Higher Fourier interpolation on the plane

Abstract

Let l≥ 6 be any integer, where l 2 mod 4. Suppose that μ(τ)dτ is a measure with bounded variation and is supported on a compact subset of the complex plane, where (τ),(-1τ)>(πl). Let f(x)=∫ eiπ τ |x|2dμ(τ) and F(f) be its Fourier transform, where x∈ 2. For every integer k≥ 0 and x∈ 2, we express f(x) in terms of the values of dk fduk and dk F(f)duk at u=2nλ, where n is a non-negative integer, u=|x|2 and λ=2(πl). We show that the condition (τ),(-1τ)>(πl) is optimal. We also identify the summation formulas among the values of dk fduk and dk F(f)duk at u=2nλ, with the space of holomorphic modular forms of weight 2k+1 of the Hecke triangle group (2,l,∞). Using our formulas for l=6 and developing new methods, we prove a conjecture of Cohn, Kumar, Miller, Radchenko and Viazovska~[Conjecture 7.5]Maryna3. This conjecture was motivated by the universal optimality of the hexagonal lattice.