[PR09] Richard Pink and Egon R¨ utsche

Reading, MA, second edition · 1984

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Frobenius Traces for Rank-2 Drinfeld Modules, Higher-Dimensional Galois Representations, and a Strong Multiplicity One Theorem in Positive Characteristic

math.NT · 2026-04-30 · unverdicted · novelty 7.0

Frobenius trace equality at all but finitely many places implies isomorphism of l-adic Galois representations for rank-2 non-CM Drinfeld modules, plus a generalization and strong multiplicity one theorem for semisimple representations over local fields of positive characteristic.

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Frobenius Traces for Rank-2 Drinfeld Modules, Higher-Dimensional Galois Representations, and a Strong Multiplicity One Theorem in Positive Characteristic math.NT · 2026-04-30 · unverdicted · none · ref 2
Frobenius trace equality at all but finitely many places implies isomorphism of l-adic Galois representations for rank-2 non-CM Drinfeld modules, plus a generalization and strong multiplicity one theorem for semisimple representations over local fields of positive characteristic.

[PR09] Richard Pink and Egon R¨ utsche

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