Compactification of the finite Drinfeld period domain as a moduli space of ferns

Abstract

Let Fq be a finite field with q elements and let V be a vector space over Fq of dimension n>0. Let V be the Drinfeld period domain over Fq. This is an affine scheme of finite type over Fq, and its base change to Fq(t) is the moduli space of Drinfeld Fq[t]-modules with level (t) structure and rank n. In this thesis, we give a new modular interpretation to Pink and Schieder's smooth compactification BV of V. Let V be the set V\∞\ for a new symbol ∞. We define the notion of a V-fern over an Fq-scheme S, which consists of a stable V-marked curve of genus 0 over S endowed with a certain action of the finite group V Fq×. Our main result is that the scheme BV represents the functor that associates an Fq-scheme S to the set of isomorphism classes of V-ferns over S. Thus V-ferns over Fq(t)-schemes can be regarded as generalizations of Drinfeld Fq[t]-modules with level (t) structure and rank n. To prove this theorem, we construct an explicit universal V-fern over BV. We then show that any V-fern over a scheme S determines a unique morphism S BV, depending only its isomorphism class, and that the V-fern is isomorphic to the pullback of the universal V-fern along this morphism. We also give several functorial constructions involving V-ferns, some of which are used to prove the main result. These constructions correspond to morphisms between various modular compactifications of Drinfeld period domains over Fq. We describe these morphisms explicitly.