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XII: 07, 53-56, LNM 649 (1978)
LENGLART, Érik
Sur la localisation des intégrales stochastiques (Stochastic calculus)
A mapping $T$ from processes to processes is local if, whenever two processes $X,Y$ are equal on an event $A\subset\Omega$, the same is true for $TX,TY$. Classical results on locality in stochastic calculus are derived here in a simple way from the generalized Girsanov theorem (which concerns a pair of laws $P,Q$ with $Q$ absolutely continuous with respect to $P$, but not necessarily equivalent to it: see Lenglart, Zeit. für W-theorie, 39, 1977). A new result is derived: if $X$ and $Y$ are semimartingales and their difference is of finite variation on an event $A$, then their continuous martingale parts are equal on $A$
Keywords: Girsanov's theorem
Nature: Original
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