Smooth Functionals on Lattices of Continuous Functions

We introduce the notions of tight, τ-smooth and σ-smooth linear functionals on locally convex vector lattices as a generalization of the tight, τ-smooth and σ-smooth linear functionals, respectively, on the space C_b(X) of all bounded, continuous, real-valued functions on the completely regular space X. It is shown that many of the order-theoretical properties of these functionals on C_b(X) are still shared by their respective generalizations. The functionals of different smoothness type are used to introduce different types of function lattices, C_b(X) with its different strict topologies being a particular example. Among the results which are still true in this more general setting is the Stone-Veierstrass theorem proved for quasi-M-spaces and generalizing the corresponding theorem for C_b(X) with the substrict topology. Also the various ideal theoretical properties of Dini- and σ-Dini-spaces shed some new light upon C_b(X) with the strict and superstrict topology, respectively.