Non-Commutative Integration

Abstract

We will show that if is a factor, then for any pair , ∈ of normal positive linear functionals on , the inequality: ≤ is equivalent to the fact that there exist a countable family : i∈ I⊂ in and a family : i∈ I of partial isometries in such that =Σdi∈ I , Σdi∈ I ≤ , and =s, i∈ I, where s(ω), ω∈, means the support projection of ω. Furthermore, if =, then the equality replaces the inequality in the second statement. In the case that is not of type the family of partial isometries can be replaced by a family of unitaries in One cannot expect to have this result in the usual integration thoery. To have a similar result, one needs to bring in some kind of non-commutativity. Let X, μ be a -finite semifinite measure space and G be an ergodic group of automorphisms of X, μ, then for a pair f and g of μ-integrable positive functions on X, the inequality: ∫X f(x) μ(x)≤ ∫X g(x) μ(x) is equivalent to the existence of a countable families : i∈ I⊂ L1(X, μ) of positive integrable functions and : i∈ I in G such that f=Σdi∈ I Σdi∈ I ≤ g, where the summation and inequality are all taken in the oredered Banach space L1(X, μ) and the action of G on X, μ is defined through the duality between X, μ and X, μ, i.e., (f)(x)&=f∈v xμ ∈vμ(x), f∈X, μ.