NIP, and NTP2 division rings of prime characteristic

Abstract

Combining a characterisation by B\'elair, Kaplan, Scanlon and Wagner of certain NIP valued fields of characteristic p with Dickson's construction of cyclic algebras, we provide examples of noncommutative NIP division ring of characteristic p and show that an NIP division ring of characteristic p has finite dimension over its centre, in the spirit of Kaplan and Scanlon's proof that infinite NIP fields have no Artin-Schreier extension. The result extends to NTP2 division rings of characteristic p, using results of Chernikov, Kaplan and Simon. We also highlight consequences of our proofs that concern NIP or simple difference fields.