Finitely additive equivalent martingale measures

Abstract

Let L be a linear space of real bounded random variables on the probability space (,A,P0). There is a finitely additive probability P on A, such that P P0 and EP(X)=0 for all X∈ L, if and only if c\,EQ(X)≤ess sup(-X), X∈ L, for some constant c>0 and (countably additive) probability Q on A such that Q P0. A necessary condition for such a P to exist is L-L∞+\, L∞+=\0\, where the closure is in the norm-topology. If P0 is atomic, the condition is sufficient as well. In addition, there is a finitely additive probability P on A, such that P P0 and EP(X)=0 for all X∈ L, if and only if ess sup(X)≥ 0 for all X∈ L.