Hybrid subconvexity bounds for twisted L-functions on GL(3)

Abstract

Let q be a large prime, and the quadratic character modulo q. Let φ be a self-dual Hecke--Maass cusp form for SL(3,Z), and uj a Hecke--Maass cusp form for 0(q)⊂eq SL(2,Z) with spectral parameter tj. We prove the hybrid subconvexity bounds for the twisted L-functions \[ L(1/2,φ× uj×)φ, (qtj)3/2-θ+, L(1/2+it,φ×)φ, (qt)3/4-θ/2+, \] for any >0, where θ=1/23 is admissible.