Hybrid subconvexity bounds for L (12, Sym2 f g)

Abstract

Fix an integer ≥slant 2. Let P be prime and let k> be an even integer. For f a holomorphic cusp form of weight k and full level and g a primitive holomorphic cusp form of weight 2 and level P, we prove hybrid subconvexity bounds for L (12, Sym2 f g) in the k and P aspects when P 13 64 + δ < k < P 3 8 - δ for any 0 < δ < 11 128. These bounds are achieved through a first moment method (with amplification when P 13 64 < k ≤slant P 4 13).