Dp-finite fields III: inflators and directories

Abstract

We develop some tools for analyzing dp-finite fields, including a notion of an ``inflator'' which generalizes the notion of a valuation/specialization on a field. For any field K, let SubK(Kn) denote the lattice of K-linear subspaces of Kn. An ordinary valuation on K with residue field k induces order-preserving dimension-preserving specialization maps from SubK(Kn) to Subk(kn), satisfying certain compatibility across n. An r-inflator is a similar family of maps \SubK(Kn) Subk(krn)\n ∈ N scaling dimensions by r. We show that 1-inflators are equivalent to valuations, and that r-inflators naturally arise in fields of dp-rank r. This machinery was ``behind the scenes'' in 10 of [10]. We rework 10 of [10] using the machinery of r-inflators.