Second moment of GL(3) × GL(2) L--functions
Abstract
For M1 and M2 two distinct primes, let Hk(M1M2, ) denote the set of primitive newforms of level M1M2, weight k≥ 3 and Nebentypus of conductor M1. Let π be a fixed SL(3, Z) Hecke cusp form. We prove a Lindel\"of--consistent upper bound for the second moment \[ Σ(M1) \\ (-1)=(-1)k hΣf ∈ Hk(M1M2,) |L(1/2, π × f)|2 π,ε M11+ε\] in the range M2≤ M11+ε.
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