2016
DOI: 10.1090/jams/855
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The nonvanishing hypothesis at infinity for Rankin-Selberg convolutions

Abstract: We prove the nonvanishing hypothesis at infinity for Rankin-Selberg convolutions for GL(n) × GL(n − 1).2000 Mathematics Subject Classification. 22E41, 22E47.

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Cited by 34 publications
(36 citation statements)
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“…Often times, a cohomological interpretation of an analytic theory of L-functions, depends on an assumption that a quantity coming from archimedean considerations in nonzero. In our situation, we adapt the methods of recent work of Sun [41] to prove an appropriate nonvanishing result; see Prop. 3.3.4.…”
Section: Introductionmentioning
confidence: 99%
“…Often times, a cohomological interpretation of an analytic theory of L-functions, depends on an assumption that a quantity coming from archimedean considerations in nonzero. In our situation, we adapt the methods of recent work of Sun [41] to prove an appropriate nonvanishing result; see Prop. 3.3.4.…”
Section: Introductionmentioning
confidence: 99%
“…Let u 3 be a nonzero highest weight vector of β ∨ 3 , and let v 3 be a nonzero lowest weight vector of γ ∨ 3 . By Lemma 2.11 of [16]…”
Section: Analysis Of Fmentioning
confidence: 85%
“…The nonvanishing hypothesis is vital to the arithmetic study of critical values of higher degree L-functions and to the constructions of higher degree p-adic L-functions. Recently, Sun made a breakthrough by confirming it for GL n (R)×GL n−1 (R) and GL n (C)×GL n−1 (C), see [16]. The current paper aims to consider the GL n (C) × GL n (C) case, which has been expected by Grenié since 2003, see page 284 of [5].…”
Section: Introductionmentioning
confidence: 86%
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“…Recent results on these lines are contained in [14,16,3]. The important paper of Binyong Sun [17], which proves the non-vanishing of the relevant archimedean zeta integrals, shows that the cup product expressions can be used effectively to relate the critical values to natural period invariants obtained by comparing the rational structures defined by Whittaker models to those defined cohomologically. There is no obvious relation, however, between these Whittaker periods and the motivic periods that enter into the computation of Deligne's period invariant c`.…”
Section: Introductionmentioning
confidence: 99%