Two versions of the fundamental theorem of asset pricing

Abstract

Let L be a convex cone of real random variables on the probability space (,A,P0). The existence of a probability P on A such that P P0, EP X< ∞\, and \, EP(X) ≤ 0\, for all X ∈ L is investigated. Two results are provided. In the first, P is a finitely additive probability, while P is σ-additive in the second. If L is a linear space then -X∈ L whenever X∈ L, so that EP(X)≤ 0 turns into EP(X)=0. Hence, the results apply to various significant frameworks, including equivalent martingale measures and equivalent probability measures with given marginals.