Hybrid Subconvexity Bound for $L\left(\frac{1}{2},\mathrm{Sym}^2 f\otimes\rho\right)$ via the Delta Method

TL;DR

This paper establishes a new hybrid subconvexity bound for certain L-functions involving symmetric squares and primitive cusp forms, extending previous results by employing a novel variant of the delta method.

Contribution

It introduces a new variant of the delta method to prove a hybrid subconvexity bound for L-functions over a broader range of parameters than prior work.

Findings

Extended the range of P and k for subconvexity bounds.

Developed a new variant of the delta method.

Achieved bounds that surpass previous results in the specified parameter range.

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 $\rho$ be a primitive level $P$ holomorphic cusp form with arbitrary nebentypus and fixed weight $\kappa$. We prove a hybrid subconvexity bound for $L\left(\frac{1}{2},\mathrm{Sym}^2 f\otimes \rho\right)$ when $P^{\frac{1}{4}+\eta}<k<P^{\frac{21}{17}-\eta}$ for any $0<\eta<\frac{67}{136}$. 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.