Repeated quasi-integration on locally compact spaces

Abstract: When X is locally compact, a quasi-integral (also called a quasi-linear functional) on Cc(X) is a homogeneous, positive functional that is only assumed to be linear on singly-generated subalgebras. We study simple and almost simple quasi-integrals, i.e., quasi-integrals whose corresponding compact-finite topological measures assume exactly two values. We present a criterion for repeated quasi-integration (i.e., iterated integration with respect to topological measures) to yield a quasi-linear functional. We fi… Show more