Evaluating characterizations of homomorphisms on truncated vector lattices of functions

Abstract

Let L be a (non necessarily unital) truncated vector lattice of real-valued functions on a nonempty set X. A nonzero linear functional on L is called a truncation homomorphism if it preserves truncation, i.e.,% \[ ( f1X) =\ ( f) ,1\ for all f∈ L. \] We prove that a linear functional on L is a truncation homomorphism if and only if is a lattice homomorphism and% \[ \ ( f) :f≤1X\ =1. \] This allows us to prove different evaluating characterizations of truncation homomorphisms. In this regard, a special attention is paid to the continuous case and various results from the existing literature are generalized.