On the Second Fundamental Theorem of Asset Pricing
Abstract
Let X1,…, Xd be sigma-martingales on (, F, P). We show that every bounded martingale (with respect to the underlying filtration) admits an integral representation w.r.t. X1,…, Xd if and only if there is no equivalent probability measure (other than P) under which X1,…,Xd are sigma-martingales. From this we deduce the second fundamental theorem of asset pricing- that completeness of a market is equivalent to uniqueness of Equivalent Sigma-Martingale Measure (ESMM).
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