Fatou limits of stochastic integrals
Abstract
The convergence of stochastic integrals is essential to stochastic analysis, especially in applications to mathematical finance, where they model the gains associated with a self-financing strategy. However, Fatou convergence of (Xn)n=1∞ x2014a notion introduced for its amenability to compactness principlesx2014implies little about the sequence of It\o integrals (∫0·YdXn)n=1∞ for a fixed integrand Y. Under a boundedness condition, we find convex combinations (Xn)n=1∞ of (Xn)n=1∞ with Fatou limit X, such that (∫0·YdXn)n=1∞ converges in a Fatou-like sense to ∫0·YdX for all continuous semimartingales Y. The result is sharp, in the sense that continuity of Y cannot be relaxed to being the left limits process of a semimartingale.
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