representation sum over a basis B, there exist subbases A ⊆ B whose representation function r_{A,h}(n) has prescribed regularly varying growth. It applies this to B = ℕ^k and B = ℙ^k. For h ≥ k² - k + O(√k), every regularly varying F with F(x)/log x → ∞ (in the admissible range) is realized as r_{A,h}(n) ∼ 𝔖_{k,h}(n) F(n) for A ⊆ ℕ^k; additionally, thin subbases A ⊆ ℙ^k are obtained with r_{A,h}(n) ≍ log n in admissible congruence classes.
Significance. If the weighted asymptotic premise holds, the result supplies a flexible tool for realizing arbitrary regularly varying representation functions (with singular series) inside Waring and Waring-Goldbach bases. The work correctly operates at the current best-known threshold k² - k + O(√k) for the Waring asymptotic; the stress-test concern that this h is too small does not land, as the threshold matches the best available bounds in the literature for the full-basis asymptotic to hold with acceptable error.
major comments (2)
- [§2] The general principle (abstract and §2): the probabilistic deletion argument must be shown to preserve the singular series factor 𝔖_{k,h}(n) up to (1+o(1)) uniformly in the admissible range; explicit variance bounds or concentration estimates for the weighted sum are required to ensure the main term is not disturbed by the random selection.
- [Theorem 1.2] Application to ℕ^k (Theorem 1.2 or equivalent): the claim that the weighted h-fold asymptotic holds for the full basis B = ℕ^k at h ≥ k² - k + O(√k) is load-bearing; a precise citation to the theorem establishing this asymptotic (including the precise form of the error term) must be supplied, as the subbasis existence reduces directly to it.
minor comments (2)
- [Introduction] Notation for the admissible range of F should be stated explicitly once (e.g., the precise growth conditions under which F(x)/log x → ∞ is admissible).
- [Theorem 1.3] In the prime-power case, clarify whether the constant implicit in ≍ log n depends on k or is absolute.
Simulated Author's Rebuttal
We thank the referee for the careful reading and the recommendation of minor revision. The comments are helpful for clarifying the dependence on the full-basis asymptotic and the concentration in the probabilistic argument. We address each point below and will revise accordingly.
read point-by-point responses
-
Referee: [§2] The general principle (abstract and §2): the probabilistic deletion argument must be shown to preserve the singular series factor 𝔖_{k,h}(n) up to (1+o(1)) uniformly in the admissible range; explicit variance bounds or concentration estimates for the weighted sum are required to ensure the main term is not disturbed by the random selection.
Authors: In Section 2 the random subbasis is formed by independent Bernoulli deletion with success probability chosen so that the expectation of the weighted representation sum equals 𝔖_{k,h}(n) F(n) (1+o(1)). The second-moment calculation, which relies on the assumed weighted asymptotic for the full basis B, yields Var = o((main term)^2) uniformly over the admissible n; Chebyshev’s inequality then gives the required concentration. We will insert the explicit variance bound and the resulting (1+o(1)) preservation statement into the revised Section 2. revision: yes
-
Referee: [Theorem 1.2] Application to ℕ^k (Theorem 1.2 or equivalent): the claim that the weighted h-fold asymptotic holds for the full basis B = ℕ^k at h ≥ k² - k + O(√k) is load-bearing; a precise citation to the theorem establishing this asymptotic (including the precise form of the error term) must be supplied, as the subbasis existence reduces directly to it.
Authors: The threshold h ≥ k² - k + O(√k) is taken from the best available asymptotic formula for the weighted h-fold sum over all k-th powers. We will add the precise reference together with the exact statement of the main term and error term in the revised introduction and in the paragraph preceding Theorem 1.2. revision: yes
Circularity Check
No significant circularity; result conditional on external asymptotic for full basis
full rationale
The paper states a general probabilistic principle that is explicitly conditional on an assumed asymptotic for the weighted h-fold sum over the full basis B. It then applies the principle to B = ℕ^k (and ℙ^k) once h meets the stated threshold, yielding existence of subbases A with the prescribed r_{A,h}(n) ∼ 𝔖_{k,h}(n) F(n). No step in the provided text reduces the target growth F(n) or the existence claim back into the assumption by definition, fitting, or self-citation chain; the construction selects A probabilistically from the assumed main term on B without feeding the conclusion into the premise. The derivation remains self-contained against the stated external benchmark (the weighted asymptotic on B) and exhibits no self-definitional, fitted-input, or load-bearing self-citation patterns.
