Estimates for Fourier coefficients of Siegel cusp forms (Q5906860)

The author extends the estimates of his previous paper [Math. Ann. 310, 129-160 (1998); see Zbl 0894.11024 above] to the case of arbitrary degree \(g\geq 3\). This yields a theorem containing a general estimate of \(a(S)\) which is too long to be given here. Unfortunately, the analogue of \((*)\) (see the preceding review) given in the Corollary is for every \(g\geq 4\) worse than the corresponding estimate of Böcherer and Kohnen. In fact, for \(g\geq 7\) the estimate is even worse than the trivial Hecke bound \(a(S)\ll(\text{det } S)^{\frac k2}\).