REFINEMENT OF STRONG MULTIPLICITY ONE FOR AUTOMORPHIC REPRESENTATIONS OF GL(n)
نویسندگان
چکیده
We state a qualitative form of strong multiplicity one for GL1. We derive refinements of strong multiplicity one for automorphic representations arising from Eisenstein series associated to a Borel subgroup on GL(n), and for the cuspidal representations on GL(n) induced from idele class characters of cyclic extensions of prime degree. These results are in accordance with a conjecture of D. Ramakrishnan. We also show that Ramakrishnan’s conjecture follows from a weak form of Ramanujan’s conjecture. We state a conjecture concerning the structural aspects of refinements of strong multiplicity one for a pair of general automorphic representations.
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