English

The Hasse principle for homogeneous polynomials with random coefficients over thin sets

Number Theory 2025-09-10 v3

Abstract

In this paper, we investigate the solubility of homogeneous polynomial equations. The work of Browning, Le boudec, Sawin [3] shows that almost all homogeneous equations of degree d4d\geq 4 in d+1d+1 or more variables satisfy the Hasse principle, and in particular that a positive portion possess a non-trivial integral solution. Our main result, when combined with our sequel joint work with H.Lee and S.Lee, shows that such a conclusion remains true even when the coefficients of homogeneous polynomials are constrained by a polynomial condition under a modest condition on the number of variables. To be precise, let dd and nn be natural numbers. Let νd,n:RnRN\nu_{d,n}: \mathbb{R}^n\rightarrow \mathbb{R}^N denote the Veronese embedding with N=(n+d1d)N=\binom{n+d-1}{d}, defined by listing all the monomials of degree dd in nn variables using the lexicographical ordering. Let a,νd,n(x)Z[x]\langle \boldsymbol{a}, \nu_{d,n}(\boldsymbol{x})\rangle\in \mathbb{Z}[\boldsymbol{x}] be a homogeneous polynomial in nn variables of degree dd with integer coefficients a\boldsymbol{a}, where ,\langle\cdot,\cdot\rangle denotes the inner product. For a non-singular form PZ[x]P\in \mathbb{Z}[\boldsymbol{x}] in NN variables of degree k2,k\geq 2, consider a set of integer vectors aZN\boldsymbol{a}\in \mathbb{Z}^N, defined by A(A;P)={aZN P(a)=0, aA}.\mathfrak{A}(A;P)=\{\boldsymbol{a}\in \mathbb{Z}^N|\ P(\boldsymbol{a})=0,\ \|\boldsymbol{a}\|_{\infty}\leq A\}. We confirm that when d4d\geq 4, nn is sufficiently large in terms of dd, and kd,k\leq d, the proportion of integer vectors aZN\boldsymbol{a}\in \mathbb{Z}^N in A(A;P)\mathfrak{A}(A;P), whose associated equations a,νd,n(x)=0\langle \boldsymbol{a}, \nu_{d,n}(\boldsymbol{x})\rangle=0 satisfy the Hasse principle, converges to 11 as AA\rightarrow \infty. We make explicit a lower bound on nn guaranteeing this conclusion. In particular, we show that when d14d\geq 14 it suffices to take n32d+17n\geq 32d+17.

Keywords

Cite

@article{arxiv.2305.08035,
  title  = {The Hasse principle for homogeneous polynomials with random coefficients over thin sets},
  author = {Kiseok Yeon},
  journal= {arXiv preprint arXiv:2305.08035},
  year   = {2025}
}

Comments

81 pages, to appear in Proceedings of the London Mathematical Society

R2 v1 2026-06-28T10:33:51.135Z