Quantitative analysis of the Satake parameters of \(\operatorname {GL}_2\) representations with prescribed local representations (Q2875427)

In the paper under review authors investigate the vertical version of the Sato-Tate conjecture for certain \(\mathrm{GL}_2\) automorphic representations. They extend known results on a quantitative version of the distribution of the eigenvalues of the Hecke operator \(T_{p}\) (\(p\) prime) to Hilbert modular forms and to some \(\mathrm{GL}_2\) automorphic representations with specified local components at a finite set of finite places.NEWLINENEWLINEThe proofs are based on Arthur's trace formula on the group \(\mathrm{GL}_{2}\) over a totally real algebraic number field with degree at least two over \(\mathbb{Q}\).