Quasi-linear maps and image transformations

Abstract

Conic quasi-linear maps are nonlinear operators from C0(X) to a normed linear space E which preserve nonnegative linear combinations on positive cones generated by single functions; quasi-linear maps are linear on singly generated subalgebras. While nonlinear, a quasi-linear map is bounded iff it is continuous. E = R gives quasi-integrals, which correspond to (deficient) topological measures - nonsubadditive set functions generalizing measures. Like image measures μ u-1, (d-) image transformations move (deficient) topological measures from one space to another, generalizing u-1. We give criteria for a (d-) image transformation to be u-1 for some proper continuous function. We study the interrelationships between (conic) quasi-linear maps, quasi-integrals, (deficient) topological measures and (d-) image transformations when E = C0(Y), X, Y are locally compact. (Conic) quasi-homomorphisms behave like homomorphisms on singly generated subalgebras or cones. We show that (conic) quasi-homomorphisms are in 1-1 correspondence with (d-) image transformations and with certain continuous proper functions. We give criteria for a (conic) quasi-linear map to be a (conic) quasi-homomorphism, and for the latter to be an algebra homomorphism. Any conic quasi-linear map or bounded quasi-linear map is a composition of an algebra homomorphism with the basic quasi-linear map, and we give criteria for the latter to be linear. We study the adjoints of (d-) image transformations and (conic) quasi-linear maps; for (conic) quasi-homomorphisms they give Markov-Feller operators with nonlinear duals.