I've been reading about paradoxical sets, mainly paradoxical subsets of the plane. As a consequence of this, I've been reading a couple of G.A. Sherman's papers on the subject. In his paper "Properties of Paradoxical Sets in the Plane," an interesting result is that any subset of the plane with nonempty interior is not paradoxical (this is very interesting in that it is contrary to the the 3D analog where all bounded subsets with nonempty interior have to be paradoxical by the Banach-Tarski Paradox). However, to prove this, he used a total, finitely-additive, isometry-invariant extension of Lebesgue Measure, which he calls a Banach measure. His only references for this seem to be a paper by Banach, which is in French, and a theorem from "The Banach-Tarski Paradox" by Stan Wagon, which doesn't seem to mention Banach measures by name, nor does any of the surrounding material expound on this.
I think I've been able to understand and fill in the details for most of his proofs for the main theorems, but I want to solidify my understanding by getting to know Banach measures better. Are there any textbooks or references that make specific use of Banach measures? What theorems can we take from the Lebesgue measure and put in terms of Banach measures? I assume, since he uses it, that nonempty interior implies positive measure for Banach measures, like it does for the Lebesgue measure, but is there anything else?
