Can a Drinfeld module be modular?
Abstract
Let k be a global function field with field of constants and let ∞ be a fixed place of k. In his habilitation thesis boc2, Gebhard B\"ockle attaches abelian Galois representations to characteristic p valued cusp eigenforms and double cusp eigenforms go1 such that Hecke eigenvalues correspond to the image of Frobenius elements. In the case where k=(T) and ∞ corresponds to the pole of T, it then becomes reasonable to ask whether rank 1 Drinfeld modules over k are themselves ``modular'' in that their Galois representations arise from a cusp or double cusp form. This paper gives an introduction to boc2 with an emphasis on modularity and closes with some specific questions raised by B\"ockle's work.
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