Axiom & Free-Parameter Ledger
axioms (1)
- domain assumption An asymptotic holds for a weighted h-fold representation sum over the basis B
Forward citations
Cited by 1 Pith paper
-
Thin subbases of Piatetski-Shapiro sequences
Piatetski-Shapiro sequences N_(c) contain thin subbases A of order h>=5 (for 1<c<2) or h>=(floor(2c)+1)(floor(2c)+2)+1 (for c>2), with r_{A,h}(n) ~ F(n) for regularly varying F satisfying the stated growth bounds.
Reference graph
Works this paper leans on
-
[1]
N. H. Bingham, C. M. Goldie, and J. L. Teugels, Regular variation, Cambridge Univ. Press, 1989
work page 1989
-
[2]
J. Br¨ udern and T. D. Wooley, On Waring’s problem for larger powers , J. Reine Angew. Math. 805 (2023), 115–142
work page 2023
-
[3]
P . Erd˝ os,Problems and results in additive number theory , Colloque sur la Theorie des Nombres (CBRM) (Bruxelles), 1956, pp. 127–137
work page 1956
-
[4]
, Problems and results on additive properties of general sequ ences, II, Acta Math. Hung. 48 (1986), 127–137
work page 1986
-
[5]
P . Erd˝ os and P . Tetali,Representations of integers as the sum of k terms, Random Struct. Algor. 1 (1990), 245–261
work page 1990
-
[6]
Granville, Refinements of Goldbach’s conjecture, and the generalized R iemann hypothesis, Funct
A. Granville, Refinements of Goldbach’s conjecture, and the generalized R iemann hypothesis, Funct. Approx. Comment. Math. 37 (2007), 159–173
work page 2007
-
[7]
Harman, Trigonometric sums over primes, I , Mathematika 28 (1981), 249–254
G. Harman, Trigonometric sums over primes, I , Mathematika 28 (1981), 249–254
work page 1981
-
[8]
L. K. Hua, Additive theory of prime numbers , American Mathematical Society, 1965
work page 1965
-
[9]
J. H. Kim and V . H. Vu, Concentration of multivariate polynomials and its applica tions, Combinatorica 20 (2000), no. 3, 417–434
work page 2000
-
[10]
A. V . Kumchev and D. I. Tolev, An invitation to additive prime number theory , Serdica Math J. 31 (2005), 1–74
work page 2005
-
[11]
H. L. Montgomery and R. C. V aughan, Multiplicative number theory I: Classical theory , Cambridge Studies in Advanced Mathematics, vol. 97, Cambridge University Pre ss, Cambridge, 2006
work page 2006
-
[12]
M. B. Nathanson, Additive number theory: The classical bases , 2nd ed., Graduate Texts in Mathematics, vol. 164, Springer, 1996
work page 1996
-
[13]
Pliego, On Vu’s theorem in Waring’s problem for thinner sequences , arXiv:2410.11832, 2024
J. Pliego, On Vu’s theorem in Waring’s problem for thinner sequences , arXiv:2410.11832, 2024
-
[14]
Representation functions with prescribed rates of growth
C. T´ afula,Representation functions with prescribed rates of growth , arXiv:2405.01530, 2024
work page internal anchor Pith review Pith/arXiv arXiv 2024
-
[15]
R. C. V aughan, The Hardy–Littlewood method, 2nd ed., Cambridge Univ. Press, 1997
work page 1997
-
[16]
V . H. Vu, On a refinement of Waring’s problem , Duke Math. J. 105 (2000), 107–134
work page 2000
-
[17]
, On the concentration of multivariate polynomials with smal l expectation, Random Struct. Algor. 16 (2000), 344–363
work page 2000
-
[18]
Wirsing, Thin subbases, Analysis 6 (1986), 285–308
E. Wirsing, Thin subbases, Analysis 6 (1986), 285–308
work page 1986
-
[19]
T. D. Wooley, On Vu’s thin basis theorem in Waring’s problem , Duke Math. J. 120 (2003), 1–34
work page 2003
-
[20]
, A light-weight version of Waring’s problem , J. Austral. Math. Soc. 76 (2004), 303–316. D ´EPARTEMENT DE MATH ´EMATIQUES ET DE STATISTIQUE , U NIVERSIT ´E DE MONTR ´EAL , CP 6128 SUCC . CENTRE -V ILLE , M ONTR ´EAL , QC H3C 3J7, C ANADA Email address: christian.tafula.santos@umontreal.ca
work page 2004
discussion (0)
Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.