On Hecke eigenvalues of Siegel modular forms in the Maass space

Abstract

In this article, we prove an omega-result for the Hecke eigenvalues λF(n) of Maass forms F which are Hecke eigenforms in the space of Siegel modular forms of weight k, genus two for the Siegel modular group Sp2(). In particular, we prove λF(n)= (nk-1exp (c n n)), when c>0 is an absolute constant. This improves the earlier result λF(n)= (nk-1 ( n n)) of Das and the third author. We also show that for any n 3, one has λF(n) ≤ nk-1exp (c1 n n), where c1>0 is an absolute constant. This improves an earlier result of Pitale and Schmidt. Further, we investigate the limit points of the sequence \λF(n)nk-1\n ∈ and show that it has infinitely many limit points. Finally, we show that λF(n) >0 for all n, a result earlier proved by Breulmann by a different technique.