Integral presentations of the shifted convolution problem and subconvexity estimates for GLn-automorphic L-functions

Abstract

Fix n ≥ 2 an integer, and F be a totally real number field. We reduce the shifted convolution problem for L-function coefficients of GLn(AF)-automorphic forms to the better-understood setting of GL2(AF). The key idea behind this reduction is to use the classical projection operator Pn1 together with properties of its Fourier-Whittaker expansion. This allows us to derive novel integral presentations for the shifted convolution problem as Fourier-Whittaker coefficients of certain L2-automorphic forms on the mirabolic subgroup P2(AF) of GL2(AF) or its two-fold metaplectic cover P2(AF). We then construct liftings of these mirabolic forms to GL2(AF) and its two-fold metaplectic cover G(AF) to justify expanding the underlying forms into linear combinations of Poincar\'e series. Decomposing each of the Poincar\'e series spectrally then allows us to derive completely new bounds for the shifted convolution problem in dimensions n ≥ 3. As an application, we derive a uniform subconvexity bound for GLn(AF)-automorphic L-functions twisted by Hecke characters. This uniform level-aspect subconvexity estimate appears to the the first of its kind for dimensions n ≥ 3.