Subconvexity for GL(1) twists of Rankin-Selberg L-functions

Abstract

Let f and g be two holomorphic or Hecke-Maass primitive cusp forms for SL(2,Z) and be a primitive Dirichlet character of modulus p, an odd prime. A subconvex bound for the central values of the Rankin-Selberg L-functions is L(s, f g ) is given by L(12, f g ) f,g,εp2728+ε , for any ε > 0, where the implied constant depends only on the forms f,g and ε. Here the convexity bound has exponent 1+ε, which was improved to 1-11324 (see HM). Our bound reduces it further to 1- 128. The main ingredients is to reduce the original problem to a GL(2) × GL(2) shifted convolution sum problem.