Tate modules of isocrystals and good reduction of Drinfeld modules

Abstract

A Drinfeld module has a p-adic Tate module not only for every finite place p of the coefficient ring but also for p = ∞. This was discovered by J.-K. Yu in the form of a representation of the Weil group. Following an insight of Taelman we construct the ∞-adic Tate module by means of the theory of isocrystals. This applies more generally to pure A-motives and to pure F-isocrystals of p-adic cohomology theory. We demonstrate that a Drinfeld module has good reduction if and only if its ∞-adic Tate module is unramified. The key to the proof is the theory of Hartl and Pink which gives an analytic classification of vector bundles on the Fargues-Fontaine curve in equal characteristic.