On the Lang--Trotter conjecture for Siegel modular forms

Abstract

Let f be a genus two cuspidal Siegel modular eigenform. We prove an adelic open image theorem for the compatible system of Galois representations associated to f, generalising the results of Ribet and Momose for elliptic modular forms. Using this result, we investigate the distribution of the Hecke eigenvalues ap of f, and obtain upper bounds for the sizes of the sets \p x : ap = a\ for fixed a∈C, in the spirit of the Lang--Trotter conjecture for elliptic curves.