Hybrid Subconvexity Bound for L(12,Sym2 f) via the Delta Method

Abstract

Let P be a prime and k be an even integer. Let f be a full level holomorphic cusp form of weight k and be a primitive level P holomorphic cusp form with arbitrary nebentypus and fixed weight . We prove a hybrid subconvexity bound for L(12,Sym2 f ) when P14+η<k<P2117-η for any 0<η<67136. This extends the range of P and k achieved by Holowinsky, Munshi and Qi. The result is established using a new variant of the delta method.