A natural haystack of differentially closed fields

Abstract

In this partially expository paper, we present a novel construction of differentially closed fields of characteristic 0: Let Kdense be the differential ring of all meromorphic functions whose domain is a (not necessarily connected) dense open subset of C modulo agreement on dense open sets (i.e., f and g are considered equal if there is a dense open U ⊂eq C such that f|U = g|U). We show that every ring ideal of Kdense is a differential ideal and that for every maximal ideal m, the quotient Kdense/m is a differentially closed field. We also show that Kdense/m is saturated and has cardinality of the continuum, implying that any two such quotients are isomorphic as differential fields. We then discuss how to motivate this construction in terms of set-theoretic forcing, Boolean-valued models, and -sheaves on C, taking the opportunity to present an impressionistic expository account of these ideas. Finally, we discuss some immediate generalizations of this construction involving the real and p-adic numbers and ask some questions about them.