Bricks and τ-tilting theory under base field extensions

Abstract

Let K:k be a field extension and let be a finite-dimensional k-algebra. We investigate the relationship between and K = k K with particular emphasis on various aspects of τ-tilting theory and bricks. We show that many types of objects for lift injectively to the same type of object for K, and many common constructions in τ-tilting theory commute with the process of extending the base field. One of our main applications is the construction of a faithful functor from the τ-cluster morphism category W() of to the τ-cluster morphism category W(K) of K. In particular, this establishes a faithful functor from W() to a group whenever k is of characteristic zero which has many important consequences. In the appendix, E. J. Hanson shows the analogous result whenever k is a finite field. Moreover, we give some nontrivial examples to illustrate the behaviour of τ-tilting finiteness under base field extension.