The Error Term in the Sato-Tate Conjecture

TL;DR

This paper provides an effective bound on the error term in the Sato-Tate distribution for Fourier coefficients of certain modular forms, assuming automorphy of symmetric power L-functions.

Contribution

It proves an explicit error term for the Sato-Tate distribution under automorphy assumptions, improving understanding of prime angle distributions in modular forms.

Findings

Error term bound of O(x/(log x)^{9/8 - ε}) for prime angle distribution

Effective computability of the implied constant

Conditional proof assuming automorphy of symmetric power L-functions

Abstract

Let $f(z)=\sum_{n=1}^\infty a(n)e^{2\pi i nz}\in S_k^{new}(\Gamma_0(N))$ be a newform of even weight $k\geq2$ that does not have complex multiplication. Then $a(n)\in\mathbb{R}$ for all $n$, so for any prime $p$, there exists $\theta_p\in[0,\pi]$ such that $a(p)=2p^{(k-1)/2}\cos(\theta_p)$. Let $\pi(x)=\#\{p\leq x\}$. For a given subinterval $I\subset[0,\pi]$, the now-proven Sato-Tate Conjecture tells us that as $x\to\infty$, \[ \#\{p\leq x:\theta_p\in I\}\sim \mu_{ST}(I)\pi(x),\quad \mu_{ST}(I)=\int_{I} \frac{2}{\pi}\sin^2(\theta)~d\theta. \] Let $\epsilon>0$. Assuming that the symmetric power $L$-functions of $f$ are automorphic, we prove that as $x\to\infty$, \[ \#\{p\leq x:\theta_p\in I\}=\mu_{ST}(I)\pi(x)+O\left(\frac{x}{(\log x)^{9/8-\epsilon}}\right), \] where the implied constant is effectively computable and depends only on $k,N,$ and $\epsilon$.