On the limiting behaviour of arithmetic toral eigenfunctions
Abstract
We consider a wide class of families (Fm)m∈N of Gaussian fields on Td=Rd/Zd defined by \[Fm:x 1|m|Σλ∈mζλ e2π i λ,x\] where the ζλ's are independent std. normals and m is the set of solutions λ∈Zd to p(λ)=m for a fixed elliptic polynomial p with integer coefficients. The case p(x)=x12+…+xd2 is a random Laplace eigenfunction whose law is sometimes called the arithmetic random wave, studied in the past by many authors. In contrast, we consider three classes of polynomials p: a certain family of positive definite quadratic forms in two variables, all positive definite quadratic forms in three variables except multiples of x12+x22+x32, and a wide family of polynomials in many variables. For these classes of polynomials, we study the (d-1)-dimensional volume Vm of the zero set of Fm. We compute the asymptotics, as m+∞ along certain sequences of integers, of the expectation and variance of Vm. Moreover, we prove that in the same limit, Vm-E[Vm]Var(Vm) converges to a std. normal. As in previous works, one reduces the problem of these asymptotics to the study of certain arithmetic properties of the sets of solutions to p(λ)=m. We need to study the number of such solutions for fixed m, the number of quadruples of solutions (λ,μ,,) satisfying λ+μ++=0, (4-correlations), and the rate of convergence of the counting measure of m towards a certain limiting measure on the hypersurface \p(x)=1\. To this end, we use prior results on this topic but also prove a new estimate on correlations, of independent interest.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.