中文

On the polynomial values represented by quadratic forms

综合数学 2026-07-07 v1

摘要

Many Diophantine equations can be reduced to the question of whether, for a given non-degenerate quadratic form FF and a univariate polynomial PP with integer coefficients, P(x)P(x) can be represented by FF for infinitely many values of xx. We develop a method for answering this question for certain cubic and quartic polynomials PP, as well as for certain polynomials of the form P(x)=R(Q(x))P(x)=R(Q(x)), where R(t)R(t) and Q(x)Q(x) are polynomials of degree 33 and 22, respectively. Applying this method with F(y,z)=y2+z2F(y,z)=y^2+z^2, R(t)=t34R(t)=t^3-4 and Q(x)=x2Q(x)=x^2, we conclude that x64x^6-4 is a sum of two squares infinitely often. In turn, this implies that the equation y2+x3y+z2+1=0y^2+x^3y+z^2+1=0 has infinitely many integer solutions. Prior to this work, it was the shortest equation for which it was open whether its integer solution set is finite or infinite. We conclude with a list of the new shortest equations whose finiteness problem remains open. All main results of this paper has been formalized in Lean using Aristotle.

引用

@article{arxiv.2607.06627,
  title  = {On the polynomial values represented by quadratic forms},
  author = {Bogdan Grechuk and Jamal Agbanwa},
  journal= {arXiv preprint arXiv:2607.06627},
  year   = {2026}
}