Estimates of Fourier coefficients of integral and half-integral weight cusp forms associated to cofinite Fuchsian subgroups

Abstract

Let ⊂ SL2() be a cofinite Fuchsian subgroup, and let i∞ be a cusp of . For k∈≥ 0, let denote the complex vector space of cusp forms of weight-k, with respect to the Fuchsian subgroup . Let f∈ be a cusp form of weight-k, which is normalized, with respect to the Petersson inner-product on . For any n∈≥ 1, let an denote the n-th Fourier coefficient of f at i∞. Then, for any k∈≥ 5, we show that align* |an|=Of,(nk-12+2k), align* where the implied constant depends on the cusp form f, and the Fuchsian subgroup . The proof of the above estimate remains valid, for half-integral weight cusp forms of weight- with ∈ 12+m|\,m∈≥ 4 , associated to the arithmetic subgroups 0(4N), 1(4N), and (4N) (for N∈≥ 1).