Bounds for twisted symmetric square L-functions—III

Abstract

Let f be a Hecke modular form, and let χ be a primitive character of conductor q^ℓ. Assume that q is an odd prime. In this paper we prove the subconvex bound L(1/2, Sym² f ⊗ χ) ≪ _f,q,ε q^{3ℓ(1/4-1/36+ε)} for any ε > 0. This can be compared with the recently established t-aspect subconvexity of the symmetric square L-functions.