Relative Trace Formula, Subconvexity and Quantitative Nonvanishing of Rankin-Selberg L-functions for GL(n+1)×GL(n)

Abstract

Let π' be a fixed unitary cuspidal representation of GL(n)/Q. We establish a subconvex bound in the t-aspect L(1/2+it,π×π')π,π',(1+|t|)n(n+1)4-14· (4n2+2n-1)+, for any unitary pure isobaric automorphic representation π of GL(n+1)/Q. Moreover, the bound improves in the standard L-function case L(1/2+it, π')π',(1+|t|)n4-14(n+1)(4n-1)+. We also prove an explicit lower bound for nonvanishing of central L-values Σπ∈A01L(1/2,π×π')≠ 0|A0|1n(n+1)(4n2+2n-1)-, for a suitable finite family A0 of unitary cuspidal representations of GL(n+1)/Q. More generally, we address the spectral side subconvexity in the case of uniform parameter growth, and a quantitative form of simultaneous nonvanishing of central L-values for GL(n+1)×GL(n) (over Q) in both level and eigenvalue aspects. Among other ingredients, our proofs employ a new relative trace formula in conjunction with P. Nelson's construction of archimedean test functions in Nel21 and volume estimates in Nel20.