Explicit Sato-Tate type distribution for a family of K3 surfaces

Abstract

In the 1960's, Birch proved that the traces of Frobenius for elliptic curves taken at random over a large finite field is modeled by the semicircular distribution (i.e. the usual Sato-Tate for non-CM elliptic curves). In analogy with Birch's result, a recent paper by Ono, the author, and Saikia proved that the limiting distribution of the normalized Frobenius traces Aλ(p) of a certain family of K3 surfaces Xλ with generic Picard rank 19 is the O(3) distribution. This distribution, which we denote by 14πf(t), is quite different from the semicircular distribution. It is supported on [-3,3] and has vertical asymptotes at t=1. Here we make this result explicit. We prove that if p≥ 5 is prime and -3≤ a<b≤ 3, then |\#\λ∈Fp :Aλ(p)∈[a,b]\p-14π∫ab f(t)dt|≤ 110.84p1/4. As a consequence, we are able to determine when a finite field Fp is large enough for the discrete histograms to reach any given height near t=1. To obtain these results, we make use of the theory of Rankin-Cohen brackets in the theory of harmonic Maass forms.

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