Density of the set of probability measures with the martingale representation property

Abstract

Let be a multi-dimensional random variable. We show that the set of probability measures Q such that the Q-martingale SQt=EQ[t] has the Martingale Representation Property (MRP) is either empty or dense in L∞-norm. The proof is based on a related result involving analytic fields of terminal conditions ((x))x∈ U and probability measures (Q(x))x∈ U over an open set U. Namely, we show that the set of points x∈ U such that St(x) = EQ(x)[(x)t] does not have the MRP, either coincides with U or has Lebesgue measure zero. Our study is motivated by the problem of endogenous completeness in financial economics.