Title of article
The analytic strong multiplicity one theorem for image Original Research Article
Author/Authors
Yonghui Wang، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
11
From page
1116
To page
1126
Abstract
Let π=circle times operatorπv and image be two irreducible, automorphic, cuspidal representations of image. Using the logarithmic zero-free region of Rankin–Selberg L-function, Moreno established the analytic strong multiplicity one theorem if at least one of them is self-contragredient, i.e. π and π′ will be equal if they have finitely many equivalent local components image, for which the norm of places are bounded polynomially by the analytic conductor of these cuspidal representations. Without the assumption of the self-contragredient for π,π′, Brumley generalized this theorem by a different method, which can be seen as an invariant of Rankin–Selberg method. In this paper, influenced by Landauʹs smooth method of Perron formula, we improved the degree of Brumleyʹs polynomial bound to be 4m+ε.
Keywords
Automorphic cuspidal representations , Analytic conductor , Strong multiplicity one theorem
Journal title
Journal of Number Theory
Serial Year
2008
Journal title
Journal of Number Theory
Record number
716129
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