Improved subconvexity bounds for GL(2)xGL(3) and GL(3) L-functions by weighted stationary phase

Abstract

Let f be a fixed self-contragradient Hecke-Maass form for SL(3, Z), and u an even Hecke-Maass form for SL(2, Z) with Laplace eigenvalue 1/4+k2, k>0. A subconvexity bound O(k4/3+) in the eigenvalue aspect is proved for the central value at s=1/2 of the Rankin-Selberg L-function L(s,f× u). Meanwhile, a subconvexity bound O((1+|t|)2/3+) in the t aspect is proved for L(1/2+it,f). These bounds improved corresponding subconvexity bounds proved by Xiaoqing Li (Annals of Mathematics, 2011). The main technique in the proof, other than those used by Li, is an nth-order asymptotic expansion of a weighted stationary phase integral, for arbitrary n≥1. This asymptotic expansion sharpened the classical result for n=1 by Huxley.