On autoduality of Drinfeld modules and Drinfeld modular forms
Abstract
Let Fq be the field of q elements and let A=Fq[t] be the polynomial ring over Fq. Let n∈ A Fq be a monic polynomial with a prime factor of degree prime to q-1. Let be a subgroup of (A/(n))× such that the map (A/(n))×/Fq× is bijective. Let S be a scheme over A[1/n] and let R be an A[1/n]-algebra which is an excellent regular domain. In this paper, we show that any Drinfeld module E of rank two over S admitting a 1(n)-structure is isomorphic to its Taguchi dual ED. As an application, for the Hodge bundle ω on the Drinfeld modular curve X of level 1(n) over R, we give a dual Kodaira--Spencer isomorphism of the form ω 2 1X/R(2Cusps), in contrast with the usual one in the Drinfeld case in which ED is involved.
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